[−][src]Enum unicode_types::mathematical_alphanumeric_symbols::MathematicalAlphanumericSymbols
An enum to represent all characters in the MathematicalAlphanumericSymbols block.
Variants
MathematicalBoldCapitalA\u{1d400}: '𝐀'
MathematicalBoldCapitalB\u{1d401}: '𝐁'
MathematicalBoldCapitalC\u{1d402}: '𝐂'
MathematicalBoldCapitalD\u{1d403}: '𝐃'
MathematicalBoldCapitalE\u{1d404}: '𝐄'
MathematicalBoldCapitalF\u{1d405}: '𝐅'
MathematicalBoldCapitalG\u{1d406}: '𝐆'
MathematicalBoldCapitalH\u{1d407}: '𝐇'
MathematicalBoldCapitalI\u{1d408}: '𝐈'
MathematicalBoldCapitalJ\u{1d409}: '𝐉'
MathematicalBoldCapitalK\u{1d40a}: '𝐊'
MathematicalBoldCapitalL\u{1d40b}: '𝐋'
MathematicalBoldCapitalM\u{1d40c}: '𝐌'
MathematicalBoldCapitalN\u{1d40d}: '𝐍'
MathematicalBoldCapitalO\u{1d40e}: '𝐎'
MathematicalBoldCapitalP\u{1d40f}: '𝐏'
MathematicalBoldCapitalQ\u{1d410}: '𝐐'
MathematicalBoldCapitalR\u{1d411}: '𝐑'
MathematicalBoldCapitalS\u{1d412}: '𝐒'
MathematicalBoldCapitalT\u{1d413}: '𝐓'
MathematicalBoldCapitalU\u{1d414}: '𝐔'
MathematicalBoldCapitalV\u{1d415}: '𝐕'
MathematicalBoldCapitalW\u{1d416}: '𝐖'
MathematicalBoldCapitalX\u{1d417}: '𝐗'
MathematicalBoldCapitalY\u{1d418}: '𝐘'
MathematicalBoldCapitalZ\u{1d419}: '𝐙'
MathematicalBoldSmallA\u{1d41a}: '𝐚'
MathematicalBoldSmallB\u{1d41b}: '𝐛'
MathematicalBoldSmallC\u{1d41c}: '𝐜'
MathematicalBoldSmallD\u{1d41d}: '𝐝'
MathematicalBoldSmallE\u{1d41e}: '𝐞'
MathematicalBoldSmallF\u{1d41f}: '𝐟'
MathematicalBoldSmallG\u{1d420}: '𝐠'
MathematicalBoldSmallH\u{1d421}: '𝐡'
MathematicalBoldSmallI\u{1d422}: '𝐢'
MathematicalBoldSmallJ\u{1d423}: '𝐣'
MathematicalBoldSmallK\u{1d424}: '𝐤'
MathematicalBoldSmallL\u{1d425}: '𝐥'
MathematicalBoldSmallM\u{1d426}: '𝐦'
MathematicalBoldSmallN\u{1d427}: '𝐧'
MathematicalBoldSmallO\u{1d428}: '𝐨'
MathematicalBoldSmallP\u{1d429}: '𝐩'
MathematicalBoldSmallQ\u{1d42a}: '𝐪'
MathematicalBoldSmallR\u{1d42b}: '𝐫'
MathematicalBoldSmallS\u{1d42c}: '𝐬'
MathematicalBoldSmallT\u{1d42d}: '𝐭'
MathematicalBoldSmallU\u{1d42e}: '𝐮'
MathematicalBoldSmallV\u{1d42f}: '𝐯'
MathematicalBoldSmallW\u{1d430}: '𝐰'
MathematicalBoldSmallX\u{1d431}: '𝐱'
MathematicalBoldSmallY\u{1d432}: '𝐲'
MathematicalBoldSmallZ\u{1d433}: '𝐳'
MathematicalItalicCapitalA\u{1d434}: '𝐴'
MathematicalItalicCapitalB\u{1d435}: '𝐵'
MathematicalItalicCapitalC\u{1d436}: '𝐶'
MathematicalItalicCapitalD\u{1d437}: '𝐷'
MathematicalItalicCapitalE\u{1d438}: '𝐸'
MathematicalItalicCapitalF\u{1d439}: '𝐹'
MathematicalItalicCapitalG\u{1d43a}: '𝐺'
MathematicalItalicCapitalH\u{1d43b}: '𝐻'
MathematicalItalicCapitalI\u{1d43c}: '𝐼'
MathematicalItalicCapitalJ\u{1d43d}: '𝐽'
MathematicalItalicCapitalK\u{1d43e}: '𝐾'
MathematicalItalicCapitalL\u{1d43f}: '𝐿'
MathematicalItalicCapitalM\u{1d440}: '𝑀'
MathematicalItalicCapitalN\u{1d441}: '𝑁'
MathematicalItalicCapitalO\u{1d442}: '𝑂'
MathematicalItalicCapitalP\u{1d443}: '𝑃'
MathematicalItalicCapitalQ\u{1d444}: '𝑄'
MathematicalItalicCapitalR\u{1d445}: '𝑅'
MathematicalItalicCapitalS\u{1d446}: '𝑆'
MathematicalItalicCapitalT\u{1d447}: '𝑇'
MathematicalItalicCapitalU\u{1d448}: '𝑈'
MathematicalItalicCapitalV\u{1d449}: '𝑉'
MathematicalItalicCapitalW\u{1d44a}: '𝑊'
MathematicalItalicCapitalX\u{1d44b}: '𝑋'
MathematicalItalicCapitalY\u{1d44c}: '𝑌'
MathematicalItalicCapitalZ\u{1d44d}: '𝑍'
MathematicalItalicSmallA\u{1d44e}: '𝑎'
MathematicalItalicSmallB\u{1d44f}: '𝑏'
MathematicalItalicSmallC\u{1d450}: '𝑐'
MathematicalItalicSmallD\u{1d451}: '𝑑'
MathematicalItalicSmallE\u{1d452}: '𝑒'
MathematicalItalicSmallF\u{1d453}: '𝑓'
MathematicalItalicSmallG\u{1d454}: '𝑔'
MathematicalItalicSmallI\u{1d456}: '𝑖'
MathematicalItalicSmallJ\u{1d457}: '𝑗'
MathematicalItalicSmallK\u{1d458}: '𝑘'
MathematicalItalicSmallL\u{1d459}: '𝑙'
MathematicalItalicSmallM\u{1d45a}: '𝑚'
MathematicalItalicSmallN\u{1d45b}: '𝑛'
MathematicalItalicSmallO\u{1d45c}: '𝑜'
MathematicalItalicSmallP\u{1d45d}: '𝑝'
MathematicalItalicSmallQ\u{1d45e}: '𝑞'
MathematicalItalicSmallR\u{1d45f}: '𝑟'
MathematicalItalicSmallS\u{1d460}: '𝑠'
MathematicalItalicSmallT\u{1d461}: '𝑡'
MathematicalItalicSmallU\u{1d462}: '𝑢'
MathematicalItalicSmallV\u{1d463}: '𝑣'
MathematicalItalicSmallW\u{1d464}: '𝑤'
MathematicalItalicSmallX\u{1d465}: '𝑥'
MathematicalItalicSmallY\u{1d466}: '𝑦'
MathematicalItalicSmallZ\u{1d467}: '𝑧'
MathematicalBoldItalicCapitalA\u{1d468}: '𝑨'
MathematicalBoldItalicCapitalB\u{1d469}: '𝑩'
MathematicalBoldItalicCapitalC\u{1d46a}: '𝑪'
MathematicalBoldItalicCapitalD\u{1d46b}: '𝑫'
MathematicalBoldItalicCapitalE\u{1d46c}: '𝑬'
MathematicalBoldItalicCapitalF\u{1d46d}: '𝑭'
MathematicalBoldItalicCapitalG\u{1d46e}: '𝑮'
MathematicalBoldItalicCapitalH\u{1d46f}: '𝑯'
MathematicalBoldItalicCapitalI\u{1d470}: '𝑰'
MathematicalBoldItalicCapitalJ\u{1d471}: '𝑱'
MathematicalBoldItalicCapitalK\u{1d472}: '𝑲'
MathematicalBoldItalicCapitalL\u{1d473}: '𝑳'
MathematicalBoldItalicCapitalM\u{1d474}: '𝑴'
MathematicalBoldItalicCapitalN\u{1d475}: '𝑵'
MathematicalBoldItalicCapitalO\u{1d476}: '𝑶'
MathematicalBoldItalicCapitalP\u{1d477}: '𝑷'
MathematicalBoldItalicCapitalQ\u{1d478}: '𝑸'
MathematicalBoldItalicCapitalR\u{1d479}: '𝑹'
MathematicalBoldItalicCapitalS\u{1d47a}: '𝑺'
MathematicalBoldItalicCapitalT\u{1d47b}: '𝑻'
MathematicalBoldItalicCapitalU\u{1d47c}: '𝑼'
MathematicalBoldItalicCapitalV\u{1d47d}: '𝑽'
MathematicalBoldItalicCapitalW\u{1d47e}: '𝑾'
MathematicalBoldItalicCapitalX\u{1d47f}: '𝑿'
MathematicalBoldItalicCapitalY\u{1d480}: '𝒀'
MathematicalBoldItalicCapitalZ\u{1d481}: '𝒁'
MathematicalBoldItalicSmallA\u{1d482}: '𝒂'
MathematicalBoldItalicSmallB\u{1d483}: '𝒃'
MathematicalBoldItalicSmallC\u{1d484}: '𝒄'
MathematicalBoldItalicSmallD\u{1d485}: '𝒅'
MathematicalBoldItalicSmallE\u{1d486}: '𝒆'
MathematicalBoldItalicSmallF\u{1d487}: '𝒇'
MathematicalBoldItalicSmallG\u{1d488}: '𝒈'
MathematicalBoldItalicSmallH\u{1d489}: '𝒉'
MathematicalBoldItalicSmallI\u{1d48a}: '𝒊'
MathematicalBoldItalicSmallJ\u{1d48b}: '𝒋'
MathematicalBoldItalicSmallK\u{1d48c}: '𝒌'
MathematicalBoldItalicSmallL\u{1d48d}: '𝒍'
MathematicalBoldItalicSmallM\u{1d48e}: '𝒎'
MathematicalBoldItalicSmallN\u{1d48f}: '𝒏'
MathematicalBoldItalicSmallO\u{1d490}: '𝒐'
MathematicalBoldItalicSmallP\u{1d491}: '𝒑'
MathematicalBoldItalicSmallQ\u{1d492}: '𝒒'
MathematicalBoldItalicSmallR\u{1d493}: '𝒓'
MathematicalBoldItalicSmallS\u{1d494}: '𝒔'
MathematicalBoldItalicSmallT\u{1d495}: '𝒕'
MathematicalBoldItalicSmallU\u{1d496}: '𝒖'
MathematicalBoldItalicSmallV\u{1d497}: '𝒗'
MathematicalBoldItalicSmallW\u{1d498}: '𝒘'
MathematicalBoldItalicSmallX\u{1d499}: '𝒙'
MathematicalBoldItalicSmallY\u{1d49a}: '𝒚'
MathematicalBoldItalicSmallZ\u{1d49b}: '𝒛'
MathematicalScriptCapitalA\u{1d49c}: '𝒜'
MathematicalScriptCapitalC\u{1d49e}: '𝒞'
MathematicalScriptCapitalD\u{1d49f}: '𝒟'
MathematicalScriptCapitalG\u{1d4a2}: '𝒢'
MathematicalScriptCapitalJ\u{1d4a5}: '𝒥'
MathematicalScriptCapitalK\u{1d4a6}: '𝒦'
MathematicalScriptCapitalN\u{1d4a9}: '𝒩'
MathematicalScriptCapitalO\u{1d4aa}: '𝒪'
MathematicalScriptCapitalP\u{1d4ab}: '𝒫'
MathematicalScriptCapitalQ\u{1d4ac}: '𝒬'
MathematicalScriptCapitalS\u{1d4ae}: '𝒮'
MathematicalScriptCapitalT\u{1d4af}: '𝒯'
MathematicalScriptCapitalU\u{1d4b0}: '𝒰'
MathematicalScriptCapitalV\u{1d4b1}: '𝒱'
MathematicalScriptCapitalW\u{1d4b2}: '𝒲'
MathematicalScriptCapitalX\u{1d4b3}: '𝒳'
MathematicalScriptCapitalY\u{1d4b4}: '𝒴'
MathematicalScriptCapitalZ\u{1d4b5}: '𝒵'
MathematicalScriptSmallA\u{1d4b6}: '𝒶'
MathematicalScriptSmallB\u{1d4b7}: '𝒷'
MathematicalScriptSmallC\u{1d4b8}: '𝒸'
MathematicalScriptSmallD\u{1d4b9}: '𝒹'
MathematicalScriptSmallF\u{1d4bb}: '𝒻'
MathematicalScriptSmallH\u{1d4bd}: '𝒽'
MathematicalScriptSmallI\u{1d4be}: '𝒾'
MathematicalScriptSmallJ\u{1d4bf}: '𝒿'
MathematicalScriptSmallK\u{1d4c0}: '𝓀'
MathematicalScriptSmallL\u{1d4c1}: '𝓁'
MathematicalScriptSmallM\u{1d4c2}: '𝓂'
MathematicalScriptSmallN\u{1d4c3}: '𝓃'
MathematicalScriptSmallP\u{1d4c5}: '𝓅'
MathematicalScriptSmallQ\u{1d4c6}: '𝓆'
MathematicalScriptSmallR\u{1d4c7}: '𝓇'
MathematicalScriptSmallS\u{1d4c8}: '𝓈'
MathematicalScriptSmallT\u{1d4c9}: '𝓉'
MathematicalScriptSmallU\u{1d4ca}: '𝓊'
MathematicalScriptSmallV\u{1d4cb}: '𝓋'
MathematicalScriptSmallW\u{1d4cc}: '𝓌'
MathematicalScriptSmallX\u{1d4cd}: '𝓍'
MathematicalScriptSmallY\u{1d4ce}: '𝓎'
MathematicalScriptSmallZ\u{1d4cf}: '𝓏'
MathematicalBoldScriptCapitalA\u{1d4d0}: '𝓐'
MathematicalBoldScriptCapitalB\u{1d4d1}: '𝓑'
MathematicalBoldScriptCapitalC\u{1d4d2}: '𝓒'
MathematicalBoldScriptCapitalD\u{1d4d3}: '𝓓'
MathematicalBoldScriptCapitalE\u{1d4d4}: '𝓔'
MathematicalBoldScriptCapitalF\u{1d4d5}: '𝓕'
MathematicalBoldScriptCapitalG\u{1d4d6}: '𝓖'
MathematicalBoldScriptCapitalH\u{1d4d7}: '𝓗'
MathematicalBoldScriptCapitalI\u{1d4d8}: '𝓘'
MathematicalBoldScriptCapitalJ\u{1d4d9}: '𝓙'
MathematicalBoldScriptCapitalK\u{1d4da}: '𝓚'
MathematicalBoldScriptCapitalL\u{1d4db}: '𝓛'
MathematicalBoldScriptCapitalM\u{1d4dc}: '𝓜'
MathematicalBoldScriptCapitalN\u{1d4dd}: '𝓝'
MathematicalBoldScriptCapitalO\u{1d4de}: '𝓞'
MathematicalBoldScriptCapitalP\u{1d4df}: '𝓟'
MathematicalBoldScriptCapitalQ\u{1d4e0}: '𝓠'
MathematicalBoldScriptCapitalR\u{1d4e1}: '𝓡'
MathematicalBoldScriptCapitalS\u{1d4e2}: '𝓢'
MathematicalBoldScriptCapitalT\u{1d4e3}: '𝓣'
MathematicalBoldScriptCapitalU\u{1d4e4}: '𝓤'
MathematicalBoldScriptCapitalV\u{1d4e5}: '𝓥'
MathematicalBoldScriptCapitalW\u{1d4e6}: '𝓦'
MathematicalBoldScriptCapitalX\u{1d4e7}: '𝓧'
MathematicalBoldScriptCapitalY\u{1d4e8}: '𝓨'
MathematicalBoldScriptCapitalZ\u{1d4e9}: '𝓩'
MathematicalBoldScriptSmallA\u{1d4ea}: '𝓪'
MathematicalBoldScriptSmallB\u{1d4eb}: '𝓫'
MathematicalBoldScriptSmallC\u{1d4ec}: '𝓬'
MathematicalBoldScriptSmallD\u{1d4ed}: '𝓭'
MathematicalBoldScriptSmallE\u{1d4ee}: '𝓮'
MathematicalBoldScriptSmallF\u{1d4ef}: '𝓯'
MathematicalBoldScriptSmallG\u{1d4f0}: '𝓰'
MathematicalBoldScriptSmallH\u{1d4f1}: '𝓱'
MathematicalBoldScriptSmallI\u{1d4f2}: '𝓲'
MathematicalBoldScriptSmallJ\u{1d4f3}: '𝓳'
MathematicalBoldScriptSmallK\u{1d4f4}: '𝓴'
MathematicalBoldScriptSmallL\u{1d4f5}: '𝓵'
MathematicalBoldScriptSmallM\u{1d4f6}: '𝓶'
MathematicalBoldScriptSmallN\u{1d4f7}: '𝓷'
MathematicalBoldScriptSmallO\u{1d4f8}: '𝓸'
MathematicalBoldScriptSmallP\u{1d4f9}: '𝓹'
MathematicalBoldScriptSmallQ\u{1d4fa}: '𝓺'
MathematicalBoldScriptSmallR\u{1d4fb}: '𝓻'
MathematicalBoldScriptSmallS\u{1d4fc}: '𝓼'
MathematicalBoldScriptSmallT\u{1d4fd}: '𝓽'
MathematicalBoldScriptSmallU\u{1d4fe}: '𝓾'
MathematicalBoldScriptSmallV\u{1d4ff}: '𝓿'
MathematicalBoldScriptSmallW\u{1d500}: '𝔀'
MathematicalBoldScriptSmallX\u{1d501}: '𝔁'
MathematicalBoldScriptSmallY\u{1d502}: '𝔂'
MathematicalBoldScriptSmallZ\u{1d503}: '𝔃'
MathematicalFrakturCapitalA\u{1d504}: '𝔄'
MathematicalFrakturCapitalB\u{1d505}: '𝔅'
MathematicalFrakturCapitalD\u{1d507}: '𝔇'
MathematicalFrakturCapitalE\u{1d508}: '𝔈'
MathematicalFrakturCapitalF\u{1d509}: '𝔉'
MathematicalFrakturCapitalG\u{1d50a}: '𝔊'
MathematicalFrakturCapitalJ\u{1d50d}: '𝔍'
MathematicalFrakturCapitalK\u{1d50e}: '𝔎'
MathematicalFrakturCapitalL\u{1d50f}: '𝔏'
MathematicalFrakturCapitalM\u{1d510}: '𝔐'
MathematicalFrakturCapitalN\u{1d511}: '𝔑'
MathematicalFrakturCapitalO\u{1d512}: '𝔒'
MathematicalFrakturCapitalP\u{1d513}: '𝔓'
MathematicalFrakturCapitalQ\u{1d514}: '𝔔'
MathematicalFrakturCapitalS\u{1d516}: '𝔖'
MathematicalFrakturCapitalT\u{1d517}: '𝔗'
MathematicalFrakturCapitalU\u{1d518}: '𝔘'
MathematicalFrakturCapitalV\u{1d519}: '𝔙'
MathematicalFrakturCapitalW\u{1d51a}: '𝔚'
MathematicalFrakturCapitalX\u{1d51b}: '𝔛'
MathematicalFrakturCapitalY\u{1d51c}: '𝔜'
MathematicalFrakturSmallA\u{1d51e}: '𝔞'
MathematicalFrakturSmallB\u{1d51f}: '𝔟'
MathematicalFrakturSmallC\u{1d520}: '𝔠'
MathematicalFrakturSmallD\u{1d521}: '𝔡'
MathematicalFrakturSmallE\u{1d522}: '𝔢'
MathematicalFrakturSmallF\u{1d523}: '𝔣'
MathematicalFrakturSmallG\u{1d524}: '𝔤'
MathematicalFrakturSmallH\u{1d525}: '𝔥'
MathematicalFrakturSmallI\u{1d526}: '𝔦'
MathematicalFrakturSmallJ\u{1d527}: '𝔧'
MathematicalFrakturSmallK\u{1d528}: '𝔨'
MathematicalFrakturSmallL\u{1d529}: '𝔩'
MathematicalFrakturSmallM\u{1d52a}: '𝔪'
MathematicalFrakturSmallN\u{1d52b}: '𝔫'
MathematicalFrakturSmallO\u{1d52c}: '𝔬'
MathematicalFrakturSmallP\u{1d52d}: '𝔭'
MathematicalFrakturSmallQ\u{1d52e}: '𝔮'
MathematicalFrakturSmallR\u{1d52f}: '𝔯'
MathematicalFrakturSmallS\u{1d530}: '𝔰'
MathematicalFrakturSmallT\u{1d531}: '𝔱'
MathematicalFrakturSmallU\u{1d532}: '𝔲'
MathematicalFrakturSmallV\u{1d533}: '𝔳'
MathematicalFrakturSmallW\u{1d534}: '𝔴'
MathematicalFrakturSmallX\u{1d535}: '𝔵'
MathematicalFrakturSmallY\u{1d536}: '𝔶'
MathematicalFrakturSmallZ\u{1d537}: '𝔷'
MathematicalDoubleDashStruckCapitalA\u{1d538}: '𝔸'
MathematicalDoubleDashStruckCapitalB\u{1d539}: '𝔹'
MathematicalDoubleDashStruckCapitalD\u{1d53b}: '𝔻'
MathematicalDoubleDashStruckCapitalE\u{1d53c}: '𝔼'
MathematicalDoubleDashStruckCapitalF\u{1d53d}: '𝔽'
MathematicalDoubleDashStruckCapitalG\u{1d53e}: '𝔾'
MathematicalDoubleDashStruckCapitalI\u{1d540}: '𝕀'
MathematicalDoubleDashStruckCapitalJ\u{1d541}: '𝕁'
MathematicalDoubleDashStruckCapitalK\u{1d542}: '𝕂'
MathematicalDoubleDashStruckCapitalL\u{1d543}: '𝕃'
MathematicalDoubleDashStruckCapitalM\u{1d544}: '𝕄'
MathematicalDoubleDashStruckCapitalO\u{1d546}: '𝕆'
MathematicalDoubleDashStruckCapitalS\u{1d54a}: '𝕊'
MathematicalDoubleDashStruckCapitalT\u{1d54b}: '𝕋'
MathematicalDoubleDashStruckCapitalU\u{1d54c}: '𝕌'
MathematicalDoubleDashStruckCapitalV\u{1d54d}: '𝕍'
MathematicalDoubleDashStruckCapitalW\u{1d54e}: '𝕎'
MathematicalDoubleDashStruckCapitalX\u{1d54f}: '𝕏'
MathematicalDoubleDashStruckCapitalY\u{1d550}: '𝕐'
MathematicalDoubleDashStruckSmallA\u{1d552}: '𝕒'
MathematicalDoubleDashStruckSmallB\u{1d553}: '𝕓'
MathematicalDoubleDashStruckSmallC\u{1d554}: '𝕔'
MathematicalDoubleDashStruckSmallD\u{1d555}: '𝕕'
MathematicalDoubleDashStruckSmallE\u{1d556}: '𝕖'
MathematicalDoubleDashStruckSmallF\u{1d557}: '𝕗'
MathematicalDoubleDashStruckSmallG\u{1d558}: '𝕘'
MathematicalDoubleDashStruckSmallH\u{1d559}: '𝕙'
MathematicalDoubleDashStruckSmallI\u{1d55a}: '𝕚'
MathematicalDoubleDashStruckSmallJ\u{1d55b}: '𝕛'
MathematicalDoubleDashStruckSmallK\u{1d55c}: '𝕜'
MathematicalDoubleDashStruckSmallL\u{1d55d}: '𝕝'
MathematicalDoubleDashStruckSmallM\u{1d55e}: '𝕞'
MathematicalDoubleDashStruckSmallN\u{1d55f}: '𝕟'
MathematicalDoubleDashStruckSmallO\u{1d560}: '𝕠'
MathematicalDoubleDashStruckSmallP\u{1d561}: '𝕡'
MathematicalDoubleDashStruckSmallQ\u{1d562}: '𝕢'
MathematicalDoubleDashStruckSmallR\u{1d563}: '𝕣'
MathematicalDoubleDashStruckSmallS\u{1d564}: '𝕤'
MathematicalDoubleDashStruckSmallT\u{1d565}: '𝕥'
MathematicalDoubleDashStruckSmallU\u{1d566}: '𝕦'
MathematicalDoubleDashStruckSmallV\u{1d567}: '𝕧'
MathematicalDoubleDashStruckSmallW\u{1d568}: '𝕨'
MathematicalDoubleDashStruckSmallX\u{1d569}: '𝕩'
MathematicalDoubleDashStruckSmallY\u{1d56a}: '𝕪'
MathematicalDoubleDashStruckSmallZ\u{1d56b}: '𝕫'
MathematicalBoldFrakturCapitalA\u{1d56c}: '𝕬'
MathematicalBoldFrakturCapitalB\u{1d56d}: '𝕭'
MathematicalBoldFrakturCapitalC\u{1d56e}: '𝕮'
MathematicalBoldFrakturCapitalD\u{1d56f}: '𝕯'
MathematicalBoldFrakturCapitalE\u{1d570}: '𝕰'
MathematicalBoldFrakturCapitalF\u{1d571}: '𝕱'
MathematicalBoldFrakturCapitalG\u{1d572}: '𝕲'
MathematicalBoldFrakturCapitalH\u{1d573}: '𝕳'
MathematicalBoldFrakturCapitalI\u{1d574}: '𝕴'
MathematicalBoldFrakturCapitalJ\u{1d575}: '𝕵'
MathematicalBoldFrakturCapitalK\u{1d576}: '𝕶'
MathematicalBoldFrakturCapitalL\u{1d577}: '𝕷'
MathematicalBoldFrakturCapitalM\u{1d578}: '𝕸'
MathematicalBoldFrakturCapitalN\u{1d579}: '𝕹'
MathematicalBoldFrakturCapitalO\u{1d57a}: '𝕺'
MathematicalBoldFrakturCapitalP\u{1d57b}: '𝕻'
MathematicalBoldFrakturCapitalQ\u{1d57c}: '𝕼'
MathematicalBoldFrakturCapitalR\u{1d57d}: '𝕽'
MathematicalBoldFrakturCapitalS\u{1d57e}: '𝕾'
MathematicalBoldFrakturCapitalT\u{1d57f}: '𝕿'
MathematicalBoldFrakturCapitalU\u{1d580}: '𝖀'
MathematicalBoldFrakturCapitalV\u{1d581}: '𝖁'
MathematicalBoldFrakturCapitalW\u{1d582}: '𝖂'
MathematicalBoldFrakturCapitalX\u{1d583}: '𝖃'
MathematicalBoldFrakturCapitalY\u{1d584}: '𝖄'
MathematicalBoldFrakturCapitalZ\u{1d585}: '𝖅'
MathematicalBoldFrakturSmallA\u{1d586}: '𝖆'
MathematicalBoldFrakturSmallB\u{1d587}: '𝖇'
MathematicalBoldFrakturSmallC\u{1d588}: '𝖈'
MathematicalBoldFrakturSmallD\u{1d589}: '𝖉'
MathematicalBoldFrakturSmallE\u{1d58a}: '𝖊'
MathematicalBoldFrakturSmallF\u{1d58b}: '𝖋'
MathematicalBoldFrakturSmallG\u{1d58c}: '𝖌'
MathematicalBoldFrakturSmallH\u{1d58d}: '𝖍'
MathematicalBoldFrakturSmallI\u{1d58e}: '𝖎'
MathematicalBoldFrakturSmallJ\u{1d58f}: '𝖏'
MathematicalBoldFrakturSmallK\u{1d590}: '𝖐'
MathematicalBoldFrakturSmallL\u{1d591}: '𝖑'
MathematicalBoldFrakturSmallM\u{1d592}: '𝖒'
MathematicalBoldFrakturSmallN\u{1d593}: '𝖓'
MathematicalBoldFrakturSmallO\u{1d594}: '𝖔'
MathematicalBoldFrakturSmallP\u{1d595}: '𝖕'
MathematicalBoldFrakturSmallQ\u{1d596}: '𝖖'
MathematicalBoldFrakturSmallR\u{1d597}: '𝖗'
MathematicalBoldFrakturSmallS\u{1d598}: '𝖘'
MathematicalBoldFrakturSmallT\u{1d599}: '𝖙'
MathematicalBoldFrakturSmallU\u{1d59a}: '𝖚'
MathematicalBoldFrakturSmallV\u{1d59b}: '𝖛'
MathematicalBoldFrakturSmallW\u{1d59c}: '𝖜'
MathematicalBoldFrakturSmallX\u{1d59d}: '𝖝'
MathematicalBoldFrakturSmallY\u{1d59e}: '𝖞'
MathematicalBoldFrakturSmallZ\u{1d59f}: '𝖟'
MathematicalSansDashSerifCapitalA\u{1d5a0}: '𝖠'
MathematicalSansDashSerifCapitalB\u{1d5a1}: '𝖡'
MathematicalSansDashSerifCapitalC\u{1d5a2}: '𝖢'
MathematicalSansDashSerifCapitalD\u{1d5a3}: '𝖣'
MathematicalSansDashSerifCapitalE\u{1d5a4}: '𝖤'
MathematicalSansDashSerifCapitalF\u{1d5a5}: '𝖥'
MathematicalSansDashSerifCapitalG\u{1d5a6}: '𝖦'
MathematicalSansDashSerifCapitalH\u{1d5a7}: '𝖧'
MathematicalSansDashSerifCapitalI\u{1d5a8}: '𝖨'
MathematicalSansDashSerifCapitalJ\u{1d5a9}: '𝖩'
MathematicalSansDashSerifCapitalK\u{1d5aa}: '𝖪'
MathematicalSansDashSerifCapitalL\u{1d5ab}: '𝖫'
MathematicalSansDashSerifCapitalM\u{1d5ac}: '𝖬'
MathematicalSansDashSerifCapitalN\u{1d5ad}: '𝖭'
MathematicalSansDashSerifCapitalO\u{1d5ae}: '𝖮'
MathematicalSansDashSerifCapitalP\u{1d5af}: '𝖯'
MathematicalSansDashSerifCapitalQ\u{1d5b0}: '𝖰'
MathematicalSansDashSerifCapitalR\u{1d5b1}: '𝖱'
MathematicalSansDashSerifCapitalS\u{1d5b2}: '𝖲'
MathematicalSansDashSerifCapitalT\u{1d5b3}: '𝖳'
MathematicalSansDashSerifCapitalU\u{1d5b4}: '𝖴'
MathematicalSansDashSerifCapitalV\u{1d5b5}: '𝖵'
MathematicalSansDashSerifCapitalW\u{1d5b6}: '𝖶'
MathematicalSansDashSerifCapitalX\u{1d5b7}: '𝖷'
MathematicalSansDashSerifCapitalY\u{1d5b8}: '𝖸'
MathematicalSansDashSerifCapitalZ\u{1d5b9}: '𝖹'
MathematicalSansDashSerifSmallA\u{1d5ba}: '𝖺'
MathematicalSansDashSerifSmallB\u{1d5bb}: '𝖻'
MathematicalSansDashSerifSmallC\u{1d5bc}: '𝖼'
MathematicalSansDashSerifSmallD\u{1d5bd}: '𝖽'
MathematicalSansDashSerifSmallE\u{1d5be}: '𝖾'
MathematicalSansDashSerifSmallF\u{1d5bf}: '𝖿'
MathematicalSansDashSerifSmallG\u{1d5c0}: '𝗀'
MathematicalSansDashSerifSmallH\u{1d5c1}: '𝗁'
MathematicalSansDashSerifSmallI\u{1d5c2}: '𝗂'
MathematicalSansDashSerifSmallJ\u{1d5c3}: '𝗃'
MathematicalSansDashSerifSmallK\u{1d5c4}: '𝗄'
MathematicalSansDashSerifSmallL\u{1d5c5}: '𝗅'
MathematicalSansDashSerifSmallM\u{1d5c6}: '𝗆'
MathematicalSansDashSerifSmallN\u{1d5c7}: '𝗇'
MathematicalSansDashSerifSmallO\u{1d5c8}: '𝗈'
MathematicalSansDashSerifSmallP\u{1d5c9}: '𝗉'
MathematicalSansDashSerifSmallQ\u{1d5ca}: '𝗊'
MathematicalSansDashSerifSmallR\u{1d5cb}: '𝗋'
MathematicalSansDashSerifSmallS\u{1d5cc}: '𝗌'
MathematicalSansDashSerifSmallT\u{1d5cd}: '𝗍'
MathematicalSansDashSerifSmallU\u{1d5ce}: '𝗎'
MathematicalSansDashSerifSmallV\u{1d5cf}: '𝗏'
MathematicalSansDashSerifSmallW\u{1d5d0}: '𝗐'
MathematicalSansDashSerifSmallX\u{1d5d1}: '𝗑'
MathematicalSansDashSerifSmallY\u{1d5d2}: '𝗒'
MathematicalSansDashSerifSmallZ\u{1d5d3}: '𝗓'
MathematicalSansDashSerifBoldCapitalA\u{1d5d4}: '𝗔'
MathematicalSansDashSerifBoldCapitalB\u{1d5d5}: '𝗕'
MathematicalSansDashSerifBoldCapitalC\u{1d5d6}: '𝗖'
MathematicalSansDashSerifBoldCapitalD\u{1d5d7}: '𝗗'
MathematicalSansDashSerifBoldCapitalE\u{1d5d8}: '𝗘'
MathematicalSansDashSerifBoldCapitalF\u{1d5d9}: '𝗙'
MathematicalSansDashSerifBoldCapitalG\u{1d5da}: '𝗚'
MathematicalSansDashSerifBoldCapitalH\u{1d5db}: '𝗛'
MathematicalSansDashSerifBoldCapitalI\u{1d5dc}: '𝗜'
MathematicalSansDashSerifBoldCapitalJ\u{1d5dd}: '𝗝'
MathematicalSansDashSerifBoldCapitalK\u{1d5de}: '𝗞'
MathematicalSansDashSerifBoldCapitalL\u{1d5df}: '𝗟'
MathematicalSansDashSerifBoldCapitalM\u{1d5e0}: '𝗠'
MathematicalSansDashSerifBoldCapitalN\u{1d5e1}: '𝗡'
MathematicalSansDashSerifBoldCapitalO\u{1d5e2}: '𝗢'
MathematicalSansDashSerifBoldCapitalP\u{1d5e3}: '𝗣'
MathematicalSansDashSerifBoldCapitalQ\u{1d5e4}: '𝗤'
MathematicalSansDashSerifBoldCapitalR\u{1d5e5}: '𝗥'
MathematicalSansDashSerifBoldCapitalS\u{1d5e6}: '𝗦'
MathematicalSansDashSerifBoldCapitalT\u{1d5e7}: '𝗧'
MathematicalSansDashSerifBoldCapitalU\u{1d5e8}: '𝗨'
MathematicalSansDashSerifBoldCapitalV\u{1d5e9}: '𝗩'
MathematicalSansDashSerifBoldCapitalW\u{1d5ea}: '𝗪'
MathematicalSansDashSerifBoldCapitalX\u{1d5eb}: '𝗫'
MathematicalSansDashSerifBoldCapitalY\u{1d5ec}: '𝗬'
MathematicalSansDashSerifBoldCapitalZ\u{1d5ed}: '𝗭'
MathematicalSansDashSerifBoldSmallA\u{1d5ee}: '𝗮'
MathematicalSansDashSerifBoldSmallB\u{1d5ef}: '𝗯'
MathematicalSansDashSerifBoldSmallC\u{1d5f0}: '𝗰'
MathematicalSansDashSerifBoldSmallD\u{1d5f1}: '𝗱'
MathematicalSansDashSerifBoldSmallE\u{1d5f2}: '𝗲'
MathematicalSansDashSerifBoldSmallF\u{1d5f3}: '𝗳'
MathematicalSansDashSerifBoldSmallG\u{1d5f4}: '𝗴'
MathematicalSansDashSerifBoldSmallH\u{1d5f5}: '𝗵'
MathematicalSansDashSerifBoldSmallI\u{1d5f6}: '𝗶'
MathematicalSansDashSerifBoldSmallJ\u{1d5f7}: '𝗷'
MathematicalSansDashSerifBoldSmallK\u{1d5f8}: '𝗸'
MathematicalSansDashSerifBoldSmallL\u{1d5f9}: '𝗹'
MathematicalSansDashSerifBoldSmallM\u{1d5fa}: '𝗺'
MathematicalSansDashSerifBoldSmallN\u{1d5fb}: '𝗻'
MathematicalSansDashSerifBoldSmallO\u{1d5fc}: '𝗼'
MathematicalSansDashSerifBoldSmallP\u{1d5fd}: '𝗽'
MathematicalSansDashSerifBoldSmallQ\u{1d5fe}: '𝗾'
MathematicalSansDashSerifBoldSmallR\u{1d5ff}: '𝗿'
MathematicalSansDashSerifBoldSmallS\u{1d600}: '𝘀'
MathematicalSansDashSerifBoldSmallT\u{1d601}: '𝘁'
MathematicalSansDashSerifBoldSmallU\u{1d602}: '𝘂'
MathematicalSansDashSerifBoldSmallV\u{1d603}: '𝘃'
MathematicalSansDashSerifBoldSmallW\u{1d604}: '𝘄'
MathematicalSansDashSerifBoldSmallX\u{1d605}: '𝘅'
MathematicalSansDashSerifBoldSmallY\u{1d606}: '𝘆'
MathematicalSansDashSerifBoldSmallZ\u{1d607}: '𝘇'
MathematicalSansDashSerifItalicCapitalA\u{1d608}: '𝘈'
MathematicalSansDashSerifItalicCapitalB\u{1d609}: '𝘉'
MathematicalSansDashSerifItalicCapitalC\u{1d60a}: '𝘊'
MathematicalSansDashSerifItalicCapitalD\u{1d60b}: '𝘋'
MathematicalSansDashSerifItalicCapitalE\u{1d60c}: '𝘌'
MathematicalSansDashSerifItalicCapitalF\u{1d60d}: '𝘍'
MathematicalSansDashSerifItalicCapitalG\u{1d60e}: '𝘎'
MathematicalSansDashSerifItalicCapitalH\u{1d60f}: '𝘏'
MathematicalSansDashSerifItalicCapitalI\u{1d610}: '𝘐'
MathematicalSansDashSerifItalicCapitalJ\u{1d611}: '𝘑'
MathematicalSansDashSerifItalicCapitalK\u{1d612}: '𝘒'
MathematicalSansDashSerifItalicCapitalL\u{1d613}: '𝘓'
MathematicalSansDashSerifItalicCapitalM\u{1d614}: '𝘔'
MathematicalSansDashSerifItalicCapitalN\u{1d615}: '𝘕'
MathematicalSansDashSerifItalicCapitalO\u{1d616}: '𝘖'
MathematicalSansDashSerifItalicCapitalP\u{1d617}: '𝘗'
MathematicalSansDashSerifItalicCapitalQ\u{1d618}: '𝘘'
MathematicalSansDashSerifItalicCapitalR\u{1d619}: '𝘙'
MathematicalSansDashSerifItalicCapitalS\u{1d61a}: '𝘚'
MathematicalSansDashSerifItalicCapitalT\u{1d61b}: '𝘛'
MathematicalSansDashSerifItalicCapitalU\u{1d61c}: '𝘜'
MathematicalSansDashSerifItalicCapitalV\u{1d61d}: '𝘝'
MathematicalSansDashSerifItalicCapitalW\u{1d61e}: '𝘞'
MathematicalSansDashSerifItalicCapitalX\u{1d61f}: '𝘟'
MathematicalSansDashSerifItalicCapitalY\u{1d620}: '𝘠'
MathematicalSansDashSerifItalicCapitalZ\u{1d621}: '𝘡'
MathematicalSansDashSerifItalicSmallA\u{1d622}: '𝘢'
MathematicalSansDashSerifItalicSmallB\u{1d623}: '𝘣'
MathematicalSansDashSerifItalicSmallC\u{1d624}: '𝘤'
MathematicalSansDashSerifItalicSmallD\u{1d625}: '𝘥'
MathematicalSansDashSerifItalicSmallE\u{1d626}: '𝘦'
MathematicalSansDashSerifItalicSmallF\u{1d627}: '𝘧'
MathematicalSansDashSerifItalicSmallG\u{1d628}: '𝘨'
MathematicalSansDashSerifItalicSmallH\u{1d629}: '𝘩'
MathematicalSansDashSerifItalicSmallI\u{1d62a}: '𝘪'
MathematicalSansDashSerifItalicSmallJ\u{1d62b}: '𝘫'
MathematicalSansDashSerifItalicSmallK\u{1d62c}: '𝘬'
MathematicalSansDashSerifItalicSmallL\u{1d62d}: '𝘭'
MathematicalSansDashSerifItalicSmallM\u{1d62e}: '𝘮'
MathematicalSansDashSerifItalicSmallN\u{1d62f}: '𝘯'
MathematicalSansDashSerifItalicSmallO\u{1d630}: '𝘰'
MathematicalSansDashSerifItalicSmallP\u{1d631}: '𝘱'
MathematicalSansDashSerifItalicSmallQ\u{1d632}: '𝘲'
MathematicalSansDashSerifItalicSmallR\u{1d633}: '𝘳'
MathematicalSansDashSerifItalicSmallS\u{1d634}: '𝘴'
MathematicalSansDashSerifItalicSmallT\u{1d635}: '𝘵'
MathematicalSansDashSerifItalicSmallU\u{1d636}: '𝘶'
MathematicalSansDashSerifItalicSmallV\u{1d637}: '𝘷'
MathematicalSansDashSerifItalicSmallW\u{1d638}: '𝘸'
MathematicalSansDashSerifItalicSmallX\u{1d639}: '𝘹'
MathematicalSansDashSerifItalicSmallY\u{1d63a}: '𝘺'
MathematicalSansDashSerifItalicSmallZ\u{1d63b}: '𝘻'
MathematicalSansDashSerifBoldItalicCapitalA\u{1d63c}: '𝘼'
MathematicalSansDashSerifBoldItalicCapitalB\u{1d63d}: '𝘽'
MathematicalSansDashSerifBoldItalicCapitalC\u{1d63e}: '𝘾'
MathematicalSansDashSerifBoldItalicCapitalD\u{1d63f}: '𝘿'
MathematicalSansDashSerifBoldItalicCapitalE\u{1d640}: '𝙀'
MathematicalSansDashSerifBoldItalicCapitalF\u{1d641}: '𝙁'
MathematicalSansDashSerifBoldItalicCapitalG\u{1d642}: '𝙂'
MathematicalSansDashSerifBoldItalicCapitalH\u{1d643}: '𝙃'
MathematicalSansDashSerifBoldItalicCapitalI\u{1d644}: '𝙄'
MathematicalSansDashSerifBoldItalicCapitalJ\u{1d645}: '𝙅'
MathematicalSansDashSerifBoldItalicCapitalK\u{1d646}: '𝙆'
MathematicalSansDashSerifBoldItalicCapitalL\u{1d647}: '𝙇'
MathematicalSansDashSerifBoldItalicCapitalM\u{1d648}: '𝙈'
MathematicalSansDashSerifBoldItalicCapitalN\u{1d649}: '𝙉'
MathematicalSansDashSerifBoldItalicCapitalO\u{1d64a}: '𝙊'
MathematicalSansDashSerifBoldItalicCapitalP\u{1d64b}: '𝙋'
MathematicalSansDashSerifBoldItalicCapitalQ\u{1d64c}: '𝙌'
MathematicalSansDashSerifBoldItalicCapitalR\u{1d64d}: '𝙍'
MathematicalSansDashSerifBoldItalicCapitalS\u{1d64e}: '𝙎'
MathematicalSansDashSerifBoldItalicCapitalT\u{1d64f}: '𝙏'
MathematicalSansDashSerifBoldItalicCapitalU\u{1d650}: '𝙐'
MathematicalSansDashSerifBoldItalicCapitalV\u{1d651}: '𝙑'
MathematicalSansDashSerifBoldItalicCapitalW\u{1d652}: '𝙒'
MathematicalSansDashSerifBoldItalicCapitalX\u{1d653}: '𝙓'
MathematicalSansDashSerifBoldItalicCapitalY\u{1d654}: '𝙔'
MathematicalSansDashSerifBoldItalicCapitalZ\u{1d655}: '𝙕'
MathematicalSansDashSerifBoldItalicSmallA\u{1d656}: '𝙖'
MathematicalSansDashSerifBoldItalicSmallB\u{1d657}: '𝙗'
MathematicalSansDashSerifBoldItalicSmallC\u{1d658}: '𝙘'
MathematicalSansDashSerifBoldItalicSmallD\u{1d659}: '𝙙'
MathematicalSansDashSerifBoldItalicSmallE\u{1d65a}: '𝙚'
MathematicalSansDashSerifBoldItalicSmallF\u{1d65b}: '𝙛'
MathematicalSansDashSerifBoldItalicSmallG\u{1d65c}: '𝙜'
MathematicalSansDashSerifBoldItalicSmallH\u{1d65d}: '𝙝'
MathematicalSansDashSerifBoldItalicSmallI\u{1d65e}: '𝙞'
MathematicalSansDashSerifBoldItalicSmallJ\u{1d65f}: '𝙟'
MathematicalSansDashSerifBoldItalicSmallK\u{1d660}: '𝙠'
MathematicalSansDashSerifBoldItalicSmallL\u{1d661}: '𝙡'
MathematicalSansDashSerifBoldItalicSmallM\u{1d662}: '𝙢'
MathematicalSansDashSerifBoldItalicSmallN\u{1d663}: '𝙣'
MathematicalSansDashSerifBoldItalicSmallO\u{1d664}: '𝙤'
MathematicalSansDashSerifBoldItalicSmallP\u{1d665}: '𝙥'
MathematicalSansDashSerifBoldItalicSmallQ\u{1d666}: '𝙦'
MathematicalSansDashSerifBoldItalicSmallR\u{1d667}: '𝙧'
MathematicalSansDashSerifBoldItalicSmallS\u{1d668}: '𝙨'
MathematicalSansDashSerifBoldItalicSmallT\u{1d669}: '𝙩'
MathematicalSansDashSerifBoldItalicSmallU\u{1d66a}: '𝙪'
MathematicalSansDashSerifBoldItalicSmallV\u{1d66b}: '𝙫'
MathematicalSansDashSerifBoldItalicSmallW\u{1d66c}: '𝙬'
MathematicalSansDashSerifBoldItalicSmallX\u{1d66d}: '𝙭'
MathematicalSansDashSerifBoldItalicSmallY\u{1d66e}: '𝙮'
MathematicalSansDashSerifBoldItalicSmallZ\u{1d66f}: '𝙯'
MathematicalMonospaceCapitalA\u{1d670}: '𝙰'
MathematicalMonospaceCapitalB\u{1d671}: '𝙱'
MathematicalMonospaceCapitalC\u{1d672}: '𝙲'
MathematicalMonospaceCapitalD\u{1d673}: '𝙳'
MathematicalMonospaceCapitalE\u{1d674}: '𝙴'
MathematicalMonospaceCapitalF\u{1d675}: '𝙵'
MathematicalMonospaceCapitalG\u{1d676}: '𝙶'
MathematicalMonospaceCapitalH\u{1d677}: '𝙷'
MathematicalMonospaceCapitalI\u{1d678}: '𝙸'
MathematicalMonospaceCapitalJ\u{1d679}: '𝙹'
MathematicalMonospaceCapitalK\u{1d67a}: '𝙺'
MathematicalMonospaceCapitalL\u{1d67b}: '𝙻'
MathematicalMonospaceCapitalM\u{1d67c}: '𝙼'
MathematicalMonospaceCapitalN\u{1d67d}: '𝙽'
MathematicalMonospaceCapitalO\u{1d67e}: '𝙾'
MathematicalMonospaceCapitalP\u{1d67f}: '𝙿'
MathematicalMonospaceCapitalQ\u{1d680}: '𝚀'
MathematicalMonospaceCapitalR\u{1d681}: '𝚁'
MathematicalMonospaceCapitalS\u{1d682}: '𝚂'
MathematicalMonospaceCapitalT\u{1d683}: '𝚃'
MathematicalMonospaceCapitalU\u{1d684}: '𝚄'
MathematicalMonospaceCapitalV\u{1d685}: '𝚅'
MathematicalMonospaceCapitalW\u{1d686}: '𝚆'
MathematicalMonospaceCapitalX\u{1d687}: '𝚇'
MathematicalMonospaceCapitalY\u{1d688}: '𝚈'
MathematicalMonospaceCapitalZ\u{1d689}: '𝚉'
MathematicalMonospaceSmallA\u{1d68a}: '𝚊'
MathematicalMonospaceSmallB\u{1d68b}: '𝚋'
MathematicalMonospaceSmallC\u{1d68c}: '𝚌'
MathematicalMonospaceSmallD\u{1d68d}: '𝚍'
MathematicalMonospaceSmallE\u{1d68e}: '𝚎'
MathematicalMonospaceSmallF\u{1d68f}: '𝚏'
MathematicalMonospaceSmallG\u{1d690}: '𝚐'
MathematicalMonospaceSmallH\u{1d691}: '𝚑'
MathematicalMonospaceSmallI\u{1d692}: '𝚒'
MathematicalMonospaceSmallJ\u{1d693}: '𝚓'
MathematicalMonospaceSmallK\u{1d694}: '𝚔'
MathematicalMonospaceSmallL\u{1d695}: '𝚕'
MathematicalMonospaceSmallM\u{1d696}: '𝚖'
MathematicalMonospaceSmallN\u{1d697}: '𝚗'
MathematicalMonospaceSmallO\u{1d698}: '𝚘'
MathematicalMonospaceSmallP\u{1d699}: '𝚙'
MathematicalMonospaceSmallQ\u{1d69a}: '𝚚'
MathematicalMonospaceSmallR\u{1d69b}: '𝚛'
MathematicalMonospaceSmallS\u{1d69c}: '𝚜'
MathematicalMonospaceSmallT\u{1d69d}: '𝚝'
MathematicalMonospaceSmallU\u{1d69e}: '𝚞'
MathematicalMonospaceSmallV\u{1d69f}: '𝚟'
MathematicalMonospaceSmallW\u{1d6a0}: '𝚠'
MathematicalMonospaceSmallX\u{1d6a1}: '𝚡'
MathematicalMonospaceSmallY\u{1d6a2}: '𝚢'
MathematicalMonospaceSmallZ\u{1d6a3}: '𝚣'
MathematicalItalicSmallDotlessI\u{1d6a4}: '𝚤'
MathematicalItalicSmallDotlessJ\u{1d6a5}: '𝚥'
MathematicalBoldCapitalAlpha\u{1d6a8}: '𝚨'
MathematicalBoldCapitalBeta\u{1d6a9}: '𝚩'
MathematicalBoldCapitalGamma\u{1d6aa}: '𝚪'
MathematicalBoldCapitalDelta\u{1d6ab}: '𝚫'
MathematicalBoldCapitalEpsilon\u{1d6ac}: '𝚬'
MathematicalBoldCapitalZeta\u{1d6ad}: '𝚭'
MathematicalBoldCapitalEta\u{1d6ae}: '𝚮'
MathematicalBoldCapitalTheta\u{1d6af}: '𝚯'
MathematicalBoldCapitalIota\u{1d6b0}: '𝚰'
MathematicalBoldCapitalKappa\u{1d6b1}: '𝚱'
MathematicalBoldCapitalLamda\u{1d6b2}: '𝚲'
MathematicalBoldCapitalMu\u{1d6b3}: '𝚳'
MathematicalBoldCapitalNu\u{1d6b4}: '𝚴'
MathematicalBoldCapitalXi\u{1d6b5}: '𝚵'
MathematicalBoldCapitalOmicron\u{1d6b6}: '𝚶'
MathematicalBoldCapitalPi\u{1d6b7}: '𝚷'
MathematicalBoldCapitalRho\u{1d6b8}: '𝚸'
MathematicalBoldCapitalThetaSymbol\u{1d6b9}: '𝚹'
MathematicalBoldCapitalSigma\u{1d6ba}: '𝚺'
MathematicalBoldCapitalTau\u{1d6bb}: '𝚻'
MathematicalBoldCapitalUpsilon\u{1d6bc}: '𝚼'
MathematicalBoldCapitalPhi\u{1d6bd}: '𝚽'
MathematicalBoldCapitalChi\u{1d6be}: '𝚾'
MathematicalBoldCapitalPsi\u{1d6bf}: '𝚿'
MathematicalBoldCapitalOmega\u{1d6c0}: '𝛀'
MathematicalBoldNabla\u{1d6c1}: '𝛁'
MathematicalBoldSmallAlpha\u{1d6c2}: '𝛂'
MathematicalBoldSmallBeta\u{1d6c3}: '𝛃'
MathematicalBoldSmallGamma\u{1d6c4}: '𝛄'
MathematicalBoldSmallDelta\u{1d6c5}: '𝛅'
MathematicalBoldSmallEpsilon\u{1d6c6}: '𝛆'
MathematicalBoldSmallZeta\u{1d6c7}: '𝛇'
MathematicalBoldSmallEta\u{1d6c8}: '𝛈'
MathematicalBoldSmallTheta\u{1d6c9}: '𝛉'
MathematicalBoldSmallIota\u{1d6ca}: '𝛊'
MathematicalBoldSmallKappa\u{1d6cb}: '𝛋'
MathematicalBoldSmallLamda\u{1d6cc}: '𝛌'
MathematicalBoldSmallMu\u{1d6cd}: '𝛍'
MathematicalBoldSmallNu\u{1d6ce}: '𝛎'
MathematicalBoldSmallXi\u{1d6cf}: '𝛏'
MathematicalBoldSmallOmicron\u{1d6d0}: '𝛐'
MathematicalBoldSmallPi\u{1d6d1}: '𝛑'
MathematicalBoldSmallRho\u{1d6d2}: '𝛒'
MathematicalBoldSmallFinalSigma\u{1d6d3}: '𝛓'
MathematicalBoldSmallSigma\u{1d6d4}: '𝛔'
MathematicalBoldSmallTau\u{1d6d5}: '𝛕'
MathematicalBoldSmallUpsilon\u{1d6d6}: '𝛖'
MathematicalBoldSmallPhi\u{1d6d7}: '𝛗'
MathematicalBoldSmallChi\u{1d6d8}: '𝛘'
MathematicalBoldSmallPsi\u{1d6d9}: '𝛙'
MathematicalBoldSmallOmega\u{1d6da}: '𝛚'
MathematicalBoldPartialDifferential\u{1d6db}: '𝛛'
MathematicalBoldEpsilonSymbol\u{1d6dc}: '𝛜'
MathematicalBoldThetaSymbol\u{1d6dd}: '𝛝'
MathematicalBoldKappaSymbol\u{1d6de}: '𝛞'
MathematicalBoldPhiSymbol\u{1d6df}: '𝛟'
MathematicalBoldRhoSymbol\u{1d6e0}: '𝛠'
MathematicalBoldPiSymbol\u{1d6e1}: '𝛡'
MathematicalItalicCapitalAlpha\u{1d6e2}: '𝛢'
MathematicalItalicCapitalBeta\u{1d6e3}: '𝛣'
MathematicalItalicCapitalGamma\u{1d6e4}: '𝛤'
MathematicalItalicCapitalDelta\u{1d6e5}: '𝛥'
MathematicalItalicCapitalEpsilon\u{1d6e6}: '𝛦'
MathematicalItalicCapitalZeta\u{1d6e7}: '𝛧'
MathematicalItalicCapitalEta\u{1d6e8}: '𝛨'
MathematicalItalicCapitalTheta\u{1d6e9}: '𝛩'
MathematicalItalicCapitalIota\u{1d6ea}: '𝛪'
MathematicalItalicCapitalKappa\u{1d6eb}: '𝛫'
MathematicalItalicCapitalLamda\u{1d6ec}: '𝛬'
MathematicalItalicCapitalMu\u{1d6ed}: '𝛭'
MathematicalItalicCapitalNu\u{1d6ee}: '𝛮'
MathematicalItalicCapitalXi\u{1d6ef}: '𝛯'
MathematicalItalicCapitalOmicron\u{1d6f0}: '𝛰'
MathematicalItalicCapitalPi\u{1d6f1}: '𝛱'
MathematicalItalicCapitalRho\u{1d6f2}: '𝛲'
MathematicalItalicCapitalThetaSymbol\u{1d6f3}: '𝛳'
MathematicalItalicCapitalSigma\u{1d6f4}: '𝛴'
MathematicalItalicCapitalTau\u{1d6f5}: '𝛵'
MathematicalItalicCapitalUpsilon\u{1d6f6}: '𝛶'
MathematicalItalicCapitalPhi\u{1d6f7}: '𝛷'
MathematicalItalicCapitalChi\u{1d6f8}: '𝛸'
MathematicalItalicCapitalPsi\u{1d6f9}: '𝛹'
MathematicalItalicCapitalOmega\u{1d6fa}: '𝛺'
MathematicalItalicNabla\u{1d6fb}: '𝛻'
MathematicalItalicSmallAlpha\u{1d6fc}: '𝛼'
MathematicalItalicSmallBeta\u{1d6fd}: '𝛽'
MathematicalItalicSmallGamma\u{1d6fe}: '𝛾'
MathematicalItalicSmallDelta\u{1d6ff}: '𝛿'
MathematicalItalicSmallEpsilon\u{1d700}: '𝜀'
MathematicalItalicSmallZeta\u{1d701}: '𝜁'
MathematicalItalicSmallEta\u{1d702}: '𝜂'
MathematicalItalicSmallTheta\u{1d703}: '𝜃'
MathematicalItalicSmallIota\u{1d704}: '𝜄'
MathematicalItalicSmallKappa\u{1d705}: '𝜅'
MathematicalItalicSmallLamda\u{1d706}: '𝜆'
MathematicalItalicSmallMu\u{1d707}: '𝜇'
MathematicalItalicSmallNu\u{1d708}: '𝜈'
MathematicalItalicSmallXi\u{1d709}: '𝜉'
MathematicalItalicSmallOmicron\u{1d70a}: '𝜊'
MathematicalItalicSmallPi\u{1d70b}: '𝜋'
MathematicalItalicSmallRho\u{1d70c}: '𝜌'
MathematicalItalicSmallFinalSigma\u{1d70d}: '𝜍'
MathematicalItalicSmallSigma\u{1d70e}: '𝜎'
MathematicalItalicSmallTau\u{1d70f}: '𝜏'
MathematicalItalicSmallUpsilon\u{1d710}: '𝜐'
MathematicalItalicSmallPhi\u{1d711}: '𝜑'
MathematicalItalicSmallChi\u{1d712}: '𝜒'
MathematicalItalicSmallPsi\u{1d713}: '𝜓'
MathematicalItalicSmallOmega\u{1d714}: '𝜔'
MathematicalItalicPartialDifferential\u{1d715}: '𝜕'
MathematicalItalicEpsilonSymbol\u{1d716}: '𝜖'
MathematicalItalicThetaSymbol\u{1d717}: '𝜗'
MathematicalItalicKappaSymbol\u{1d718}: '𝜘'
MathematicalItalicPhiSymbol\u{1d719}: '𝜙'
MathematicalItalicRhoSymbol\u{1d71a}: '𝜚'
MathematicalItalicPiSymbol\u{1d71b}: '𝜛'
MathematicalBoldItalicCapitalAlpha\u{1d71c}: '𝜜'
MathematicalBoldItalicCapitalBeta\u{1d71d}: '𝜝'
MathematicalBoldItalicCapitalGamma\u{1d71e}: '𝜞'
MathematicalBoldItalicCapitalDelta\u{1d71f}: '𝜟'
MathematicalBoldItalicCapitalEpsilon\u{1d720}: '𝜠'
MathematicalBoldItalicCapitalZeta\u{1d721}: '𝜡'
MathematicalBoldItalicCapitalEta\u{1d722}: '𝜢'
MathematicalBoldItalicCapitalTheta\u{1d723}: '𝜣'
MathematicalBoldItalicCapitalIota\u{1d724}: '𝜤'
MathematicalBoldItalicCapitalKappa\u{1d725}: '𝜥'
MathematicalBoldItalicCapitalLamda\u{1d726}: '𝜦'
MathematicalBoldItalicCapitalMu\u{1d727}: '𝜧'
MathematicalBoldItalicCapitalNu\u{1d728}: '𝜨'
MathematicalBoldItalicCapitalXi\u{1d729}: '𝜩'
MathematicalBoldItalicCapitalOmicron\u{1d72a}: '𝜪'
MathematicalBoldItalicCapitalPi\u{1d72b}: '𝜫'
MathematicalBoldItalicCapitalRho\u{1d72c}: '𝜬'
MathematicalBoldItalicCapitalThetaSymbol\u{1d72d}: '𝜭'
MathematicalBoldItalicCapitalSigma\u{1d72e}: '𝜮'
MathematicalBoldItalicCapitalTau\u{1d72f}: '𝜯'
MathematicalBoldItalicCapitalUpsilon\u{1d730}: '𝜰'
MathematicalBoldItalicCapitalPhi\u{1d731}: '𝜱'
MathematicalBoldItalicCapitalChi\u{1d732}: '𝜲'
MathematicalBoldItalicCapitalPsi\u{1d733}: '𝜳'
MathematicalBoldItalicCapitalOmega\u{1d734}: '𝜴'
MathematicalBoldItalicNabla\u{1d735}: '𝜵'
MathematicalBoldItalicSmallAlpha\u{1d736}: '𝜶'
MathematicalBoldItalicSmallBeta\u{1d737}: '𝜷'
MathematicalBoldItalicSmallGamma\u{1d738}: '𝜸'
MathematicalBoldItalicSmallDelta\u{1d739}: '𝜹'
MathematicalBoldItalicSmallEpsilon\u{1d73a}: '𝜺'
MathematicalBoldItalicSmallZeta\u{1d73b}: '𝜻'
MathematicalBoldItalicSmallEta\u{1d73c}: '𝜼'
MathematicalBoldItalicSmallTheta\u{1d73d}: '𝜽'
MathematicalBoldItalicSmallIota\u{1d73e}: '𝜾'
MathematicalBoldItalicSmallKappa\u{1d73f}: '𝜿'
MathematicalBoldItalicSmallLamda\u{1d740}: '𝝀'
MathematicalBoldItalicSmallMu\u{1d741}: '𝝁'
MathematicalBoldItalicSmallNu\u{1d742}: '𝝂'
MathematicalBoldItalicSmallXi\u{1d743}: '𝝃'
MathematicalBoldItalicSmallOmicron\u{1d744}: '𝝄'
MathematicalBoldItalicSmallPi\u{1d745}: '𝝅'
MathematicalBoldItalicSmallRho\u{1d746}: '𝝆'
MathematicalBoldItalicSmallFinalSigma\u{1d747}: '𝝇'
MathematicalBoldItalicSmallSigma\u{1d748}: '𝝈'
MathematicalBoldItalicSmallTau\u{1d749}: '𝝉'
MathematicalBoldItalicSmallUpsilon\u{1d74a}: '𝝊'
MathematicalBoldItalicSmallPhi\u{1d74b}: '𝝋'
MathematicalBoldItalicSmallChi\u{1d74c}: '𝝌'
MathematicalBoldItalicSmallPsi\u{1d74d}: '𝝍'
MathematicalBoldItalicSmallOmega\u{1d74e}: '𝝎'
MathematicalBoldItalicPartialDifferential\u{1d74f}: '𝝏'
MathematicalBoldItalicEpsilonSymbol\u{1d750}: '𝝐'
MathematicalBoldItalicThetaSymbol\u{1d751}: '𝝑'
MathematicalBoldItalicKappaSymbol\u{1d752}: '𝝒'
MathematicalBoldItalicPhiSymbol\u{1d753}: '𝝓'
MathematicalBoldItalicRhoSymbol\u{1d754}: '𝝔'
MathematicalBoldItalicPiSymbol\u{1d755}: '𝝕'
MathematicalSansDashSerifBoldCapitalAlpha\u{1d756}: '𝝖'
MathematicalSansDashSerifBoldCapitalBeta\u{1d757}: '𝝗'
MathematicalSansDashSerifBoldCapitalGamma\u{1d758}: '𝝘'
MathematicalSansDashSerifBoldCapitalDelta\u{1d759}: '𝝙'
MathematicalSansDashSerifBoldCapitalEpsilon\u{1d75a}: '𝝚'
MathematicalSansDashSerifBoldCapitalZeta\u{1d75b}: '𝝛'
MathematicalSansDashSerifBoldCapitalEta\u{1d75c}: '𝝜'
MathematicalSansDashSerifBoldCapitalTheta\u{1d75d}: '𝝝'
MathematicalSansDashSerifBoldCapitalIota\u{1d75e}: '𝝞'
MathematicalSansDashSerifBoldCapitalKappa\u{1d75f}: '𝝟'
MathematicalSansDashSerifBoldCapitalLamda\u{1d760}: '𝝠'
MathematicalSansDashSerifBoldCapitalMu\u{1d761}: '𝝡'
MathematicalSansDashSerifBoldCapitalNu\u{1d762}: '𝝢'
MathematicalSansDashSerifBoldCapitalXi\u{1d763}: '𝝣'
MathematicalSansDashSerifBoldCapitalOmicron\u{1d764}: '𝝤'
MathematicalSansDashSerifBoldCapitalPi\u{1d765}: '𝝥'
MathematicalSansDashSerifBoldCapitalRho\u{1d766}: '𝝦'
MathematicalSansDashSerifBoldCapitalThetaSymbol\u{1d767}: '𝝧'
MathematicalSansDashSerifBoldCapitalSigma\u{1d768}: '𝝨'
MathematicalSansDashSerifBoldCapitalTau\u{1d769}: '𝝩'
MathematicalSansDashSerifBoldCapitalUpsilon\u{1d76a}: '𝝪'
MathematicalSansDashSerifBoldCapitalPhi\u{1d76b}: '𝝫'
MathematicalSansDashSerifBoldCapitalChi\u{1d76c}: '𝝬'
MathematicalSansDashSerifBoldCapitalPsi\u{1d76d}: '𝝭'
MathematicalSansDashSerifBoldCapitalOmega\u{1d76e}: '𝝮'
MathematicalSansDashSerifBoldNabla\u{1d76f}: '𝝯'
MathematicalSansDashSerifBoldSmallAlpha\u{1d770}: '𝝰'
MathematicalSansDashSerifBoldSmallBeta\u{1d771}: '𝝱'
MathematicalSansDashSerifBoldSmallGamma\u{1d772}: '𝝲'
MathematicalSansDashSerifBoldSmallDelta\u{1d773}: '𝝳'
MathematicalSansDashSerifBoldSmallEpsilon\u{1d774}: '𝝴'
MathematicalSansDashSerifBoldSmallZeta\u{1d775}: '𝝵'
MathematicalSansDashSerifBoldSmallEta\u{1d776}: '𝝶'
MathematicalSansDashSerifBoldSmallTheta\u{1d777}: '𝝷'
MathematicalSansDashSerifBoldSmallIota\u{1d778}: '𝝸'
MathematicalSansDashSerifBoldSmallKappa\u{1d779}: '𝝹'
MathematicalSansDashSerifBoldSmallLamda\u{1d77a}: '𝝺'
MathematicalSansDashSerifBoldSmallMu\u{1d77b}: '𝝻'
MathematicalSansDashSerifBoldSmallNu\u{1d77c}: '𝝼'
MathematicalSansDashSerifBoldSmallXi\u{1d77d}: '𝝽'
MathematicalSansDashSerifBoldSmallOmicron\u{1d77e}: '𝝾'
MathematicalSansDashSerifBoldSmallPi\u{1d77f}: '𝝿'
MathematicalSansDashSerifBoldSmallRho\u{1d780}: '𝞀'
MathematicalSansDashSerifBoldSmallFinalSigma\u{1d781}: '𝞁'
MathematicalSansDashSerifBoldSmallSigma\u{1d782}: '𝞂'
MathematicalSansDashSerifBoldSmallTau\u{1d783}: '𝞃'
MathematicalSansDashSerifBoldSmallUpsilon\u{1d784}: '𝞄'
MathematicalSansDashSerifBoldSmallPhi\u{1d785}: '𝞅'
MathematicalSansDashSerifBoldSmallChi\u{1d786}: '𝞆'
MathematicalSansDashSerifBoldSmallPsi\u{1d787}: '𝞇'
MathematicalSansDashSerifBoldSmallOmega\u{1d788}: '𝞈'
MathematicalSansDashSerifBoldPartialDifferential\u{1d789}: '𝞉'
MathematicalSansDashSerifBoldEpsilonSymbol\u{1d78a}: '𝞊'
MathematicalSansDashSerifBoldThetaSymbol\u{1d78b}: '𝞋'
MathematicalSansDashSerifBoldKappaSymbol\u{1d78c}: '𝞌'
MathematicalSansDashSerifBoldPhiSymbol\u{1d78d}: '𝞍'
MathematicalSansDashSerifBoldRhoSymbol\u{1d78e}: '𝞎'
MathematicalSansDashSerifBoldPiSymbol\u{1d78f}: '𝞏'
MathematicalSansDashSerifBoldItalicCapitalAlpha\u{1d790}: '𝞐'
MathematicalSansDashSerifBoldItalicCapitalBeta\u{1d791}: '𝞑'
MathematicalSansDashSerifBoldItalicCapitalGamma\u{1d792}: '𝞒'
MathematicalSansDashSerifBoldItalicCapitalDelta\u{1d793}: '𝞓'
MathematicalSansDashSerifBoldItalicCapitalEpsilon\u{1d794}: '𝞔'
MathematicalSansDashSerifBoldItalicCapitalZeta\u{1d795}: '𝞕'
MathematicalSansDashSerifBoldItalicCapitalEta\u{1d796}: '𝞖'
MathematicalSansDashSerifBoldItalicCapitalTheta\u{1d797}: '𝞗'
MathematicalSansDashSerifBoldItalicCapitalIota\u{1d798}: '𝞘'
MathematicalSansDashSerifBoldItalicCapitalKappa\u{1d799}: '𝞙'
MathematicalSansDashSerifBoldItalicCapitalLamda\u{1d79a}: '𝞚'
MathematicalSansDashSerifBoldItalicCapitalMu\u{1d79b}: '𝞛'
MathematicalSansDashSerifBoldItalicCapitalNu\u{1d79c}: '𝞜'
MathematicalSansDashSerifBoldItalicCapitalXi\u{1d79d}: '𝞝'
MathematicalSansDashSerifBoldItalicCapitalOmicron\u{1d79e}: '𝞞'
MathematicalSansDashSerifBoldItalicCapitalPi\u{1d79f}: '𝞟'
MathematicalSansDashSerifBoldItalicCapitalRho\u{1d7a0}: '𝞠'
MathematicalSansDashSerifBoldItalicCapitalThetaSymbol\u{1d7a1}: '𝞡'
MathematicalSansDashSerifBoldItalicCapitalSigma\u{1d7a2}: '𝞢'
MathematicalSansDashSerifBoldItalicCapitalTau\u{1d7a3}: '𝞣'
MathematicalSansDashSerifBoldItalicCapitalUpsilon\u{1d7a4}: '𝞤'
MathematicalSansDashSerifBoldItalicCapitalPhi\u{1d7a5}: '𝞥'
MathematicalSansDashSerifBoldItalicCapitalChi\u{1d7a6}: '𝞦'
MathematicalSansDashSerifBoldItalicCapitalPsi\u{1d7a7}: '𝞧'
MathematicalSansDashSerifBoldItalicCapitalOmega\u{1d7a8}: '𝞨'
MathematicalSansDashSerifBoldItalicNabla\u{1d7a9}: '𝞩'
MathematicalSansDashSerifBoldItalicSmallAlpha\u{1d7aa}: '𝞪'
MathematicalSansDashSerifBoldItalicSmallBeta\u{1d7ab}: '𝞫'
MathematicalSansDashSerifBoldItalicSmallGamma\u{1d7ac}: '𝞬'
MathematicalSansDashSerifBoldItalicSmallDelta\u{1d7ad}: '𝞭'
MathematicalSansDashSerifBoldItalicSmallEpsilon\u{1d7ae}: '𝞮'
MathematicalSansDashSerifBoldItalicSmallZeta\u{1d7af}: '𝞯'
MathematicalSansDashSerifBoldItalicSmallEta\u{1d7b0}: '𝞰'
MathematicalSansDashSerifBoldItalicSmallTheta\u{1d7b1}: '𝞱'
MathematicalSansDashSerifBoldItalicSmallIota\u{1d7b2}: '𝞲'
MathematicalSansDashSerifBoldItalicSmallKappa\u{1d7b3}: '𝞳'
MathematicalSansDashSerifBoldItalicSmallLamda\u{1d7b4}: '𝞴'
MathematicalSansDashSerifBoldItalicSmallMu\u{1d7b5}: '𝞵'
MathematicalSansDashSerifBoldItalicSmallNu\u{1d7b6}: '𝞶'
MathematicalSansDashSerifBoldItalicSmallXi\u{1d7b7}: '𝞷'
MathematicalSansDashSerifBoldItalicSmallOmicron\u{1d7b8}: '𝞸'
MathematicalSansDashSerifBoldItalicSmallPi\u{1d7b9}: '𝞹'
MathematicalSansDashSerifBoldItalicSmallRho\u{1d7ba}: '𝞺'
MathematicalSansDashSerifBoldItalicSmallFinalSigma\u{1d7bb}: '𝞻'
MathematicalSansDashSerifBoldItalicSmallSigma\u{1d7bc}: '𝞼'
MathematicalSansDashSerifBoldItalicSmallTau\u{1d7bd}: '𝞽'
MathematicalSansDashSerifBoldItalicSmallUpsilon\u{1d7be}: '𝞾'
MathematicalSansDashSerifBoldItalicSmallPhi\u{1d7bf}: '𝞿'
MathematicalSansDashSerifBoldItalicSmallChi\u{1d7c0}: '𝟀'
MathematicalSansDashSerifBoldItalicSmallPsi\u{1d7c1}: '𝟁'
MathematicalSansDashSerifBoldItalicSmallOmega\u{1d7c2}: '𝟂'
MathematicalSansDashSerifBoldItalicPartialDifferential\u{1d7c3}: '𝟃'
MathematicalSansDashSerifBoldItalicEpsilonSymbol\u{1d7c4}: '𝟄'
MathematicalSansDashSerifBoldItalicThetaSymbol\u{1d7c5}: '𝟅'
MathematicalSansDashSerifBoldItalicKappaSymbol\u{1d7c6}: '𝟆'
MathematicalSansDashSerifBoldItalicPhiSymbol\u{1d7c7}: '𝟇'
MathematicalSansDashSerifBoldItalicRhoSymbol\u{1d7c8}: '𝟈'
MathematicalSansDashSerifBoldItalicPiSymbol\u{1d7c9}: '𝟉'
MathematicalBoldCapitalDigamma\u{1d7ca}: '𝟊'
MathematicalBoldSmallDigamma\u{1d7cb}: '𝟋'
MathematicalBoldDigitZero\u{1d7ce}: '𝟎'
MathematicalBoldDigitOne\u{1d7cf}: '𝟏'
MathematicalBoldDigitTwo\u{1d7d0}: '𝟐'
MathematicalBoldDigitThree\u{1d7d1}: '𝟑'
MathematicalBoldDigitFour\u{1d7d2}: '𝟒'
MathematicalBoldDigitFive\u{1d7d3}: '𝟓'
MathematicalBoldDigitSix\u{1d7d4}: '𝟔'
MathematicalBoldDigitSeven\u{1d7d5}: '𝟕'
MathematicalBoldDigitEight\u{1d7d6}: '𝟖'
MathematicalBoldDigitNine\u{1d7d7}: '𝟗'
MathematicalDoubleDashStruckDigitZero\u{1d7d8}: '𝟘'
MathematicalDoubleDashStruckDigitOne\u{1d7d9}: '𝟙'
MathematicalDoubleDashStruckDigitTwo\u{1d7da}: '𝟚'
MathematicalDoubleDashStruckDigitThree\u{1d7db}: '𝟛'
MathematicalDoubleDashStruckDigitFour\u{1d7dc}: '𝟜'
MathematicalDoubleDashStruckDigitFive\u{1d7dd}: '𝟝'
MathematicalDoubleDashStruckDigitSix\u{1d7de}: '𝟞'
MathematicalDoubleDashStruckDigitSeven\u{1d7df}: '𝟟'
MathematicalDoubleDashStruckDigitEight\u{1d7e0}: '𝟠'
MathematicalDoubleDashStruckDigitNine\u{1d7e1}: '𝟡'
MathematicalSansDashSerifDigitZero\u{1d7e2}: '𝟢'
MathematicalSansDashSerifDigitOne\u{1d7e3}: '𝟣'
MathematicalSansDashSerifDigitTwo\u{1d7e4}: '𝟤'
MathematicalSansDashSerifDigitThree\u{1d7e5}: '𝟥'
MathematicalSansDashSerifDigitFour\u{1d7e6}: '𝟦'
MathematicalSansDashSerifDigitFive\u{1d7e7}: '𝟧'
MathematicalSansDashSerifDigitSix\u{1d7e8}: '𝟨'
MathematicalSansDashSerifDigitSeven\u{1d7e9}: '𝟩'
MathematicalSansDashSerifDigitEight\u{1d7ea}: '𝟪'
MathematicalSansDashSerifDigitNine\u{1d7eb}: '𝟫'
MathematicalSansDashSerifBoldDigitZero\u{1d7ec}: '𝟬'
MathematicalSansDashSerifBoldDigitOne\u{1d7ed}: '𝟭'
MathematicalSansDashSerifBoldDigitTwo\u{1d7ee}: '𝟮'
MathematicalSansDashSerifBoldDigitThree\u{1d7ef}: '𝟯'
MathematicalSansDashSerifBoldDigitFour\u{1d7f0}: '𝟰'
MathematicalSansDashSerifBoldDigitFive\u{1d7f1}: '𝟱'
MathematicalSansDashSerifBoldDigitSix\u{1d7f2}: '𝟲'
MathematicalSansDashSerifBoldDigitSeven\u{1d7f3}: '𝟳'
MathematicalSansDashSerifBoldDigitEight\u{1d7f4}: '𝟴'
MathematicalSansDashSerifBoldDigitNine\u{1d7f5}: '𝟵'
MathematicalMonospaceDigitZero\u{1d7f6}: '𝟶'
MathematicalMonospaceDigitOne\u{1d7f7}: '𝟷'
MathematicalMonospaceDigitTwo\u{1d7f8}: '𝟸'
MathematicalMonospaceDigitThree\u{1d7f9}: '𝟹'
MathematicalMonospaceDigitFour\u{1d7fa}: '𝟺'
MathematicalMonospaceDigitFive\u{1d7fb}: '𝟻'
MathematicalMonospaceDigitSix\u{1d7fc}: '𝟼'
MathematicalMonospaceDigitSeven\u{1d7fd}: '𝟽'
MathematicalMonospaceDigitEight\u{1d7fe}: '𝟾'
Methods
impl MathematicalAlphanumericSymbols[src]
pub fn new() -> Self[src]
The character with the lowest index in this unicode block
pub fn name(&self) -> String[src]
The character's name, in sentence case
Trait Implementations
impl Iterator for MathematicalAlphanumericSymbols[src]
type Item = Self
The type of the elements being iterated over.
fn next(&mut self) -> Option<Self>[src]
fn size_hint(&self) -> (usize, Option<usize>)1.0.0[src]
Returns the bounds on the remaining length of the iterator. Read more
fn count(self) -> usize1.0.0[src]
Consumes the iterator, counting the number of iterations and returning it. Read more
fn last(self) -> Option<Self::Item>1.0.0[src]
Consumes the iterator, returning the last element. Read more
fn nth(&mut self, n: usize) -> Option<Self::Item>1.0.0[src]
Returns the nth element of the iterator. Read more
fn step_by(self, step: usize) -> StepBy<Self>1.28.0[src]
Creates an iterator starting at the same point, but stepping by the given amount at each iteration. Read more
fn chain<U>(self, other: U) -> Chain<Self, <U as IntoIterator>::IntoIter> where
U: IntoIterator<Item = Self::Item>, 1.0.0[src]
U: IntoIterator<Item = Self::Item>,
Takes two iterators and creates a new iterator over both in sequence. Read more
fn zip<U>(self, other: U) -> Zip<Self, <U as IntoIterator>::IntoIter> where
U: IntoIterator, 1.0.0[src]
U: IntoIterator,
'Zips up' two iterators into a single iterator of pairs. Read more
fn map<B, F>(self, f: F) -> Map<Self, F> where
F: FnMut(Self::Item) -> B, 1.0.0[src]
F: FnMut(Self::Item) -> B,
Takes a closure and creates an iterator which calls that closure on each element. Read more
fn for_each<F>(self, f: F) where
F: FnMut(Self::Item), 1.21.0[src]
F: FnMut(Self::Item),
Calls a closure on each element of an iterator. Read more
fn filter<P>(self, predicate: P) -> Filter<Self, P> where
P: FnMut(&Self::Item) -> bool, 1.0.0[src]
P: FnMut(&Self::Item) -> bool,
Creates an iterator which uses a closure to determine if an element should be yielded. Read more
fn filter_map<B, F>(self, f: F) -> FilterMap<Self, F> where
F: FnMut(Self::Item) -> Option<B>, 1.0.0[src]
F: FnMut(Self::Item) -> Option<B>,
Creates an iterator that both filters and maps. Read more
fn enumerate(self) -> Enumerate<Self>1.0.0[src]
Creates an iterator which gives the current iteration count as well as the next value. Read more
fn peekable(self) -> Peekable<Self>1.0.0[src]
Creates an iterator which can use peek to look at the next element of the iterator without consuming it. Read more
fn skip_while<P>(self, predicate: P) -> SkipWhile<Self, P> where
P: FnMut(&Self::Item) -> bool, 1.0.0[src]
P: FnMut(&Self::Item) -> bool,
Creates an iterator that [skip]s elements based on a predicate. Read more
fn take_while<P>(self, predicate: P) -> TakeWhile<Self, P> where
P: FnMut(&Self::Item) -> bool, 1.0.0[src]
P: FnMut(&Self::Item) -> bool,
Creates an iterator that yields elements based on a predicate. Read more
fn skip(self, n: usize) -> Skip<Self>1.0.0[src]
Creates an iterator that skips the first n elements. Read more
fn take(self, n: usize) -> Take<Self>1.0.0[src]
Creates an iterator that yields its first n elements. Read more
fn scan<St, B, F>(self, initial_state: St, f: F) -> Scan<Self, St, F> where
F: FnMut(&mut St, Self::Item) -> Option<B>, 1.0.0[src]
F: FnMut(&mut St, Self::Item) -> Option<B>,
An iterator adaptor similar to [fold] that holds internal state and produces a new iterator. Read more
fn flat_map<U, F>(self, f: F) -> FlatMap<Self, U, F> where
F: FnMut(Self::Item) -> U,
U: IntoIterator, 1.0.0[src]
F: FnMut(Self::Item) -> U,
U: IntoIterator,
Creates an iterator that works like map, but flattens nested structure. Read more
fn flatten(self) -> Flatten<Self> where
Self::Item: IntoIterator, 1.29.0[src]
Self::Item: IntoIterator,
Creates an iterator that flattens nested structure. Read more
fn fuse(self) -> Fuse<Self>1.0.0[src]
Creates an iterator which ends after the first [None]. Read more
fn inspect<F>(self, f: F) -> Inspect<Self, F> where
F: FnMut(&Self::Item), 1.0.0[src]
F: FnMut(&Self::Item),
Do something with each element of an iterator, passing the value on. Read more
fn by_ref(&mut self) -> &mut Self1.0.0[src]
Borrows an iterator, rather than consuming it. Read more
#[must_use = "if you really need to exhaust the iterator, consider `.for_each(drop)` instead"]
fn collect<B>(self) -> B where
B: FromIterator<Self::Item>, 1.0.0[src]
B: FromIterator<Self::Item>,
Transforms an iterator into a collection. Read more
fn partition<B, F>(self, f: F) -> (B, B) where
B: Default + Extend<Self::Item>,
F: FnMut(&Self::Item) -> bool, 1.0.0[src]
B: Default + Extend<Self::Item>,
F: FnMut(&Self::Item) -> bool,
Consumes an iterator, creating two collections from it. Read more
fn try_fold<B, F, R>(&mut self, init: B, f: F) -> R where
F: FnMut(B, Self::Item) -> R,
R: Try<Ok = B>, 1.27.0[src]
F: FnMut(B, Self::Item) -> R,
R: Try<Ok = B>,
An iterator method that applies a function as long as it returns successfully, producing a single, final value. Read more
fn try_for_each<F, R>(&mut self, f: F) -> R where
F: FnMut(Self::Item) -> R,
R: Try<Ok = ()>, 1.27.0[src]
F: FnMut(Self::Item) -> R,
R: Try<Ok = ()>,
An iterator method that applies a fallible function to each item in the iterator, stopping at the first error and returning that error. Read more
fn fold<B, F>(self, init: B, f: F) -> B where
F: FnMut(B, Self::Item) -> B, 1.0.0[src]
F: FnMut(B, Self::Item) -> B,
An iterator method that applies a function, producing a single, final value. Read more
fn all<F>(&mut self, f: F) -> bool where
F: FnMut(Self::Item) -> bool, 1.0.0[src]
F: FnMut(Self::Item) -> bool,
Tests if every element of the iterator matches a predicate. Read more
fn any<F>(&mut self, f: F) -> bool where
F: FnMut(Self::Item) -> bool, 1.0.0[src]
F: FnMut(Self::Item) -> bool,
Tests if any element of the iterator matches a predicate. Read more
fn find<P>(&mut self, predicate: P) -> Option<Self::Item> where
P: FnMut(&Self::Item) -> bool, 1.0.0[src]
P: FnMut(&Self::Item) -> bool,
Searches for an element of an iterator that satisfies a predicate. Read more
fn find_map<B, F>(&mut self, f: F) -> Option<B> where
F: FnMut(Self::Item) -> Option<B>, 1.30.0[src]
F: FnMut(Self::Item) -> Option<B>,
Applies function to the elements of iterator and returns the first non-none result. Read more
fn position<P>(&mut self, predicate: P) -> Option<usize> where
P: FnMut(Self::Item) -> bool, 1.0.0[src]
P: FnMut(Self::Item) -> bool,
Searches for an element in an iterator, returning its index. Read more
fn rposition<P>(&mut self, predicate: P) -> Option<usize> where
P: FnMut(Self::Item) -> bool,
Self: ExactSizeIterator + DoubleEndedIterator, 1.0.0[src]
P: FnMut(Self::Item) -> bool,
Self: ExactSizeIterator + DoubleEndedIterator,
Searches for an element in an iterator from the right, returning its index. Read more
fn max(self) -> Option<Self::Item> where
Self::Item: Ord, 1.0.0[src]
Self::Item: Ord,
Returns the maximum element of an iterator. Read more
fn min(self) -> Option<Self::Item> where
Self::Item: Ord, 1.0.0[src]
Self::Item: Ord,
Returns the minimum element of an iterator. Read more
fn max_by_key<B, F>(self, f: F) -> Option<Self::Item> where
B: Ord,
F: FnMut(&Self::Item) -> B, 1.6.0[src]
B: Ord,
F: FnMut(&Self::Item) -> B,
Returns the element that gives the maximum value from the specified function. Read more
fn max_by<F>(self, compare: F) -> Option<Self::Item> where
F: FnMut(&Self::Item, &Self::Item) -> Ordering, 1.15.0[src]
F: FnMut(&Self::Item, &Self::Item) -> Ordering,
Returns the element that gives the maximum value with respect to the specified comparison function. Read more
fn min_by_key<B, F>(self, f: F) -> Option<Self::Item> where
B: Ord,
F: FnMut(&Self::Item) -> B, 1.6.0[src]
B: Ord,
F: FnMut(&Self::Item) -> B,
Returns the element that gives the minimum value from the specified function. Read more
fn min_by<F>(self, compare: F) -> Option<Self::Item> where
F: FnMut(&Self::Item, &Self::Item) -> Ordering, 1.15.0[src]
F: FnMut(&Self::Item, &Self::Item) -> Ordering,
Returns the element that gives the minimum value with respect to the specified comparison function. Read more
fn rev(self) -> Rev<Self> where
Self: DoubleEndedIterator, 1.0.0[src]
Self: DoubleEndedIterator,
Reverses an iterator's direction. Read more
fn unzip<A, B, FromA, FromB>(self) -> (FromA, FromB) where
FromA: Default + Extend<A>,
FromB: Default + Extend<B>,
Self: Iterator<Item = (A, B)>, 1.0.0[src]
FromA: Default + Extend<A>,
FromB: Default + Extend<B>,
Self: Iterator<Item = (A, B)>,
Converts an iterator of pairs into a pair of containers. Read more
fn copied<'a, T>(self) -> Copied<Self> where
Self: Iterator<Item = &'a T>,
T: 'a + Copy, [src]
Self: Iterator<Item = &'a T>,
T: 'a + Copy,
iter_copied)Creates an iterator which copies all of its elements. Read more
fn cloned<'a, T>(self) -> Cloned<Self> where
Self: Iterator<Item = &'a T>,
T: 'a + Clone, 1.0.0[src]
Self: Iterator<Item = &'a T>,
T: 'a + Clone,
Creates an iterator which [clone]s all of its elements. Read more
fn cycle(self) -> Cycle<Self> where
Self: Clone, 1.0.0[src]
Self: Clone,
Repeats an iterator endlessly. Read more
fn sum<S>(self) -> S where
S: Sum<Self::Item>, 1.11.0[src]
S: Sum<Self::Item>,
Sums the elements of an iterator. Read more
fn product<P>(self) -> P where
P: Product<Self::Item>, 1.11.0[src]
P: Product<Self::Item>,
Iterates over the entire iterator, multiplying all the elements Read more
fn cmp<I>(self, other: I) -> Ordering where
I: IntoIterator<Item = Self::Item>,
Self::Item: Ord, 1.5.0[src]
I: IntoIterator<Item = Self::Item>,
Self::Item: Ord,
Lexicographically compares the elements of this Iterator with those of another. Read more
fn partial_cmp<I>(self, other: I) -> Option<Ordering> where
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>, 1.5.0[src]
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>,
Lexicographically compares the elements of this Iterator with those of another. Read more
fn eq<I>(self, other: I) -> bool where
I: IntoIterator,
Self::Item: PartialEq<<I as IntoIterator>::Item>, 1.5.0[src]
I: IntoIterator,
Self::Item: PartialEq<<I as IntoIterator>::Item>,
Determines if the elements of this Iterator are equal to those of another. Read more
fn ne<I>(self, other: I) -> bool where
I: IntoIterator,
Self::Item: PartialEq<<I as IntoIterator>::Item>, 1.5.0[src]
I: IntoIterator,
Self::Item: PartialEq<<I as IntoIterator>::Item>,
Determines if the elements of this Iterator are unequal to those of another. Read more
fn lt<I>(self, other: I) -> bool where
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>, 1.5.0[src]
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>,
Determines if the elements of this Iterator are lexicographically less than those of another. Read more
fn le<I>(self, other: I) -> bool where
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>, 1.5.0[src]
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>,
Determines if the elements of this Iterator are lexicographically less or equal to those of another. Read more
fn gt<I>(self, other: I) -> bool where
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>, 1.5.0[src]
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>,
Determines if the elements of this Iterator are lexicographically greater than those of another. Read more
fn ge<I>(self, other: I) -> bool where
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>, 1.5.0[src]
I: IntoIterator,
Self::Item: PartialOrd<<I as IntoIterator>::Item>,
Determines if the elements of this Iterator are lexicographically greater than or equal to those of another. Read more
fn is_sorted(self) -> bool where
Self::Item: PartialOrd<Self::Item>, [src]
Self::Item: PartialOrd<Self::Item>,
🔬 This is a nightly-only experimental API. (is_sorted)
new API
Checks if the elements of this iterator are sorted. Read more
fn is_sorted_by<F>(self, compare: F) -> bool where
F: FnMut(&Self::Item, &Self::Item) -> Option<Ordering>, [src]
F: FnMut(&Self::Item, &Self::Item) -> Option<Ordering>,
🔬 This is a nightly-only experimental API. (is_sorted)
new API
Checks if the elements of this iterator are sorted using the given comparator function. Read more
fn is_sorted_by_key<F, K>(self, f: F) -> bool where
F: FnMut(&Self::Item) -> K,
K: PartialOrd<K>, [src]
F: FnMut(&Self::Item) -> K,
K: PartialOrd<K>,
🔬 This is a nightly-only experimental API. (is_sorted)
new API
Checks if the elements of this iterator are sorted using the given key extraction function. Read more
impl PartialEq<MathematicalAlphanumericSymbols> for MathematicalAlphanumericSymbols[src]
fn eq(&self, other: &MathematicalAlphanumericSymbols) -> bool[src]
#[must_use]
fn ne(&self, other: &Rhs) -> bool1.0.0[src]
This method tests for !=.
impl Clone for MathematicalAlphanumericSymbols[src]
ⓘImportant traits for MathematicalAlphanumericSymbolsfn clone(&self) -> MathematicalAlphanumericSymbols[src]
fn clone_from(&mut self, source: &Self)1.0.0[src]
Performs copy-assignment from source. Read more
impl Into<char> for MathematicalAlphanumericSymbols[src]
impl Into<u32> for MathematicalAlphanumericSymbols[src]
impl Eq for MathematicalAlphanumericSymbols[src]
impl Copy for MathematicalAlphanumericSymbols[src]
impl Hash for MathematicalAlphanumericSymbols[src]
fn hash<__H: Hasher>(&self, state: &mut __H)[src]
fn hash_slice<H>(data: &[Self], state: &mut H) where
H: Hasher, 1.3.0[src]
H: Hasher,
Feeds a slice of this type into the given [Hasher]. Read more
impl Debug for MathematicalAlphanumericSymbols[src]
impl TryFrom<char> for MathematicalAlphanumericSymbols[src]
type Error = ()
The type returned in the event of a conversion error.
fn try_from(c: char) -> Result<Self, Self::Error>[src]
impl TryFrom<u32> for MathematicalAlphanumericSymbols[src]
Auto Trait Implementations
impl Send for MathematicalAlphanumericSymbols
impl Sync for MathematicalAlphanumericSymbols
Blanket Implementations
impl<I> IntoIterator for I where
I: Iterator, [src]
I: Iterator,
type Item = <I as Iterator>::Item
The type of the elements being iterated over.
type IntoIter = I
Which kind of iterator are we turning this into?
fn into_iter(self) -> I[src]
impl<T> From for T[src]
impl<T, U> Into for T where
U: From<T>, [src]
U: From<T>,
impl<T> ToOwned for T where
T: Clone, [src]
T: Clone,
impl<T, U> TryFrom for T where
U: Into<T>, [src]
U: Into<T>,
type Error = Infallible
The type returned in the event of a conversion error.
fn try_from(value: U) -> Result<T, <T as TryFrom<U>>::Error>[src]
impl<T> Borrow for T where
T: ?Sized, [src]
T: ?Sized,
impl<T> Any for T where
T: 'static + ?Sized, [src]
T: 'static + ?Sized,
impl<T> BorrowMut for T where
T: ?Sized, [src]
T: ?Sized,
fn borrow_mut(&mut self) -> &mut T[src]
impl<T, U> TryInto for T where
U: TryFrom<T>, [src]
U: TryFrom<T>,