Robust/src/Benchmarks/mlp/tagger/mlp-smaller/lucmathsym-charmap.txt

   1 # mathematical characters for Lucida New Math Symbol font\r
   2 \r
   3 <char:minus><font:LucidNewMatSymT><index:161>\r
   4 <char:periodcentered><font:LucidNewMatSymT><index:162>\r
   5 <char:multiply><font:LucidNewMatSymT><index:163>\r
   6 <char:asteriskmath><font:LucidNewMatSymT><index:164>\r
   7 <char:divide><font:LucidNewMatSymT><index:165>\r
   8 <char:diamondmath><font:LucidNewMatSymT><index:166>\r
   9 <char:plusminus><font:LucidNewMatSymT><index:167>\r
  10 <char:minusplus><font:LucidNewMatSymT><index:168>\r
  11 <char:circleplus><font:LucidNewMatSymT><index:169>\r
  12 <char:circleminus><font:LucidNewMatSymT><index:170>\r
  13 <char:circlemultiply><font:LucidNewMatSymT><index:173>\r
  14 <char:circledivide><font:LucidNewMatSymT><index:174>\r
  15 <char:circledot><font:LucidNewMatSymT><index:175>\r
  16 <char:circlecopyrt><font:LucidNewMatSymT><index:176>\r
  17 <char:openbullet><font:LucidNewMatSymT><index:177>\r
  18 <char:bullet><font:LucidNewMatSymT><index:178>\r
  19 <char:equivasymptotic><font:LucidNewMatSymT><index:179>\r
  20 <char:equivalence><font:LucidNewMatSymT><index:180>\r
  21 <char:reflexsubset><font:LucidNewMatSymT><index:181>\r
  22 <char:reflexsuperset><font:LucidNewMatSymT><index:182>\r
  23 <char:lessequal><font:LucidNewMatSymT><index:183>\r
  24 <char:greaterequal><font:LucidNewMatSymT><index:184>\r
  25 <char:precedesequal><font:LucidNewMatSymT><index:185>\r
  26 <char:followsequal><font:LucidNewMatSymT><index:186>\r
  27 <char:similar><font:LucidNewMatSymT><index:187>\r
  28 <char:approxequal><font:LucidNewMatSymT><index:188>\r
  29 <char:propersubset><font:LucidNewMatSymT><index:189>\r
  30 <char:propersuperset><font:LucidNewMatSymT><index:190>\r
  31 <char:lessmuch><font:LucidNewMatSymT><index:191>\r
  32 <char:greatermuch><font:LucidNewMatSymT><index:192>\r
  33 <char:precedes><font:LucidNewMatSymT><index:193>\r
  34 <char:follows><font:LucidNewMatSymT><index:194>\r
  35 <char:arrowleft><font:LucidNewMatSymT><index:195>\r
  36 <char:spade><font:LucidNewMatSymT><index:196>\r
  37 <char:arrowright><font:LucidNewMatSymT><index:33>\r
  38 <char:arrowup><font:LucidNewMatSymT><index:34>\r
  39 <char:arrowdown><font:LucidNewMatSymT><index:35>\r
  40 <char:arrowboth><font:LucidNewMatSymT><index:36>\r
  41 <char:arrownortheast><font:LucidNewMatSymT><index:37>\r
  42 <char:arrowsoutheast><font:LucidNewMatSymT><index:38>\r
  43 <char:similarequal><font:LucidNewMatSymT><index:39>\r
  44 <char:arrowdblleft><font:LucidNewMatSymT><index:40>\r
  45 <char:arrowdblright><font:LucidNewMatSymT><index:41>\r
  46 <char:arrowdblup><font:LucidNewMatSymT><index:42>\r
  47 <char:arrowdbldown><font:LucidNewMatSymT><index:43>\r
  48 <char:arrowdblboth><font:LucidNewMatSymT><index:44>\r
  49 <char:arrownorthwest><font:LucidNewMatSymT><index:45>\r
  50 <char:arrowsouthwest><font:LucidNewMatSymT><index:46>\r
  51 <char:proportional><font:LucidNewMatSymT><index:47>\r
  52 <char:prime><font:LucidNewMatSymT><index:48>\r
  53 <char:infinity><font:LucidNewMatSymT><index:49>\r
  54 <char:element><font:LucidNewMatSymT><index:50>\r
  55 <char:owner><font:LucidNewMatSymT><index:51>\r
  56 <char:triangle><font:LucidNewMatSymT><index:52>\r
  57 <char:triangleinv><font:LucidNewMatSymT><index:53>\r
  58 <char:negationslash><font:LucidNewMatSymT><index:54>\r
  59 <char:mapsto><font:LucidNewMatSymT><index:55>\r
  60 <char:universal><font:LucidNewMatSymT><index:56>\r
  61 <char:existential><font:LucidNewMatSymT><index:57>\r
  62 <char:logicalnot><font:LucidNewMatSymT><index:58>\r
  63 <char:emptyset><font:LucidNewMatSymT><index:59>\r
  64 <char:Rfractur><font:LucidNewMatSymT><index:60>\r
  65 <char:Ifractur><font:LucidNewMatSymT><index:61>\r
  66 <char:latticetop><font:LucidNewMatSymT><index:62>\r
  67 <char:perpendicular><font:LucidNewMatSymT><index:63>\r
  68 <char:aleph><font:LucidNewMatSymT><index:64>\r
  69 <char:scriptA><font:LucidNewMatSymT><index:65>\r
  70 <char:scriptB><font:LucidNewMatSymT><index:66>\r
  71 <char:scriptC><font:LucidNewMatSymT><index:67>\r
  72 <char:scriptD><font:LucidNewMatSymT><index:68>\r
  73 <char:scriptE><font:LucidNewMatSymT><index:69>\r
  74 <char:scriptF><font:LucidNewMatSymT><index:70>\r
  75 <char:scriptG><font:LucidNewMatSymT><index:71>\r
  76 <char:scriptH><font:LucidNewMatSymT><index:72>\r
  77 <char:scriptI><font:LucidNewMatSymT><index:73>\r
  78 <char:scriptJ><font:LucidNewMatSymT><index:74>\r
  79 <char:scriptK><font:LucidNewMatSymT><index:75>\r
  80 <char:scriptL><font:LucidNewMatSymT><index:76>\r
  81 <char:scriptM><font:LucidNewMatSymT><index:77>\r
  82 <char:scriptN><font:LucidNewMatSymT><index:78>\r
  83 <char:scriptO><font:LucidNewMatSymT><index:79>\r
  84 <char:scriptP><font:LucidNewMatSymT><index:80>\r
  85 <char:scriptQ><font:LucidNewMatSymT><index:81>\r
  86 <char:scriptR><font:LucidNewMatSymT><index:82>\r
  87 <char:scriptS><font:LucidNewMatSymT><index:83>\r
  88 <char:scriptT><font:LucidNewMatSymT><index:84>\r
  89 <char:scriptU><font:LucidNewMatSymT><index:85>\r
  90 <char:scriptV><font:LucidNewMatSymT><index:86>\r
  91 <char:scriptW><font:LucidNewMatSymT><index:87>\r
  92 <char:scriptX><font:LucidNewMatSymT><index:88>\r
  93 <char:scriptY><font:LucidNewMatSymT><index:89>\r
  94 <char:scriptZ><font:LucidNewMatSymT><index:90>\r
  95 <char:union><font:LucidNewMatSymT><index:91>\r
  96 <char:intersection><font:LucidNewMatSymT><index:92>\r
  97 <char:unionmulti><font:LucidNewMatSymT><index:93>\r
  98 <char:logicaland><font:LucidNewMatSymT><index:94>\r
  99 <char:logicalor><font:LucidNewMatSymT><index:95>\r
 100 <char:turnstileleft><font:LucidNewMatSymT><index:96>\r
 101 <char:turnstileright><font:LucidNewMatSymT><index:97>\r
 102 <char:floorleft><font:LucidNewMatSymT><index:98>\r
 103 <char:floorright><font:LucidNewMatSymT><index:99>\r
 104 <char:ceilingleft><font:LucidNewMatSymT><index:100>\r
 105 <char:ceilingright><font:LucidNewMatSymT><index:101>\r
 106 <char:braceleft><font:LucidNewMatSymT><index:102>\r
 107 <char:braceright><font:LucidNewMatSymT><index:103>\r
 108 <char:angbracketleft><font:LucidNewMatSymT><index:104>\r
 109 <char:angbracketright><font:LucidNewMatSymT><index:105>\r
 110 <char:bar><font:LucidNewMatSymT><index:106>\r
 111 <char:bardbl><font:LucidNewMatSymT><index:107>\r
 112 <char:arrowbothv><font:LucidNewMatSymT><index:108>\r
 113 <char:arrowdblbothv><font:LucidNewMatSymT><index:109>\r
 114 <char:backslash><font:LucidNewMatSymT><index:110>\r
 115 <char:wreathproduct><font:LucidNewMatSymT><index:111>\r
 116 <char:radical><font:LucidNewMatSymT><index:112>\r
 117 <char:coproduct><font:LucidNewMatSymT><index:113>\r
 118 <char:nabla><font:LucidNewMatSymT><index:114>\r
 119 <char:integral><font:LucidNewMatSymT><index:115>\r
 120 <char:unionsq><font:LucidNewMatSymT><index:116>\r
 121 <char:intersectionsq><font:LucidNewMatSymT><index:117>\r
 122 <char:subsetsqequal><font:LucidNewMatSymT><index:118>\r
 123 <char:supersetsqequal><font:LucidNewMatSymT><index:119>\r
 124 <char:section><font:LucidNewMatSymT><index:120>\r
 125 <char:dagger><font:LucidNewMatSymT><index:121>\r
 126 <char:daggerdbl><font:LucidNewMatSymT><index:122>\r
 127 <char:paragraph><font:LucidNewMatSymT><index:123>\r
 128 <char:club><font:LucidNewMatSymT><index:124>\r
 129 <char:diamond><font:LucidNewMatSymT><index:125>\r
 130 <char:heart><font:LucidNewMatSymT><index:126>\r