# ***** BEGIN LICENSE BLOCK ***** # Version: MPL 1.1/GPL 2.0/LGPL 2.1 # # The contents of this file are subject to the Mozilla Public License Version # 1.1 (the "License"); you may not use this file except in compliance with # the License. You may obtain a copy of the License at # http://www.mozilla.org/MPL/ # # Software distributed under the License is distributed on an "AS IS" basis, # WITHOUT WARRANTY OF ANY KIND, either express or implied. See the License # for the specific language governing rights and limitations under the # License. # # The Original Code is Mozilla MathML Project. # # The Initial Developer of the Original Code is # The University of Queensland. # Portions created by the Initial Developer are Copyright (C) 2001 # the Initial Developer. All Rights Reserved. # # Contributor(s): # Roger B. Sidje # Karl Tomlinson , Mozilla Corporation # Frederic Wang # # Alternatively, the contents of this file may be used under the terms of # either the GNU General Public License Version 2 or later (the "GPL"), or # the GNU Lesser General Public License Version 2.1 or later (the "LGPL"), # in which case the provisions of the GPL or the LGPL are applicable instead # of those above. If you wish to allow use of your version of this file only # under the terms of either the GPL or the LGPL, and not to allow others to # use your version of this file under the terms of the MPL, indicate your # decision by deleting the provisions above and replace them with the notice # and other provisions required by the GPL or the LGPL. If you do not delete # the provisions above, a recipient may use your version of this file under # the terms of any one of the MPL, the GPL or the LGPL. # # ***** END LICENSE BLOCK ***** # LOCALIZATION NOTE: FILE # Do not translate anything in this file # This file contains the list of some stretchy MathML chars that # can be rendered with STIXSize* set of fonts, # with some help from STIXNonUnicode, STIXGeneral and STIXIntegralsD. external.1 = STIXNonUnicode external.2 = STIXSizeTwoSym external.3 = STIXSizeThreeSym external.4 = STIXSizeFourSym external.5 = STIXSizeFiveSym external.6 = STIXIntegralsD # [ T/L | M | B/R | G | size0 ... size{N-1} ] \u0028 = \u239B\uFFFD\u239D\u239C\uFFFD((@2(@3(@4 # ( \u0029 = \u239E\uFFFD\u23A0\u239F\uFFFD))@2)@3)@4 # ) \u005B = \u23A1\uFFFD\u23A3\u23A2\u005B[[@2[@3[@4 # [ \u005D = \u23A4\uFFFD\u23A6\u23A5\u005D]]@2]@3]@4 # ] \u007B = \u23A7\u23A8\u23A9\u23AA\u007B{{@2{@3{@4 # { \u007D = \u23AB\u23AC\u23AD\u23AA\u007D}}@2}@3}@4 # } # N-ARY operators \u2140 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2140 # DOUBLE-STRUCK N-ARY SUMMATION \u220F = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u220F # N-ARY PRODUCT \u2210 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2210 # N-ARY COPRODUCT \u2211 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2211 # N-ARY SUMMATION \u22C0 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u22C0 # N-ARY LOGICAL AND \u22C1 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u22C1 # N-ARY LOGICAL OR \u22C2 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u22C2 # N-ARY INTERSECTION \u22C3 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u22C3 # N-ARY UNION \u2A00 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A00 # N-ARY CIRCLED DOT OPERATOR \u2A01 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A01 # N-ARY CIRCLED PLUS OPERATOR \u2A02 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A02 # N-ARY CIRCLED TIMES OPERATOR \u2A03 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A03 # N-ARY UNION OPERATOR WITH DOT \u2A04 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A04 # N-ARY UNION OPERATOR WITH PLUS \u2A05 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A05 # N-ARY SQUARE INTERSECTION OPERATOR \u2A06 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A06 # N-ARY SQUARE UNION OPERATOR \u2A09 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A09 # N-ARY TIMES OPERATOR \u2AFF = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2AFF # N-ARY WHITE VERTICAL BAR # E000 stix-radical symbol vertical extender # E001 stix-radical symbol top corner \u221A = \uE001@1\uFFFD\u221A@4\uE000@1\uFFFD\u221A\u221A@2\u221A@3 # Sqrt, radic # Integrals \u222B = \u2320\uFFFD\u2321\u23AE\uFFFD\u222B@6 \u222C = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u222C@6 \u222D = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u222D@6 \u222E = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u222E@6 \u222F = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u222F@6 \u2230 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2230@6 \u2231 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2231@6 \u2232 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2232@6 \u2233 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2233@6 \u2A0B = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A0B@6 \u2A0C = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A0C@6 \u2A0D = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A0D@6 \u2A0E = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A0E@6 \u2A0F = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A0F@6 \u2A10 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A10@6 \u2A11 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A11@6 \u2A12 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A12@6 \u2A13 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A13@6 \u2A14 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A14@6 \u2A15 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A15@6 \u2A16 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A16@6 \u2A17 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A17@6 \u2A18 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A18@6 \u2A19 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A19@6 \u2A1A = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A1A@6 \u2A1B = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A1B@6 \u2A1C = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u2A1C@6 \u27E8 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u27E8\u27E8@2\u27E8@3\u27E8@4 # LeftAngleBracket \u27E9 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u27E9\u27E9@2\u27E9@3\u27E9@4 # RightAngleBracket \u23DE = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23DE\u23DE@2\u23DE@3\u23DE@4\u23DE@5 # ⏞ (Unicode) \uFE37 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23DE\u23DE@2\u23DE@3\u23DE@4\u23DE@5 # ⏞ (MathML 2.0) \u23B4 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23B4\u23B4@2\u23B4@3\u23B4@4\u23B4@5 # ⎴ \u23DC = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23DC\u23DC@2\u23DC@3\u23DC@4\u23DC@5 # ⏜ (Unicode) \uFE35 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23DC\u23DC@2\u23DC@3\u23DC@4\u23DC@5 # ⏜ (MathML 2.0) \u23DF = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23DF\u23DF@2\u23DF@3\u23DF@4\u23DF@5 # ⏟ (Unicode) \uFE38 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23DF\u23DF@2\u23DF@3\u23DF@4\u23DF@5 # ⏟ (MathML 2.0) \u23B5 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23B5\u23B5@2\u23B5@3\u23B5@4\u23B5@5 # ⎵ \u23DD = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23DD\u23DD@2\u23DD@3\u23DD@4\u23DD@5 # ⏝ (Unicode) \uFE36 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u23DD\u23DD@2\u23DD@3\u23DD@4\u23DD@5 # ⏝ (MathML 2.0) \u005E = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u0302\u0302@2\u0302@3\u0302@4\u0302@5 # circumflex accent, COMBINING CIRCUMFLEX ACCENT \u02C6 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u0302\u0302@2\u0302@3\u0302@4\u0302@5 # modifier letter circumflex accent, COMBINING CIRCUMFLEX ACCENT \u007E = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u0303\u0303@2\u0303@3\u0303@4\u0303@5 # ~ tilde, COMBINING TILDE \u02DC = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u0303\u0303@2\u0303@3\u0303@4\u0303@5 # small tilde, COMBINING TILDE \u02C7 = \uFFFD\uFFFD\uFFFD\uFFFD\uFFFD\u030C\u030C@2\u030C@3\u030C@4\u030C@5 # caron, COMBINING CARON