Mercurial > projects > ldc
view dmd/unialpha.c @ 1083:c1e9f612e2e2
Fix for dual operand form of fistp, also make reg ST(0) explicit and fix lindquists
previous code that allowed dual operand form of fstp but dissallowed the single
operand form accidently
author | Kelly Wilson <wilsonk cpsc.ucalgary.ca> |
---|---|
date | Tue, 10 Mar 2009 06:23:26 -0600 |
parents | c53b6e3fe49a |
children |
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// Copyright (c) 2003 by Digital Mars // All Rights Reserved // written by Walter Bright // http://www.digitalmars.com // License for redistribution is by either the Artistic License // in artistic.txt, or the GNU General Public License in gnu.txt. // See the included readme.txt for details. #include <assert.h> /******************************* * Return !=0 if unicode alpha. * Use table from C99 Appendix D. */ int isUniAlpha(unsigned u) { static unsigned short table[][2] = { { 0x00AA, 0x00AA }, { 0x00B5, 0x00B5 }, { 0x00B7, 0x00B7 }, { 0x00BA, 0x00BA }, { 0x00C0, 0x00D6 }, { 0x00D8, 0x00F6 }, { 0x00F8, 0x01F5 }, { 0x01FA, 0x0217 }, { 0x0250, 0x02A8 }, { 0x02B0, 0x02B8 }, { 0x02BB, 0x02BB }, { 0x02BD, 0x02C1 }, { 0x02D0, 0x02D1 }, { 0x02E0, 0x02E4 }, { 0x037A, 0x037A }, { 0x0386, 0x0386 }, { 0x0388, 0x038A }, { 0x038C, 0x038C }, { 0x038E, 0x03A1 }, { 0x03A3, 0x03CE }, { 0x03D0, 0x03D6 }, { 0x03DA, 0x03DA }, { 0x03DC, 0x03DC }, { 0x03DE, 0x03DE }, { 0x03E0, 0x03E0 }, { 0x03E2, 0x03F3 }, { 0x0401, 0x040C }, { 0x040E, 0x044F }, { 0x0451, 0x045C }, { 0x045E, 0x0481 }, { 0x0490, 0x04C4 }, { 0x04C7, 0x04C8 }, { 0x04CB, 0x04CC }, { 0x04D0, 0x04EB }, { 0x04EE, 0x04F5 }, { 0x04F8, 0x04F9 }, { 0x0531, 0x0556 }, { 0x0559, 0x0559 }, { 0x0561, 0x0587 }, { 0x05B0, 0x05B9 }, { 0x05BB, 0x05BD }, { 0x05BF, 0x05BF }, { 0x05C1, 0x05C2 }, { 0x05D0, 0x05EA }, { 0x05F0, 0x05F2 }, { 0x0621, 0x063A }, { 0x0640, 0x0652 }, { 0x0660, 0x0669 }, { 0x0670, 0x06B7 }, { 0x06BA, 0x06BE }, { 0x06C0, 0x06CE }, { 0x06D0, 0x06DC }, { 0x06E5, 0x06E8 }, { 0x06EA, 0x06ED }, { 0x06F0, 0x06F9 }, { 0x0901, 0x0903 }, { 0x0905, 0x0939 }, { 0x093D, 0x093D }, { 0x093E, 0x094D }, { 0x0950, 0x0952 }, { 0x0958, 0x0963 }, { 0x0966, 0x096F }, { 0x0981, 0x0983 }, { 0x0985, 0x098C }, { 0x098F, 0x0990 }, { 0x0993, 0x09A8 }, { 0x09AA, 0x09B0 }, { 0x09B2, 0x09B2 }, { 0x09B6, 0x09B9 }, { 0x09BE, 0x09C4 }, { 0x09C7, 0x09C8 }, { 0x09CB, 0x09CD }, { 0x09DC, 0x09DD }, { 0x09DF, 0x09E3 }, { 0x09E6, 0x09EF }, { 0x09F0, 0x09F1 }, { 0x0A02, 0x0A02 }, { 0x0A05, 0x0A0A }, { 0x0A0F, 0x0A10 }, { 0x0A13, 0x0A28 }, { 0x0A2A, 0x0A30 }, { 0x0A32, 0x0A33 }, { 0x0A35, 0x0A36 }, { 0x0A38, 0x0A39 }, { 0x0A3E, 0x0A42 }, { 0x0A47, 0x0A48 }, { 0x0A4B, 0x0A4D }, { 0x0A59, 0x0A5C }, { 0x0A5E, 0x0A5E }, { 0x0A66, 0x0A6F }, { 0x0A74, 0x0A74 }, { 0x0A81, 0x0A83 }, { 0x0A85, 0x0A8B }, { 0x0A8D, 0x0A8D }, { 0x0A8F, 0x0A91 }, { 0x0A93, 0x0AA8 }, { 0x0AAA, 0x0AB0 }, { 0x0AB2, 0x0AB3 }, { 0x0AB5, 0x0AB9 }, { 0x0ABD, 0x0AC5 }, { 0x0AC7, 0x0AC9 }, { 0x0ACB, 0x0ACD }, { 0x0AD0, 0x0AD0 }, { 0x0AE0, 0x0AE0 }, { 0x0AE6, 0x0AEF }, { 0x0B01, 0x0B03 }, { 0x0B05, 0x0B0C }, { 0x0B0F, 0x0B10 }, { 0x0B13, 0x0B28 }, { 0x0B2A, 0x0B30 }, { 0x0B32, 0x0B33 }, { 0x0B36, 0x0B39 }, { 0x0B3D, 0x0B3D }, { 0x0B3E, 0x0B43 }, { 0x0B47, 0x0B48 }, { 0x0B4B, 0x0B4D }, { 0x0B5C, 0x0B5D }, { 0x0B5F, 0x0B61 }, { 0x0B66, 0x0B6F }, { 0x0B82, 0x0B83 }, { 0x0B85, 0x0B8A }, { 0x0B8E, 0x0B90 }, { 0x0B92, 0x0B95 }, { 0x0B99, 0x0B9A }, { 0x0B9C, 0x0B9C }, { 0x0B9E, 0x0B9F }, { 0x0BA3, 0x0BA4 }, { 0x0BA8, 0x0BAA }, { 0x0BAE, 0x0BB5 }, { 0x0BB7, 0x0BB9 }, { 0x0BBE, 0x0BC2 }, { 0x0BC6, 0x0BC8 }, { 0x0BCA, 0x0BCD }, { 0x0BE7, 0x0BEF }, { 0x0C01, 0x0C03 }, { 0x0C05, 0x0C0C }, { 0x0C0E, 0x0C10 }, { 0x0C12, 0x0C28 }, { 0x0C2A, 0x0C33 }, { 0x0C35, 0x0C39 }, { 0x0C3E, 0x0C44 }, { 0x0C46, 0x0C48 }, { 0x0C4A, 0x0C4D }, { 0x0C60, 0x0C61 }, { 0x0C66, 0x0C6F }, { 0x0C82, 0x0C83 }, { 0x0C85, 0x0C8C }, { 0x0C8E, 0x0C90 }, { 0x0C92, 0x0CA8 }, { 0x0CAA, 0x0CB3 }, { 0x0CB5, 0x0CB9 }, { 0x0CBE, 0x0CC4 }, { 0x0CC6, 0x0CC8 }, { 0x0CCA, 0x0CCD }, { 0x0CDE, 0x0CDE }, { 0x0CE0, 0x0CE1 }, { 0x0CE6, 0x0CEF }, { 0x0D02, 0x0D03 }, { 0x0D05, 0x0D0C }, { 0x0D0E, 0x0D10 }, { 0x0D12, 0x0D28 }, { 0x0D2A, 0x0D39 }, { 0x0D3E, 0x0D43 }, { 0x0D46, 0x0D48 }, { 0x0D4A, 0x0D4D }, { 0x0D60, 0x0D61 }, { 0x0D66, 0x0D6F }, { 0x0E01, 0x0E3A }, { 0x0E40, 0x0E5B }, // { 0x0E50, 0x0E59 }, { 0x0E81, 0x0E82 }, { 0x0E84, 0x0E84 }, { 0x0E87, 0x0E88 }, { 0x0E8A, 0x0E8A }, { 0x0E8D, 0x0E8D }, { 0x0E94, 0x0E97 }, { 0x0E99, 0x0E9F }, { 0x0EA1, 0x0EA3 }, { 0x0EA5, 0x0EA5 }, { 0x0EA7, 0x0EA7 }, { 0x0EAA, 0x0EAB }, { 0x0EAD, 0x0EAE }, { 0x0EB0, 0x0EB9 }, { 0x0EBB, 0x0EBD }, { 0x0EC0, 0x0EC4 }, { 0x0EC6, 0x0EC6 }, { 0x0EC8, 0x0ECD }, { 0x0ED0, 0x0ED9 }, { 0x0EDC, 0x0EDD }, { 0x0F00, 0x0F00 }, { 0x0F18, 0x0F19 }, { 0x0F20, 0x0F33 }, { 0x0F35, 0x0F35 }, { 0x0F37, 0x0F37 }, { 0x0F39, 0x0F39 }, { 0x0F3E, 0x0F47 }, { 0x0F49, 0x0F69 }, { 0x0F71, 0x0F84 }, { 0x0F86, 0x0F8B }, { 0x0F90, 0x0F95 }, { 0x0F97, 0x0F97 }, { 0x0F99, 0x0FAD }, { 0x0FB1, 0x0FB7 }, { 0x0FB9, 0x0FB9 }, { 0x10A0, 0x10C5 }, { 0x10D0, 0x10F6 }, { 0x1E00, 0x1E9B }, { 0x1EA0, 0x1EF9 }, { 0x1F00, 0x1F15 }, { 0x1F18, 0x1F1D }, { 0x1F20, 0x1F45 }, { 0x1F48, 0x1F4D }, { 0x1F50, 0x1F57 }, { 0x1F59, 0x1F59 }, { 0x1F5B, 0x1F5B }, { 0x1F5D, 0x1F5D }, { 0x1F5F, 0x1F7D }, { 0x1F80, 0x1FB4 }, { 0x1FB6, 0x1FBC }, { 0x1FBE, 0x1FBE }, { 0x1FC2, 0x1FC4 }, { 0x1FC6, 0x1FCC }, { 0x1FD0, 0x1FD3 }, { 0x1FD6, 0x1FDB }, { 0x1FE0, 0x1FEC }, { 0x1FF2, 0x1FF4 }, { 0x1FF6, 0x1FFC }, { 0x203F, 0x2040 }, { 0x207F, 0x207F }, { 0x2102, 0x2102 }, { 0x2107, 0x2107 }, { 0x210A, 0x2113 }, { 0x2115, 0x2115 }, { 0x2118, 0x211D }, { 0x2124, 0x2124 }, { 0x2126, 0x2126 }, { 0x2128, 0x2128 }, { 0x212A, 0x2131 }, { 0x2133, 0x2138 }, { 0x2160, 0x2182 }, { 0x3005, 0x3007 }, { 0x3021, 0x3029 }, { 0x3041, 0x3093 }, { 0x309B, 0x309C }, { 0x30A1, 0x30F6 }, { 0x30FB, 0x30FC }, { 0x3105, 0x312C }, { 0x4E00, 0x9FA5 }, { 0xAC00, 0xD7A3 }, }; #ifdef DEBUG for (int i = 0; i < sizeof(table) / sizeof(table[0]); i++) { //printf("%x\n", table[i][0]); assert(table[i][0] <= table[i][1]); if (i < sizeof(table) / sizeof(table[0]) - 1) assert(table[i][1] < table[i + 1][0]); } #endif if (u > 0xD7A3) goto Lisnot; // Binary search int mid; int low; int high; low = 0; high = sizeof(table) / sizeof(table[0]) - 1; while (low <= high) { mid = (low + high) >> 1; if (u < table[mid][0]) high = mid - 1; else if (u > table[mid][1]) low = mid + 1; else goto Lis; } Lisnot: #ifdef DEBUG for (int i = 0; i < sizeof(table) / sizeof(table[0]); i++) { assert(u < table[i][0] || u > table[i][1]); } #endif return 0; Lis: #ifdef DEBUG for (int i = 0; i < sizeof(table) / sizeof(table[0]); i++) { if (u >= table[i][0] && u <= table[i][1]) return 1; } assert(0); // should have been in table #endif return 1; }