Entry Gyuris:1997:SPR from tcs1995.bib

Last update: Sun Oct 15 02:56:11 MDT 2017

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BibTeX entry

@Article{Gyuris:1997:SPR,
  author =       "Viktor Gyuris",
  title =        "A short proof of representability of fork algebras",
  journal =      j-THEOR-COMP-SCI,
  volume =       "188",
  number =       "1--2",
  pages =        "211--220",
  day =          "30",
  month =        nov,
  year =         "1997",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:21:22 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1997&volume=188&issue=1-2;
                 http://www.math.utah.edu/pub/tex/bib/tcs1995.bib",
  URL =          "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_sub/browse/browse.cgi?year=1997&volume=188&issue=1-2&aid=2499",
  acknowledgement = ack-nhfb,
  classification = "C4210 (Formal logic); C4250 (Database theory)",
  corpsource =   "Eotvos Lorand Geophys. Inst. of Hungary, Budapest,
                 Hungary",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "Boolean algebra; fork algebras representability;
                 process algebra; quasi-projective relation algebras;
                 relational algebra; Tarski's classical representation
                 theorem",
  pubcountry =   "Netherlands",
  treatment =    "P Practical; T Theoretical or Mathematical",
}

Related entries

boolean, 134(1)51, 137(1)109, 137(1)159, 137(2)237, 138(2)353, 139(1)187, 141(1)283, 143(2)335, 143(2)343, 145(1)45, 145(1)371, 155(2)411, 156(1)99, 157(2)139, 160(1)1, 160(1)321, 160(1)365, 161(1)141, 161(1)301, 163(1)1, 163(1)283, 168(1)39, 171(1)3, 172(1)135, 172(1)233, 172(1)293, 174(1)137, 175(2)257, 175(2)337, 179(1)251, 179(1)427, 180(1)47, 180(1)155, 180(1)243, 182(1)257, 186(1)171, 188(1)117, 190(2)317, 191(1)79, 197(1)247, 205(1)317, 207(2)329, 217(2)255, 223(1)193, 226(1)207
C4250, 139(1)1, 139(1)131, 141(1)311, 145(1)291, 146(1)145, 149(1)3, 149(1)101, 149(1)129, 149(2)333, 155(1)111, 155(1)221, 160(1)1, 160(1)217, 160(1)321, 163(1)177, 166(1)49, 171(1)281, 173(1)151, 173(1)283, 175(1)183, 179(1)103, 185(2)379, 190(2)115, 190(2)151, 190(2)167, 190(2)211, 190(2)241, 190(2)279, 190(2)317, 190(2)363, 193(1)149, 193(1)215, 196(1)259, 197(1)243
classical, 139(1)243, 148(2)303, 153(1)49, 162(1)23, 168(2)267, 175(1)75, 176(1)159, 178(1)155, 179(1)427, 180(1)269, 197(1)157, 197(1)241, 197(1)242, 197(1)247, 198(1)239, 227(1)43
proof, 135(1)67, 138(1)113, 138(2)243, 139(1)355, 140(1)95, 141(1)69, 150(1)161, 151(1)3, 151(2)487, 152(2)219, 153(1)49, 155(2)439, 165(1)3, 165(1)75, 165(1)171, 166(1)1, 166(1)173, 166(1)291, 167(1)171, 169(1)3, 170(1)1, 170(1)129, 170(1)407, 173(2)311, 173(2)393, 175(1)29, 175(1)159, 176(1)159, 176(1)283, 177(2)487, 178(1)257, 179(1)103, 179(1)137, 179(1)333, 180(1)309, 180(1)371, 181(2)317, 183(2)253, 184(1)1, 185(2)319, 189(1)71, 190(1)41, 191(1)37, 191(1)215, 193(1)53, 194(1)244-3, 194(1)247-2, 194(1)z, 197(1)242-3, 197(1)245-1, 197(1)245-2, 197(1)246-1, 197(1)246-2, 197(1)247-2, 198(1)201, 206(1)257, 206(1)331, 206(1)353, 212(1)141, 215(1)329, 216(1)271, 216(1)395, 227(1)299, 227(1)333
relation, 137(2)237, 138(2)391, 139(1)275, 139(1)315, 140(1)139, 141(1)311, 143(2)251, 143(2)269, 147(1)165, 147(1)181, 148(2)227, 149(1)3, 149(1)129, 149(1)179, 149(2)201, 149(2)299, 149(2)333, 150(1)77, 150(1)161, 151(2)437, 152(2)171, 152(2)269, 152(2)285, 155(1)85, 156(1)281, 159(2)191, 159(2)245, 159(2)355, 160(1)1, 160(1)305, 162(1)5, 162(1)45, 165(1)3, 167(1)171, 168(1)155, 171(1)281, 172(1)135, 172(1)309, 173(2)513, 174(1)67, 174(1)97, 175(2)373, 176(1)235, 176(1)283, 177(1)183, 179(1)103, 179(1)273, 180(1)1, 181(1)45, 184(1)105, 186(1)83, 186(1)157, 187(1)203, 193(1)129, 195(2)183, 198(1)159, 206(1)283, 207(1)105, 209(1)237, 209(1)287, 215(1)263
relational, 141(1)311, 144(1)125, 145(1)291, 149(1)3, 149(1)67, 149(1)101, 149(1)129, 149(2)333, 150(1)161, 151(1)125, 159(2)245, 160(1)1, 160(1)87, 160(1)217, 166(1)49, 166(1)173, 171(1)25, 171(1)179, 171(1)281, 173(1)151, 173(1)253, 173(1)283, 175(1)183, 176(1)283, 179(1)103, 185(2)379, 186(1)43, 190(2)279, 197(1)247-1, 200(1)1
representability, 137(1)25, 179(1)319
representation, 137(1)25, 138(1)201, 139(1)315, 140(1)5, 143(1)73, 145(1)329, 147(1)87, 151(1)277, 154(2)283, 157(1)53, 160(1)321, 163(1)161, 165(2)391, 166(1)1, 166(1)221, 167(1)193, 172(1)175, 172(1)255, 174(1)67, 175(2)239, 175(2)373, 176(1)1, 177(2)329, 178(1)1, 179(1)61, 179(1)301, 179(1)319, 179(1)427, 180(1)47, 180(1)269, 182(1)183, 185(1)15, 187(1)81, 193(1)181, 200(1)261, 210(1)159, 217(2)291, 217(2)359, 219(1)19, 225(1)1
short, 161(1)1, 197(1)235, 203(1)91