Entry Andrews:1997:LSD from tcs1995.bib

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

Index sections

Top | Symbols | Numbers | Math | A | B | C | D | E | F | G | H | I | J | K | L | M | N | O | P | Q | R | S | T | U | V | W | X | Y | Z

BibTeX entry

@Article{Andrews:1997:LSD,
  author =       "James Andrews",
  title =        "A logical semantics for depth-first {Prolog} with
                 ground negation",
  journal =      j-THEOR-COMP-SCI,
  volume =       "184",
  number =       "1--2",
  pages =        "105--143",
  day =          "30",
  month =        sep,
  year =         "1997",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:21:12 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1997&volume=184&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=184&issue=1-2&aid=2341",
  acknowledgement = ack-nhfb,
  classification = "C1230 (Artificial intelligence); C4210 (Formal
                 logic); C6110L (Logic programming)",
  corpsource =   "Dept. of Comput. Sci., Simon Fraser Univ., Burnaby,
                 BC, Canada",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "depth-first logic programming; depth-first Prolog;
                 disjunctive unfolding; ground negation; language
                 features; logic programming; logical semantics;
                 logically-motivated equivalence relations; multi-valued
                 logic interpretations; multivalued logic; negation as
                 failure; PROLOG",
  pubcountry =   "Netherlands",
  treatment =    "P Practical",
}

Related entries

C1230, 135(1)67, 137(1)3, 137(1)25, 137(1)53, 137(1)85, 137(1)159, 140(2)205, 140(2)231, 140(2)249, 140(2)265, 140(2)291, 140(2)301, 141(1)151, 141(1)253, 142(2)141, 142(2)209, 142(2)229, 142(2)257, 142(2)299, 143(1)51, 148(1)141, 149(1)129, 150(1)161, 151(1)3, 151(1)37, 151(2)437, 151(2)487, 152(1)91, 152(2)219, 152(2)269, 154(2)183, 155(1)157, 155(2)365, 160(1)283, 160(1)321, 161(1)235, 163(1)161, 164(1)185, 164(1)253, 165(1)171, 166(1)221, 166(1)291, 167(1)47, 167(1)73, 167(1)95, 170(1)129, 170(1)209, 170(1)383, 171(1)3, 171(1)61, 171(1)111, 171(1)147, 171(1)221, 171(1)247, 171(1)281, 172(1)43, 173(2)311, 173(2)393, 173(2)485, 174(1)251, 175(1)75, 177(1)155, 177(1)183, 180(1)155, 182(1)183, 184(1)1, 185(1)47, 185(1)63, 185(1)129, 185(1)159, 185(1)177, 185(1)191, 185(2)217, 185(2)277, 188(1)79, 189(1)109, 189(1)129, 192(1)77, 192(1)107, 192(2)259, 192(2)287, 192(2)315, 197(1)139, 197(1)245, 197(1)245-1, 197(1)246-1, 197(1)247-2
C6110L, 135(1)67, 142(1)27, 142(1)59, 142(1)89, 142(1)125, 142(2)141, 146(1)243, 149(2)201, 149(2)231, 151(1)37, 155(1)157, 158(1)279, 160(1)283, 165(1)171, 165(1)201, 166(1)101, 166(1)221, 169(1)81, 170(1)209, 170(1)383, 171(1)61, 171(1)77, 171(1)147, 173(1)3, 173(1)89, 173(1)113, 173(1)151, 173(1)183, 173(1)209, 173(1)235, 173(1)253, 173(1)283, 173(2)485, 176(1)175, 179(1)273, 182(1)183, 183(2)281, 184(1)1, 185(1)47, 185(1)191, 185(2)319, 190(2)211, 190(2)241, 192(1)77, 192(1)107, 192(2)259, 193(1)149, 194(1)245-2, 197(1)247
disjunctive, 155(1)157, 160(1)321, 185(1)47, 190(2)167, 204(1)99, 206(1)181
failure, 137(2)269, 160(1)283, 164(1)107, 171(1)61, 186(1)199, 193(1)97, 211(1)85, 220(1)3
feature, 146(1)243, 166(1)63, 173(1)235, 197(1)244-2, 210(2)245
ground, 142(2)229, 147(1)267, 160(1)283, 166(1)221, 167(1)73, 194(1)87
interpretation, 142(1)125, 159(2)319, 160(1)1, 166(1)83, 166(1)221, 175(1)75, 177(1)27, 179(1)273, 183(2)281, 190(2)241, 193(1)197, 197(1)1, 197(1)242-3, 199(1)167, 202(1)163, 222(1)77, 227(1)231
logical, 137(1)3, 138(1)201, 141(1)283, 143(1)51, 148(1)67, 149(2)201, 152(1)91, 154(1)67, 163(1)99, 166(1)173, 171(1)61, 173(2)311, 174(1)231, 175(1)75, 175(1)z, 176(1)283, 183(2)187, 184(1)237, 191(1)173, 194(1)247-1, 195(2)227, 197(1)246-2
multi-valued, 171(1)77
multivalued, 171(1)61, 171(1)77, 171(1)281
negation, 146(1)145, 149(2)231, 155(1)157, 160(1)283, 170(1)209, 170(1)383, 171(1)61, 184(1)1, 192(1)77
PROLOG, 169(1)81
Prolog, 165(1)201, 169(1)81, 176(1)111, 176(1)175
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, 186(1)83, 186(1)157, 187(1)203, 188(1)211, 193(1)129, 195(2)183, 198(1)159, 206(1)283, 207(1)105, 209(1)237, 209(1)287, 215(1)263
unfolding, 152(2)285, 153(1)171, 190(1)61
valued, multi-, 171(1)77