Entry Baaz:1996:CFO from tcs1995.bib

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

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BibTeX entry

@Article{Baaz:1996:CFO,
  author =       "Matthias Baaz and Alexander Leitsch and Richard Zach",
  title =        "Completeness of a first-order temporal logic with
                 time-gaps",
  journal =      j-THEOR-COMP-SCI,
  volume =       "160",
  number =       "1--2",
  pages =        "241--270",
  day =          "10",
  month =        jun,
  year =         "1996",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:20:01 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1996&volume=160&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=1996&volume=160&issue=1-2&aid=2048",
  acknowledgement = ack-nhfb,
  classification = "C1160 (Combinatorial mathematics); C4210 (Formal
                 logic); C4240 (Programming and algorithm theory)",
  corpsource =   "Inst. f{\"u}r Algebra und Diskrete Math., Tech. Univ.
                 Wien, Austria",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "branching gaps; completeness; cut free complete
                 sequent calculus; discrete linear time; first order
                 temporal logic; linear time; programming theory;
                 recursively axiomatizable; resolution system; temporal
                 logic; time gaps; time structures; trees; trees
                 (mathematics)",
  pubcountry =   "Netherlands",
  treatment =    "T Theoretical or Mathematical",
  xxauthor =     "M. Baaz and A. Leitsch and P. Zach",
}

Related entries

Baaz, Matthias, 224(1)3
branching, 138(2)391, 140(1)53, 145(1)45, 146(1)25, 148(1)93, 170(1)297, 172(1)293, 177(2)487, 179(1)217, 179(1)397, 181(1)141, 202(1)223
complete, 138(2)273, 138(2)391, 141(1)337, 142(2)209, 143(1)51, 145(1)147, 146(1)243, 146(1)321, 147(1)1, 147(1)69, 147(1)137, 152(2)251, 154(1)107, 154(2)247, 154(2)283, 160(1)185, 161(1)307, 164(1)141, 164(1)287, 166(1)203, 168(1)53, 168(1)155, 170(1)145, 170(1)245, 172(1)195, 176(1)89, 179(1)421, 183(2)229, 184(1)61, 184(1)237, 189(1)239, 190(2)279, 192(2)259, 192(2)315, 193(1)53, 195(1)61, 197(1)244-2, 206(1)331, 211(1)339, 220(2)363, 221(1)157
completeness, 138(2)273, 139(1)27, 141(1)109, 143(1)149, 145(1)111, 146(1)243, 150(1)161, 151(1)3, 151(2)487, 152(1)139, 155(1)1, 163(1)99, 164(1)141, 167(1)95, 170(1)173, 173(1)183, 175(1)29, 177(1)217, 183(2)187, 183(2)253, 185(2)393, 190(1)41, 195(1)61, 197(1)242-1, 197(1)243-1, 197(1)245-1, 197(1)246-2, 215(1)349, 227(1)249
cut, 157(2)215, 176(1)235, 177(1)155, 181(2)267
discrete, 134(1)51, 138(1)3, 138(1)35, 138(1)67, 138(1)101, 138(1)113, 138(1)201, 138(1)211, 139(1)163, 140(2)231, 144(1)3, 148(1)67, 155(2)321, 156(1)1, 157(1)z, 168(2)405, 178(1)225, 186(1)1, 194(1)240, 197(1)157, 218(2)347, 226(1)7
first, 147(1)149, 160(1)271, 160(1)305, 162(2)351, 176(1)67, 177(1)59, 177(1)217, 179(1)137, 183(2)157, 185(2)277, 187(1)7, 190(2)115, 190(2)317, 194(1)246, 227(1)333
first-order, 139(1)207, 142(2)141, 144(1)59, 146(1)69, 146(1)243, 148(2)261, 149(1)49, 149(1)67, 149(1)101, 152(1)91, 154(1)67, 156(1)177, 160(1)271, 160(1)305, 165(1)3, 166(1)63, 170(1)173, 171(1)179, 172(1)135, 173(1)151, 173(2)349, 173(2)393, 173(2)513, 176(1)67, 176(1)283, 184(1)237, 185(1)47, 185(2)217, 185(2)393, 192(2)315, 193(1)129, 194(1)247-1, 197(1)247-1, 208(1)179, 216(1)55, 222(1)55, 222(1)153
free, 138(2)391, 141(1)331, 142(2)229, 145(1)229, 152(1)91, 153(1)271, 163(1)55, 164(1)223, 165(2)325, 165(2)355, 168(1)105, 170(1)47, 175(2)393, 179(1)421, 183(1)83, 187(1)105, 191(1)117, 191(1)145, 192(1)107, 197(1)189, 204(1)35, 204(1)131, 224(1)13, 224(1)157, 225(1)149
gap, 154(2)307, 188(1)101, 203(1)31, 229(1)11
order, 138(2)273, 142(1)89, 143(1)73, 144(1)101, 145(1)271, 147(1)149, 151(1)207, 151(1)z, 154(2)165, 154(2)379, 156(1)119, 160(1)87, 160(1)271, 160(1)305, 162(2)351, 163(1)117, 163(1)269, 168(1)155, 170(1)145, 174(1)67, 175(1)3, 175(1)127, 175(2)225, 175(2)283, 175(2)337, 175(2)349, 175(2)373, 175(2)393, 176(1)67, 176(1)235, 177(1)59, 177(1)217, 179(1)137, 179(1)217, 179(1)421, 180(1)17, 183(2)157, 183(2)187, 184(1)61, 185(2)277, 187(1)7, 187(1)27, 190(2)317, 194(1)245, 194(1)246, 200(1)205, 204(1)131, 212(1)211, 225(1)177
order, first-, 139(1)207, 142(2)141, 144(1)59, 146(1)69, 146(1)243, 148(2)261, 149(1)49, 149(1)67, 149(1)101, 152(1)91, 154(1)67, 156(1)177, 160(1)271, 165(1)3, 166(1)63, 170(1)173, 171(1)179, 172(1)135, 173(1)151, 173(2)349, 173(2)393, 173(2)513, 176(1)67, 176(1)283, 184(1)237, 185(1)47, 185(2)217, 185(2)393, 192(2)315, 193(1)129, 194(1)247-1, 197(1)247-1, 208(1)179, 216(1)55, 222(1)55, 222(1)153
recursively, 147(1)149, 161(1)235, 161(1)263, 168(2)321, 197(1)79, 205(1)61, 205(1)195
resolution, 160(1)283, 166(1)147, 185(2)393, 198(1)201, 200(1)335, 201(1)137, 206(1)163
sequent, 159(2)343, 197(1)246, 197(1)247, 212(1)141, 224(1)157
temporal, 138(1)169, 138(1)201, 139(1)1, 139(1)115, 140(1)73, 140(1)95, 148(2)303, 160(1)271, 166(1)1, 167(1)47, 170(1)1, 171(1)25, 173(1)49, 173(1)89, 173(2)513, 179(1)273, 179(1)333, 179(1)353, 181(1)195, 183(2)187, 185(2)319, 186(1)135, 190(1)41, 193(1)197, 194(1)246-2, 195(2)133, 195(2)183, 202(1)55, 220(2)377, 224(1)135