Entry Villemaire:1992:TU from tcs1990.bib

Last update: Wed Sep 26 02:11:46 MDT 2018               

Index sections

BibTeX entry

@Article{Villemaire:1992:TU,
  author =       "Roger Villemaire",
  title =        "The theory of {$\lfloor N + V_k, V_l\rfloor$} is
                 undecidable",
  journal =      j-THEOR-COMP-SCI,
  volume =       "106",
  number =       "2",
  pages =        "337--349",
  day =          "14",
  month =        dec,
  year =         "1992",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:16:51 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1992&volume=106&issue=2;
                 http://www.math.utah.edu/pub/tex/bib/tcs1990.bib",
  URL =          "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_sub/browse/browse.cgi?year=1992&volume=106&issue=2&aid=1234",
  acknowledgement = ack-nhfb,
  classification = "C4210 (Formal logic); C4220 (Automata theory)",
  corpsource =   "Dept. de math. et d'inf., Quebec Univ., Montreal,
                 Que., Canada",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "automata theory; decidability; encoding; first-order
                 theory; k-automata; undecidable",
  pubcountry =   "Netherlands",
  treatment =    "T Theoretical or Mathematical",
  xxnote =       "Check title??",
  xxtitle =      "The theory of {$<N,+,V_kV_l>$} is undecidable",
}

Related entries

• decidability, 71(1)29, 71(2)265, 71(3)281, 72(1)39, 73(3)295, 74(1)3, 74(1)71, 74(3)341, 78(2)347, 79(1)37, 79(1)263, 80(1)77, 80(2)227, 80(2)303, 81(1)137, 81(2)269, 81(2)289, 82(1)19, 82(1)131, 85(1)33, 85(2)253, 87(1)25, 87(2)287, 88(2)269, 88(2)325, 89(1)33, 91(1)71, 91(1)101, 94(1)1, 94(2)367, 95(1)115, 95(2)187, 96(2)325, 98(1)5, 98(2)199, 99(2)291, 101(1)143, 103(1)39, 103(1)143, 103(2)387, 106(1)87, 106(1)135, 108(1)103, 108(2)237, 109(1)83, 110(1)145, 110(2)419, 112(2)311, 113(1)93, 113(1)119, 114(1)93, 116(2)339, 117(1)39, 118(2)167, 118(2)193, 120(2)229, 121(1)71, 121(1)89, 123(2)315, 126(1)31, 126(1)113, 127(1)1, 127(1)69, 127(1)149, 127(2)229, 129(1)167, 129(2)419, 130(2)239, 131(2)243, 131(2)271, 131(2)431, 131(2)441, 132(1)37, 132(1)85, 132(1)129, 132(1)395, 134(1)107, 134(1)175, 134(2)287, 134(2)311, 134(2)329, 134(2)365, 135(2)345
• encoding, 72(1)55, 79(1)151, 86(2)365, 89(1)137, 92(1)213, 94(2)295, 97(1)1, 129(2)407, 134(1)63, 134(1)189, 135(1)155
• first-order, 73(1)47, 85(2)213, 93(2)169, 94(1)63, 95(1)75, 96(1)249, 97(1)157, 100(1)45, 102(1)207, 103(2)387, 104(1)109, 104(1)129, 105(1)57, 108(1)83, 111(1)145, 111(1)211, 111(1)253, 112(1)99, 113(1)3, 118(2)167, 118(2)231, 120(1)69, 122(1)69, 123(1)31, 123(1)117, 124(2)221, 126(1)97, 127(1)1, 131(1)95, 133(2)307, 135(1)139
• order, first-, 73(1)47, 85(2)213, 93(2)169, 94(1)63, 95(1)75, 96(1)249, 97(1)157, 100(1)45, 102(1)207, 103(2)387, 104(1)109, 104(1)129, 105(1)57, 108(1)83, 111(1)145, 111(1)211, 111(1)253, 112(1)99, 113(1)3, 118(2)167, 118(2)231, 120(1)69, 122(1)69, 123(1)31, 123(1)117, 124(2)221, 126(1)97, 127(1)1, 131(1)95, 133(2)307, 135(1)139
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