Entry Tyszkiewicz:1998:KEP from tcs1995.bib

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

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BibTeX entry

@Article{Tyszkiewicz:1998:KEP,
  author =       "Jerzy Tyszkiewicz",
  title =        "The {Kolmogorov} expressive power of {Boolean} query
                 languages",
  journal =      j-THEOR-COMP-SCI,
  volume =       "190",
  number =       "2",
  pages =        "317--361",
  day =          "20",
  month =        jan,
  year =         "1998",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:21:29 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1998&volume=190&issue=2;
                 http://www.math.utah.edu/pub/tex/bib/tcs1995.bib",
  URL =          "http://www.elsevier.com/cas/tree/store/tcs/sub/1998/190/2/2630.pdf",
  acknowledgement = ack-nhfb,
  classification = "C4210L (Formal languages and computational
                 linguistics); C4240C (Computational complexity); C4250
                 (Database theory); C6140D (High level languages)",
  conflocation = "Prague, Czech Republic; 11-13 Jan. 1995",
  conftitle =    "5th International Conference on Database Theory - ICDT
                 '95",
  corpsource =   "Tech. Hochschule Aachen, Germany",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "Boolean queries; Boolean query languages;
                 computational complexity; database theory; finite
                 database; first order logic; formal languages; formal
                 logic; inflationary fixpoint logic; Kolmogorov
                 complexity based measure; Kolmogorov expressive power;
                 partial fixpoint logic; query languages; query
                 processing; standard expressive power",
  pubcountry =   "Netherlands",
  sponsororg =   "Int. Thompson Publishing; IDOMENEUS; COMPULOG NET; et
                 al",
  treatment =    "T Theoretical or Mathematical",
}

Related entries

based, 138(2)425, 140(1)73, 142(2)209, 163(1)161, 171(1)77, 171(1)111, 171(1)147, 173(1)253, 176(1)111, 183(2)253, 192(2)167, 194(1)246-1, 195(2)155, 207(1)131, 207(1)193, 209(1)163, 226(1)19, 226(1)117
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, 188(1)211, 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, 188(1)211, 190(2)115, 190(2)151, 190(2)167, 190(2)211, 190(2)241, 190(2)279, 190(2)363, 193(1)149, 193(1)215, 196(1)259, 197(1)243
C6140D, 135(1)67, 140(1)179, 142(1)59, 146(1)109, 146(1)145, 149(1)3, 149(1)67, 149(1)101, 152(1)67, 155(1)111, 160(1)217, 160(1)321, 165(1)201, 167(1)131, 168(1)155, 169(1)81, 170(1)145, 173(1)3, 173(1)151, 175(1)183, 176(1)283, 176(1)337, 179(1)273, 181(1)195, 183(2)157, 183(2)281, 185(2)319, 187(1)147, 190(2)211, 190(2)279, 192(2)201, 193(1)149, 193(1)215, 194(1)246-1, 197(1)241, 197(1)247
expressive, 139(1)69, 149(1)49, 149(1)67, 155(1)39, 160(1)321, 166(1)63, 173(1)151, 193(1)215, 206(1)181
first, 147(1)149, 160(1)241, 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, 194(1)246, 227(1)333
fixpoint, 138(1)141, 149(1)67, 160(1)283, 169(2)201, 176(1)205, 176(1)283, 177(1)27, 178(1)237, 194(1)241, 195(2)133, 198(1)131
high, 135(1)67, 140(1)179, 142(1)59, 144(1)101, 146(1)109, 146(1)145, 149(1)3, 149(1)67, 149(1)101, 151(1)195, 152(1)67, 155(1)111, 160(1)217, 160(1)321, 165(1)201, 167(1)131, 168(1)155, 169(1)81, 170(1)145, 173(1)3, 173(1)151, 175(1)183, 176(1)175, 176(1)283, 176(1)337, 179(1)273, 181(1)45, 181(1)195, 183(2)157, 183(2)281, 184(1)145, 185(2)259, 185(2)319, 187(1)147, 190(2)211, 190(2)279, 192(2)201, 193(1)149, 193(1)215, 194(1)246-1, 196(1)289, 197(1)241, 197(1)247, 205(1)261
Kolmogorov, 188(1)175, 191(1)245, 200(1)261
level, 135(1)67, 138(1)211, 140(1)95, 140(1)139, 140(1)179, 142(1)59, 146(1)109, 146(1)145, 149(1)3, 149(1)67, 149(1)101, 151(1)195, 152(1)67, 155(1)111, 160(1)217, 160(1)321, 165(1)201, 167(1)131, 168(1)155, 169(1)81, 170(1)145, 173(1)3, 173(1)151, 175(1)183, 176(1)175, 176(1)283, 176(1)337, 179(1)273, 181(1)195, 183(2)157, 183(2)281, 184(1)145, 185(2)319, 187(1)147, 190(2)211, 190(2)279, 192(2)201, 193(1)149, 193(1)215, 194(1)246-1, 196(1)347, 197(1)241, 197(1)247, 212(1)261, 266(1)997
measure, 145(1)241, 149(1)129, 151(1)163, 152(2)219, 154(2)307, 158(1)117, 159(1)81, 168(1)3, 172(1)195, 180(1)353, 193(1)53, 197(1)241, 207(1)245, 219(1)421
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)241, 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, 194(1)245, 194(1)246, 200(1)205, 204(1)131, 212(1)211, 225(1)177
partial, 138(2)273, 139(1)163, 140(1)73, 151(1)195, 152(1)91, 154(2)379, 155(1)157, 155(2)291, 160(1)87, 161(1)289, 162(1)79, 162(2)225, 164(1)287, 168(1)21, 168(1)155, 170(1)129, 170(1)145, 170(1)209, 171(1)247, 172(1)1, 173(2)513, 175(1)3, 175(1)127, 175(2)373, 179(1)217, 179(1)421, 180(1)243, 180(1)341, 181(1)195, 184(1)61, 184(1)145, 187(1)263, 190(2)167, 192(1)55, 194(1)1, 194(1)183, 194(1)245, 194(1)246, 195(2)259, 197(1)245-2, 206(1)127, 206(1)181, 209(1)1, 210(1)121, 216(1)311, 218(1)135, 219(1)379, 224(1)215
power, 137(1)85, 139(1)27, 148(2)207, 148(2)261, 149(1)49, 149(1)67, 151(1)79, 155(1)39, 160(1)271, 160(1)321, 166(1)63, 168(2)417, 173(1)151, 174(1)137, 180(1)139, 182(1)159, 183(1)113, 187(1)203, 188(1)117, 193(1)1, 193(1)53, 193(1)215, 199(1)145, 201(1)189, 206(1)181, 216(1)159, 218(1)143
processing, 140(2)319, 142(1)125, 144(1)125, 145(1)189, 146(1)145, 147(1)211, 149(1)151, 152(2)171, 153(1)65, 154(2)165, 155(2)321, 155(2)439, 158(1)1, 160(1)321, 161(1)205, 162(2)297, 163(1)117, 163(1)177, 163(1)303, 166(1)49, 170(1)1, 171(1)25, 171(1)179, 172(1)67, 173(1)49, 173(1)113, 173(1)151, 176(1)283, 178(1)129, 178(1)225, 178(1)275, 182(1)159, 183(1)33, 185(2)259, 186(1)1, 189(1)179, 190(2)167, 190(2)211, 190(2)279, 190(2)363, 192(2)233, 193(1)149, 193(1)215, 194(1)248-1, 196(1)45, 197(1)171, 199(1)105
standard, 147(1)117, 149(1)49, 157(1)79, 159(2)319, 160(1)1, 168(1)53, 170(1)349, 172(1)43, 173(2)445, 173(2)485, 176(1)159, 178(1)205, 179(1)301, 195(1)91, 212(1)157, 224(1)291