Entry Grigoriev:1996:NSS from tcs1995.bib

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

Index sections

BibTeX entry

@Article{Grigoriev:1996:NSS,
  author =       "D. Grigoriev",
  title =        "{NC} solving of a system of linear ordinary
                 differential equations in several unknowns",
  journal =      j-THEOR-COMP-SCI,
  volume =       "157",
  number =       "1",
  pages =        "79--90",
  day =          "09",
  month =        apr,
  year =         "1996",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:19:50 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1996&volume=157&issue=1;
                 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=157&issue=1&aid=2117",
  acknowledgement = ack-nhfb,
  classification = "B0290P (Differential equations); C4170 (Differential
                 equations)",
  conflocation = "Paris, France; 6-7 June 1994",
  conftitle =    "Workshop on Algorithmic Complexity of Algebraic and
                 Geometric Models",
  corpsource =   "Dept. of Comput. Sci., Pennsylvania State Univ.,
                 University Park, PA, USA",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "computability; linear differential equations; linear
                 ordinary differential equations; NC algorithm; NC
                 solving; standard basis form",
  pubcountry =   "Netherlands",
  treatment =    "P Practical; T Theoretical or Mathematical",
}

Related entries

• B0290P, 144(1)59, 157(1)3, 187(1)87
• basis, 159(1)105, 159(2)355, 161(1)69, 165(1)133, 166(1)203, 172(1)303, 187(1)179
• C4170, 138(1)67, 144(1)59, 147(1)267, 157(1)3, 157(1)115, 157(1)z, 162(2)225, 187(1)81, 187(1)87, 187(1)263, 187(1)z
• computability, 137(1)129, 139(1)243, 142(1)27, 145(1)111, 147(1)31, 153(1)49, 154(2)145, 155(1)277, 157(1)91, 157(2)267, 160(1)365, 161(1)109, 161(1)289, 162(1)5, 162(1)23, 162(1)45, 162(1)117, 163(1)177, 165(1)133, 166(1)147, 168(2)241, 168(2)461, 171(1)3, 172(1)233, 174(1)137, 175(1)183, 175(2)349, 181(1)195, 184(1)195, 190(2)279, 191(1)145, 191(1)229, 192(2)315, 193(1)149, 194(1)219, 194(1)247-1, 195(2)183, 210(1)73, 219(1)65, 219(1)185, 219(1)287, 219(1)421, 219(1)467, 219(1)487, 224(1)173
• differential, 138(1)67, 144(1)59, 147(1)267, 157(1)3, 157(1)101, 157(1)115, 157(1)z, 162(2)225, 187(1)3, 187(1)7, 187(1)27, 187(1)49, 187(1)81, 187(1)87, 187(1)263, 187(1)z, 197(1)203, 209(1)107
• equation, 138(1)67, 143(1)51, 144(1)59, 144(1)161, 145(1)71, 147(1)267, 151(1)257, 153(1)49, 154(1)3, 155(1)221, 155(1)267, 157(1)3, 157(1)115, 157(1)z, 162(2)225, 168(1)105, 170(1)349, 173(1)183, 176(1)205, 176(1)347, 177(1)217, 177(2)407, 179(1)217, 180(1)287, 186(1)83, 187(1)3, 187(1)7, 187(1)27, 187(1)49, 187(1)81, 187(1)87, 187(1)179, 187(1)263, 187(1)z, 191(1)145, 192(1)3, 193(1)113, 196(1)395, 197(1)247, 216(1)395, 224(1)215, 225(1)149
• form, 137(1)129, 139(1)115, 139(1)243, 139(1)315, 146(1)185, 152(2)269, 152(2)285, 154(1)41, 155(1)1, 155(1)85, 155(1)141, 157(1)53, 159(2)343, 161(1)205, 170(1)407, 176(1)39, 185(2)379, 186(1)231, 190(1)41, 194(1)z, 195(2)155, 197(1)z, 208(1)33
• Grigoriev, D., 157(2)185, 180(1)217
• NC, 141(1)337, 143(2)309, 145(1)381, 148(1)57, 148(2)183, 215(1)89
• ordinary, 138(1)67, 139(1)207, 147(1)267, 151(1)79, 187(1)87, 187(1)263
• several, 144(1)59, 147(1)69, 207(2)329, 210(2)341
• solving, 155(1)221, 156(1)217, 158(1)279, 160(1)145, 160(1)185, 173(1)183, 173(1)253, 186(1)83, 201(1)275, 224(1)215
• standard, 147(1)117, 149(1)49, 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, 190(2)317, 195(1)91, 212(1)157, 224(1)291
• unknown, 178(1)225