Entry Neumaier:1994:GRR from computing.bib

Last update: Wed Apr 11 02:01:07 MDT 2012               

Index sections

BibTeX entry

@Article{Neumaier:1994:GRR,
  author =       "A. Neumaier and Murray Hill",
  title =        "Global, Rigorous and Realistic Bounds for the Solution
                 of Dissipative Differential Equations. Part 1:
                 {Theory}",
  journal =      j-COMPUTING,
  volume =       "52",
  number =       "4",
  pages =        "315--336",
  month =        dec,
  year =         "1994",
  CODEN =        "CMPTA2",
  ISSN =         "0010-485X (print), 1436-5057 (electronic)",
  ISSN-L =       "0010-485X",
  MRclass =      "65G10 (34A45 65L05)",
  MRnumber =     "95f:65098",
  MRreviewer =   "F. Milinazzo",
  bibdate =      "Tue Oct 12 16:33:42 MDT 1999",
  bibsource =    "Compendex database;
                 http://springerlink.metapress.com/openurl.asp?genre=journal&issn=0010-485X;
                 http://www.math.utah.edu/pub/tex/bib/computing.bib;
                 MathSciNet database; OCLC Contents1st database",
  acknowledgement = ack-nhfb,
  classification = "921.2; 921.6",
  fjournal =     "Computing",
  journalabr =   "Comput Vienna New York",
  keywords =     "Calculations; Differential equations; Digital
                 arithmetic; Estimation; Initial value problem; Interval
                 analysis; Logarithmic norms; Numerical analysis;
                 Numerical methods; Peano existence theorem; Rigorous
                 enclosure",
}

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• 34A45, 48(2)191, 49(1)45, 54(1)1, 55(2)163, 59(4)285
• 65L05, 20(3)207, 20(3)267, 20(3)273, 20(4)333, 20(4)351, 22(2)125, 22(4)291, 22(4)339, 23(3)205, 23(4)345, 26(3)247, 26(4)355, 27(2)123, 27(2)165, 27(2)169, 29(2)153, 30(1)35, 31(1)69, 31(2)177, 31(4)371, 32(2)115, 32(3)229, 33(2)107, 33(2)131, 33(2)185, 34(1)17, 34(2)179, 34(3)265, 34(3)271, 35(1)13, 35(3)369, 36(1)17, 37(3)195, 38(1)33, 38(2)163, 38(4)281, 39(1)27, 39(2)175, 39(4)353, 40(3)241, 40(3)255, 41(1)131, 41(3)219, 41(4)349, 42(1)61, 42(4)329, 42(4)341, 43(2)115, 43(3)209, 43(3)223, 43(4)325, 44(1)59, 44(3)197, 44(3)209, 44(4)331, 45(1)93, 49(1)45, 50(1)87, 50(4)337, 51(2)151, 51(3)185, 51(3)209, 53(1)75, 53(1)95, 53(3)369, 54(4)347, 56(1)47, 58(2)173, 61(1)47, 77(3)237
• calculation, 1-2-vii, 2(3)232, 4(1)10, 6(1)35, 6(3)221, 7(1)65, 7(1)75, 7(3)357, 9(2)149, 11(1)73, 17(2)169, 21(4)359, 24(1)87, 28(1)1, 29(4)327, 30(2)137, 34(1)41, 35(3)231, 35(3)257, 35(3)269, 37(1)43, 37(1)85, 43(1)37, 46(1)67, 47(1)11, 52(3)213, 52(3)233, 53(1)75, 54(2)167, 54(4)283, 54(4)303, 54(4)317, 54(4)331, 54(4)347, 54(4)359, 55(2)181, 56(1)47, 57(2)149, 58(4)335, 59(2)115, 59(2)139, 59(2)153
• digital, 1-2-vii, 1(4)341, 2(1)82, 2(1)86-1, 2(3)300, 2(4)377, 2(4)378-1, 3(1)9, 4(1)85-2, 5(2)163, 6(3)295, 6(3)375-1, 7(1)139-2, 7(3)311, 8(1)62, 13(1)89-2, 16(1)1, 16(4)359, 19(3)189, 20(3)189, 21(2)105, 22(3)225, 23(2)99, 23(4)367, 25(1)1, 25(1)17, 30(1)1, 31(4)305, 33(1)1, 35(1)1, 37(1)85, 38(1)75, 38(2)101, 39(2)155, 39(3)187, 40(1)9, 40(3)267, 45(2)95, 46(2)131, 46(2)143, 46(2)155, 46(2)175, 46(3)183, 47(3)199, 47(3)215, 52(4)355, 57(1)1, 59(2)95, 59(4)349, 64(4)339, 81(2)199
• dissipative, 42(1)61, 51(3)209, 55(2)163
• enclosure, 6(1)72, 8(3)208, 42(2)245, 50(3)255, 53(3)369, 59(1)63, 75(2)133, 78(1)81, 79(1)61, 92(4)297, 94(2)281
• estimation, 1-2-vii, 2(4)336, 6(3)241, 9(2)101, 9(2)127, 10(1)63, 11(4)365, 12(2)163, 18(4)361, 19(4)313, 33(2)131, 34(2)179, 36(1)43, 38(2)89, 39(2)165, 41(1)75, 52(3)245, 53(1)33, 54(1)69, 55(2)181, 55(3)255, 55(4)305, 58(1)31, 59(2)163, 60(1)1, 60(2)175, 60(3)243, 61(4)371, 62(3)243, 66(4)395, 70(3)205, 76(1)55, 77(4)335, 78(1)81, 81(2)109
• existence, 1-2-vii, 1(4)316, 3(3)227, 8(1)143, 8(1)166, 12(3)247, 14(3)251, 15(3)251, 23(1)73, 24(2)195, 39(1)77, 40(1)85, 44(2)91, 46(1)19, 49(1)25, 60(3)229, 70(4)349, 72(3)247, 72(3)349, 79(1)53
• global, 1-2-vii, 5(3)253, 23(1)85, 28(4)345, 29(4)289, 33(2)185, 33(3)193, 34(1)73, 34(1)81, 36(1)43, 36(1)91, 38(3)275, 39(1)77, 39(4)281, 41(3)275, 43(1)85, 43(4)309, 45(4)291, 46(1)87, 47(3)295, 48(3)319, 53(3)337, 56(4)343, 57(2)149, 57(4)323, 59(1)91, 63(2)145, 65(1)27, 65(3)263, 82(1)77, 94(2)325
• initial, 8(1)182, 12(3)247, 14(3)225, 15(3)251, 17(2)177, 17(3)247, 17(4)361, 18(1)79, 18(2)131, 18(3)249, 19(3)251, 21(1)17, 22(2)125, 23(1)73, 24(1)21, 24(4)315, 27(2)123, 29(2)153, 33(3)297, 34(2)179, 34(3)271, 35(1)13, 36(1)35, 37(3)195, 38(4)281, 39(1)27, 39(2)175, 39(4)371, 42(1)61, 42(4)341, 44(1)59, 45(3)193, 50(1)87, 50(4)337, 51(2)151, 53(3)233, 53(3)369, 54(2)167, 57(2)163, 61(1)11, 61(1)69, 63(3)265, 92(3)243
• logarithmic, 10(1)1, 15(3)263, 25(2)89, 34(3)221, 34(4)325, 34(4)349, 38(4)315, 44(3)197, 46(2)175, 58(4)365, 73(4)295, 78(1)55
• Neumaier, A., 1-2-vii, 34(4)365, 40(1)85, 58(1)31
• norm, 1-2-vii, 1(3)273, 4(3)202, 5(3)214, 5(4)349, 6(3)330, 7(3)344, 8(3)343, 9(2)87, 10(1)1, 12(1)67, 14(3)235, 17(4)309, 21(1)37, 24(1)1, 24(4)349, 40(1)29, 44(3)197, 53(1)75, 61(3)235, 69(3)265, 76(1)55, 76(1)135
• part, 1-2-vii, 2(3)298-1, 3(3)194, 3(4)245, 5(1)17, 5(2)119, 6(1)214, 15(4)291, 15(4)311, 33(2)107, 47(2)137, 47(2)153, 52(4)337, 59(1)17, 62(2)89, 64(1)21, 75(1)85, 76(3)177, 76(3)203, 82(2)103, 82(2)121, 88(3)131, 88(3)155
• Peano, 52(4)337, 55(3)255, 78(1)81
• theorem, 1-2-vii, 5(4)333, 6(1)216, 6(3)330, 6(3)342, 7(3)153, 7(3)215, 8(1)143, 8(1)166, 8(3)216, 11(4)327, 12(1)43, 12(3)247, 14(1)141, 14(1)183, 14(3)251, 15(1)53, 16(4)359, 17(2)105, 17(2)177, 17(4)335, 18(3)249, 20(3)241, 20(4)307, 24(1)9, 24(1)51, 24(2)161, 24(2)195, 24(4)299, 27(3)237, 33(2)141, 33(3)237, 35(1)93, 36(4)285, 37(3)227, 38(3)209, 40(3)273, 41(4)359, 43(1)93, 44(1)83, 52(3)213, 54(1)1, 54(4)331, 57(3)273, 58(3)281, 59(1)1, 59(1)91, 59(3)223, 59(4)307, 59(4)331, 60(4)285, 61(4)371, 62(1)11, 62(1)45, 65(1)27, 75(2)181, 78(4)355, 92(4)297