Entry Hebisch:1992:GSS from tcs1990.bib

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

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BibTeX entry

@Article{Hebisch:1992:GSS,
  author =       "U. Hebisch and H. J. Weinert",
  title =        "Generalized semigroup semirings which are
                 zero-divisor-free or multiplicatively
                 left-cancellative",
  journal =      j-THEOR-COMP-SCI,
  volume =       "92",
  number =       "2",
  pages =        "269--289",
  day =          "20",
  month =        jan,
  year =         "1992",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Sat Nov 22 13:24:22 MST 1997",
  bibsource =    "http://www.math.utah.edu/pub/tex/bib/tcs1990.bib",
  acknowledgement = ack-nhfb,
  classification = "C4130 (Interpolation and function approximation);
                 C4220 (Automata theory)",
  corpsource =   "Tech. Univ., Clausthal-Zellerfeld, Germany",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "automata theory; free partially commutative monoids;
                 generalized semigroup semirings; multiplicatively
                 left-cancellative; polynomial semiring; polynomials;
                 power series; series (mathematics); zero-divisor-free",
  pubcountry =   "Netherlands",
  treatment =    "T Theoretical or Mathematical",
}

Related entries

approximation, 70(1)35, 74(1)19, 77(3)331, 79(1)151, 79(1)195, 79(1)227, 81(1)77, 84(2)151, 88(2)313, 93(1)91, 94(1)63, 94(2)175, 100(1)243, 102(2)283, 103(1)107, 106(2)265, 107(1)145, 117(1)113, 123(1)95, 125(2)295, 125(2)345, 125(2)355, 127(2)269, 130(1)5, 133(1)65, 133(1)105, 133(1)141, 133(1)165, 134(1)51, 134(2)473
C4130, 74(1)19, 79(1)151, 79(1)195, 79(1)227, 81(1)77, 84(2)151, 88(2)313, 93(1)91, 94(2)175, 100(1)243, 102(2)283, 106(2)265, 117(1)113, 123(1)95, 125(2)295, 125(2)345, 125(2)355, 127(2)269, 130(1)5, 133(1)65, 133(1)105, 133(1)141, 133(1)165
commutative, 73(3)335, 74(1)3, 74(2)121, 78(2)319, 83(2)261, 86(2)233, 92(1)77, 92(2)249, 96(2)405, 97(2)301, 98(1)41, 98(1)z, 99(2)291, 104(2)207, 108(1)3, 115(2)359, 117(1)217, 117(1)z, 120(1)101, 126(1)53, 131(2)475, 134(1)131
free, 70(2)179, 71(2)265, 72(1)65, 73(1)81, 73(3)335, 74(1)3, 74(2)121, 78(2)319, 79(1)227, 79(1)241, 86(2)233, 92(1)77, 92(2)249, 94(2)199, 94(2)367, 97(1)67, 97(2)301, 98(1)5, 98(1)79, 98(1)115, 99(2)231, 100(1)67, 100(2)267, 101(2)161, 102(1)185, 103(1)25, 103(1)51, 108(1)z, 112(2)311, 115(2)359, 116(2)421, 117(1)91, 117(1)217, 119(2)363, 121(1)309, 123(2)427, 125(2)167, 126(2)237, 134(1)3, 134(1)107, 134(1)209, 134(2)537
generalized, 70(1)35, 79(1)137, 79(1)263, 83(2)261, 84(2)165, 89(1)107, 90(1)61, 91(1)23, 91(1)101, 104(2)285, 110(1)215, 111(1)103, 112(1)53, 112(1)99, 112(2)399, 116(1)117, 116(2)405, 117(1)137, 119(1)103, 119(2)267, 123(2)329, 127(2)269, 131(1)121, 133(1)65
interpolation, 74(1)19, 79(1)151, 79(1)195, 79(1)227, 79(2)295, 81(1)77, 84(2)151, 88(2)313, 93(1)91, 94(2)175, 100(1)243, 102(2)283, 106(2)265, 113(2)211, 117(1)113, 123(1)95, 125(2)295, 125(2)345, 125(2)355, 127(2)269, 130(1)5, 133(1)65, 133(1)105, 133(1)141, 133(1)165
monoid, 73(1)81, 73(3)335, 74(1)3, 74(2)121, 76(2)251, 78(2)319, 78(2)347, 81(1)17, 84(2)225, 86(2)233, 91(2)285, 92(1)77, 92(2)249, 97(2)301, 98(1)5, 98(2)321, 99(2)231, 100(1)67, 104(2)161, 107(1)31, 108(1)103, 108(1)z, 112(2)311, 117(1)91, 117(1)z, 120(1)101, 123(2)239, 123(2)273, 125(2)167, 125(2)361, 131(2)271, 134(1)3, 134(1)13, 134(1)87, 134(1)107, 134(1)189, 134(1)209, 134(2)537
partially, 73(3)335, 74(1)3, 74(2)121, 78(2)319, 81(1)147, 86(2)233, 92(1)77, 92(2)249, 94(1)1, 96(2)405, 97(2)301, 99(2)291, 115(2)359, 117(1)217, 117(1)z, 120(1)101, 136(1)79
power, 70(1)159, 71(1)47, 73(2)177, 74(2)163, 79(1)3, 79(1)25, 79(1)163, 79(1)179, 79(1)195, 79(1)209, 79(1)257, 79(1)263, 80(1)1, 80(1)35, 80(2)125, 80(2)337, 81(2)269, 81(2)305, 83(2)261, 83(2)301, 85(1)171, 88(2)231, 93(1)1, 93(1)43, 93(2)265, 98(1)27, 98(1)53, 98(1)99, 98(1)z, 98(2)163, 98(2)249, 99(2)291, 99(2)327, 101(1)35, 101(1)143, 108(1)3, 108(2)385, 109(1)7, 110(1)131, 111(1)59, 111(1)z, 112(2)291, 113(1)75, 114(1)119, 114(2)201, 115(2)191, 115(2)359, 116(1)33, 116(1)95, 117(1)39, 117(1)113, 117(1)131, 117(1)169, 117(1)199, 117(1)289, 117(1)z, 127(1)171, 134(2)545, 136(1)21
semigroup, 72(1)65, 74(2)163, 84(2)251, 87(2)229, 87(2)315, 89(2)207, 108(1)3, 108(1)151, 108(1)z, 134(1)189, 134(1)z
semiring, 71(1)3, 79(1)137, 88(2)269, 97(2)245, 98(1)5, 98(1)27, 98(1)z, 109(1)49, 111(1)59, 126(1)113, 134(1)27
which, 74(1)3, 79(1)241, 84(2)251, 87(1)25, 120(1)83, 124(1)149