Entry Droste:1993:SD from tcs1990.bib

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

Index sections

Top | Symbols | Numbers | Math | A | B | C | D | E | F | G | H | I | J | K | L | M | N | O | P | Q | R | S | T | U | V | W | X | Y | Z

BibTeX entry

@Article{Droste:1993:SD,
  author =       "Manfred Droste",
  title =        "On stable domains",
  journal =      j-THEOR-COMP-SCI,
  volume =       "111",
  number =       "1--2",
  pages =        "89--101",
  day =          "12",
  month =        apr,
  year =         "1993",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:17:06 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1993&volume=111&issue=1-2;
                 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=1993&volume=111&issue=1-2&aid=1288",
  acknowledgement = ack-nhfb,
  classification = "C4210 (Formal logic); C4240 (Programming and
                 algorithm theory)",
  conflocation = "Kingston, Ont., Canada; May 1990",
  conftitle =    "Sixth Workshop on the Mathematical Foundations of
                 Programming Semantics",
  corpsource =   "Univ. GHS Essen, Germany",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "bifinite domains; cartesian-closed; closure
                 properties; compact elements; continuous functions;
                 countable cartesian products; denotational semantics;
                 dI-domains; distributive stable L-domains; finiteness
                 condition; formal languages; high level languages;
                 morphisms; order theory; Plotkin powerdomain operation;
                 programming languages; programming theory; stability;
                 stable domains; stable function space; universal
                 objects",
  pubcountry =   "Netherlands",
  treatment =    "T Theoretical or Mathematical",
}

Related entries

bifinite, 79(2)359, 103(2)311
cartesian, 70(1)65, 70(1)159, 70(2)193, 70(2)233, 73(1)101, 88(2)231, 98(2)263, 107(2)169, 111(1)145, 119(1)103, 124(2)195, 136(1)109, 136(1)125
cartesian-closed, 118(2)301
closed, cartesian-, 118(2)301
closure, 70(2)251, 73(2)213, 76(2)261, 76(2)273, 78(2)377, 80(1)53, 81(1)117, 82(2)215, 82(2)389, 83(2)249, 85(1)171, 86(2)233, 88(2)191, 88(2)287, 91(1)71, 93(1)43, 93(2)227, 93(2)321, 96(2)285, 97(2)217, 100(1)157, 103(1)3, 108(2)185, 116(1)95, 117(1)z, 120(2)293, 125(2)167, 125(2)243, 126(2)183, 127(1)25, 127(1)149, 127(2)287, 132(1)243, 134(2)329
compact, 82(1)1, 99(2)213, 103(2)311
condition, 70(1)35, 70(1)151, 70(2)179, 72(1)27, 74(1)3, 75(1)111, 83(1)57, 83(2)189, 86(1)81, 86(2)233, 87(2)315, 88(2)269, 93(2)185, 93(2)227, 93(2)279, 94(1)101, 94(1)141, 94(2)335, 95(2)307, 97(1)143, 97(2)233, 100(1)157, 100(2)267, 100(2)325, 103(1)39, 105(1)7, 109(1)181, 110(1)1, 112(1)145, 112(2)413, 113(1)93, 118(2)301, 120(1)69, 120(2)197, 121(1)309, 126(2)183, 129(1)123, 131(2)271, 132(1)259
continuous, 70(2)233, 76(2)309, 79(2)357, 83(2)219, 95(1)143, 111(1)103, 113(2)191, 114(2)201, 119(1)103, 121(1)351, 121(1)411, 133(1)z, 136(1)21
countable, 113(1)3, 132(1)337
denotational, 70(1)127, 71(2)193, 71(2)z, 75(1)15, 75(3)289, 76(2)179, 77(1)73, 83(1)57, 86(1)3, 90(1)127, 90(1)209, 91(1)23, 97(1)67, 101(2)239, 118(2)231, 124(1)71, 135(2)171, 136(1)243
dI-domains, 93(1)143, 123(1)31
distributive, 94(2)199, 114(2)201, 126(2)237
domain, 70(1)65, 70(1)151, 70(2)233, 73(1)101, 75(1)15, 75(3)289, 76(1)3, 76(1)53, 76(2)309, 77(1)73, 79(2)359, 82(2)409, 87(1)1, 87(1)163, 90(1)127, 90(1)171, 90(2)369, 91(1)23, 91(2)285, 94(1)37, 94(1)63, 103(1)107, 103(2)311, 111(1)59, 111(1)103, 111(1)z, 114(1)63, 114(2)201, 115(1)77, 118(2)301, 119(1)23, 119(1)103, 119(1)z, 120(1)101, 121(1)113, 121(1)179, 121(1)187, 122(1)3, 124(2)195, 124(2)221, 132(1)347, 133(1)165, 135(1)111, 135(2)289, 136(1)21, 136(1)57, 136(1)109
domains, dI-, 93(1)143, 123(1)31
domains, L-, 79(2)359, 111(1)103
Droste, Manfred, 135(2)289
element, 70(2)233, 74(2)163, 79(2)357, 96(2)325, 97(1)67, 110(1)99, 119(2)267, 123(1)89, 123(2)407, 129(2)397
finiteness, 87(2)315, 98(1)5, 131(2)271, 134(2)365
high, 71(1)155, 71(2)193, 72(2)133, 73(2)177, 73(2)213, 75(1)15, 75(1)45, 75(1)67, 77(1)73, 77(1)97, 77(1)195, 80(2)319, 81(2)201, 82(2)373, 85(1)75, 89(1)179, 94(1)125, 95(1)43, 96(1)73, 100(1)157, 101(2)289, 105(1)85, 111(1)3, 111(1)145, 116(1)59, 116(1)95, 131(1)139, 132(1)37, 133(2)361, 134(1)119, 135(1)67, 136(1)277
L-domains, 79(2)359, 111(1)103
level, 71(1)155, 71(2)193, 72(2)133, 73(2)177, 73(2)213, 75(1)15, 75(1)45, 75(1)67, 77(1)73, 77(1)97, 77(1)195, 80(2)319, 81(2)201, 81(2)257, 82(2)373, 85(1)75, 89(1)107, 89(1)179, 94(1)125, 95(1)1, 95(1)43, 96(1)73, 100(1)157, 101(2)289, 104(2)285, 105(1)85, 111(1)3, 111(1)145, 112(1)5, 116(1)59, 116(1)95, 130(1)73, 131(1)139, 133(2)361, 134(1)119, 135(1)67, 136(1)277
morphism, 70(2)193, 70(3)277, 72(1)65, 73(3)329, 76(2)243, 77(1)27, 82(1)19, 88(2)365, 91(2)239, 94(1)37, 109(1)123, 109(1)181, 116(2)305, 134(2)403
object, 70(1)65, 70(1)159, 75(1)157, 76(1)53, 77(1)27, 79(1)209, 81(1)17, 85(2)333, 87(1)115, 90(1)17, 90(1)81, 90(2)391, 91(1)23, 103(1)107, 115(1)63, 116(1)59, 118(1)81, 119(1)39, 127(2)333
operation, 71(3)425, 72(2)203, 73(2)213, 76(2)261, 77(1)27, 78(2)377, 79(2)357, 84(2)293, 87(1)43, 88(1)127, 88(1)139, 89(2)207, 91(1)71, 92(1)49, 95(2)245, 99(2)243, 101(2)177, 103(2)283, 105(2)217, 107(2)333, 109(1)257, 110(1)99, 110(2)405, 112(2)291, 115(1)131, 116(1)33, 116(1)195, 117(1)39, 117(1)187, 117(1)289, 119(1)23, 119(1)103, 119(2)355, 125(2)229, 125(2)315, 125(2)345, 126(2)183, 127(2)255, 129(2)397, 130(1)49, 130(1)73, 130(1)125, 132(1)129, 133(1)141, 133(2)421
order, 70(1)65, 70(1)127, 74(1)37, 74(2)121, 74(2)183, 75(3)289, 79(2)295, 83(2)287, 84(2)165, 87(1)81, 87(1)97, 89(1)3, 90(1)185, 92(2)227, 94(1)63, 98(1)53, 98(1)z, 101(2)265, 105(2)217, 106(2)361, 108(1)z, 111(1)3, 112(1)5, 115(1)77, 116(1)117, 116(2)227, 117(1)91, 118(2)231, 119(2)267, 121(1)351, 124(1)1, 126(2)143, 133(1)35, 134(1)87, 134(1)253, 134(1)z, 136(1)79, 136(2)507
Plotkin, 82(2)403, 121(1)179, 131(1)181, 136(1)21
powerdomain, 91(1)23, 103(2)311, 124(2)195, 136(1)3
product, 74(2)121, 74(2)163, 76(2)251, 76(2)261, 79(1)137, 79(1)163, 79(1)257, 79(2)359, 80(1)35, 83(2)261, 86(2)143, 87(2)229, 94(2)161, 96(2)405, 98(1)99, 98(1)115, 104(2)161, 106(2)361, 108(1)151, 111(1)145, 111(1)211, 116(1)33, 119(1)103, 119(1)z, 124(2)195, 125(1)149, 131(2)449, 131(2)475, 136(1)3
space, 70(1)159, 70(2)233, 71(3)347, 73(1)1, 74(1)115, 74(2)183, 74(3)273, 75(1)15, 75(1)85, 76(2)179, 77(3)221, 80(2)289, 82(1)1, 82(1)165, 85(2)353, 86(1)3, 87(1)1, 87(1)43, 88(1)83, 91(1)1, 92(1)3, 92(1)33, 92(1)87, 93(1)143, 93(2)201, 94(2)175, 95(2)231, 95(2)245, 96(1)157, 96(1)z, 96(2)411, 97(2)183, 99(1)121, 101(1)99, 101(2)239, 103(2)283, 110(1)99, 111(1)103, 111(1)191, 111(1)z, 113(2)191, 114(2)273, 119(1)63, 123(1)139, 124(1)1, 124(2)195, 124(2)343, 125(2)295, 125(2)345, 125(2)355, 127(1)171, 127(2)199, 129(2)397, 130(1)85, 130(1)203, 132(1)319, 133(1)49, 134(1)131, 134(2)529, 135(2)171
stability, 80(1)117, 85(2)353, 89(2)207, 106(2)243, 108(2)237
stable, 93(1)143, 103(2)365, 105(1)7, 111(1)103, 111(1)z, 127(2)255, 136(1)21
universal, 70(1)3, 70(1)35, 77(1)131, 77(3)291, 79(1)227, 82(2)303, 89(2)207, 91(1)23, 93(1)43, 94(1)37, 96(2)411, 97(1)157, 98(1)115, 100(1)137, 100(2)385, 107(1)121, 108(2)331, 110(1)53, 111(1)211, 114(1)63, 115(1)151, 121(1)441, 122(1)263, 123(2)199, 124(2)297, 132(1)113