Entry Bloom:1996:FPO from tcs1995.bib

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

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BibTeX entry

@Article{Bloom:1996:FPO,
  author =       "Stephen L. Bloom and Zolt{\'a}n {\'E}sik",
  title =        "Fixed point operations on {CCC}'s. {Part I}",
  journal =      j-THEOR-COMP-SCI,
  volume =       "155",
  number =       "1",
  pages =        "1--38",
  day =          "26",
  month =        feb,
  year =         "1996",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:19:44 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1996&volume=155&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=155&issue=1&aid=1950",
  acknowledgement = ack-nhfb,
  classification = "C1160 (Combinatorial mathematics)",
  corpsource =   "Dept. of Comput. Sci., Stevens Inst. of Technol.,
                 Hoboken, NJ, USA",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "Cartesian closed categories; category theory; Conway
                 identities; equational properties; fixed-point
                 operations; functional completeness theorem; morphisms;
                 normal form; poset categories; semantics",
  pubcountry =   "Netherlands",
  treatment =    "T Theoretical or Mathematical",
  xxtitle =      "Fixed-point operations on {CCC's}. {I}",
}

Related entries

Ésik, Zoltán, 163(1)55, 179(1)1
Bloom, Stephen L., 163(1)55, 179(1)1
cartesian, 155(1)221, 166(1)203, 186(1)135
category, 139(1)115, 146(1)5, 146(1)311, 147(1)137, 149(1)3, 150(1)57, 150(1)111, 151(1)3, 153(1)171, 153(1)211, 154(2)307, 155(1)221, 159(2)355, 160(1)217, 164(1)207, 166(1)203, 170(1)277, 170(1)297, 170(1)349, 170(1)407, 175(1)29, 176(1)347, 177(1)3, 177(1)27, 177(1)73, 177(1)111, 179(1)203, 179(1)421, 184(1)61, 190(1)87, 193(1)1, 193(1)113, 194(1)241-3, 194(1)246, 194(1)247, 195(1)61, 197(1)139, 198(1)49, 227(1)153
closed, 138(1)67, 138(1)141, 141(1)133, 143(2)189, 154(2)379, 155(1)221, 155(1)265, 158(1)371, 160(1)145, 166(1)203, 172(1)209, 175(1)159, 177(2)287, 184(1)145, 194(1)219, 219(1)65, 228(1)77
completeness, 138(2)273, 139(1)27, 141(1)109, 143(1)149, 145(1)111, 146(1)243, 150(1)161, 151(1)3, 151(2)487, 152(1)139, 160(1)241, 163(1)99, 164(1)141, 167(1)95, 170(1)173, 173(1)183, 175(1)29, 177(1)217, 183(2)187, 183(2)253, 185(2)393, 190(1)41, 195(1)61, 197(1)242-1, 197(1)243-1, 197(1)245-1, 197(1)246-2, 215(1)349, 227(1)249
Conway, 177(1)217
equational, 137(2)237, 139(1)207, 139(1)275, 142(1)27, 142(2)229, 146(1)25, 146(1)199, 151(2)437, 152(1)1, 152(1)91, 152(2)269, 160(1)145, 160(1)185, 163(1)1, 165(1)133, 167(1)95, 170(1)407, 175(1)29, 177(2)351, 179(1)1, 179(1)273, 192(1)3, 195(1)61, 198(1)1, 209(1)163, 211(1)339
fixed, 138(2)273, 139(1)1, 142(2)257, 147(1)31, 148(1)33, 148(1)67, 150(1)57, 151(1)3, 154(2)203, 160(1)1, 160(1)87, 161(1)301, 172(1)265, 178(1)265, 179(1)1, 183(1)21, 187(1)49, 189(1)1, 193(1)53, 193(1)215, 195(1)61, 215(1)359, 217(2)301, 222(1)181
fixed-point, 146(1)311, 173(1)235, 179(1)1
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)85, 155(1)141, 157(1)53, 157(1)79, 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
functional, 139(1)131, 141(1)175, 142(1)59, 144(1)59, 146(1)69, 146(1)243, 149(1)129, 152(2)269, 154(1)41, 159(2)191, 160(1)145, 160(1)185, 160(1)217, 167(1)193, 168(1)155, 173(1)113, 175(1)29, 175(1)75, 175(1)93, 176(1)111, 176(1)175, 177(1)27, 178(1)1, 185(2)277, 187(1)147, 187(1)203, 189(1)221, 190(2)151, 192(2)201, 194(1)1, 194(1)240-1, 194(1)241-1, 194(1)241-2, 194(1)244-2, 194(1)245-2, 194(1)246-1, 198(1)177, 206(1)283, 228(1)5, 228(1)105
identity, 140(1)5, 177(1)217, 192(2)315
morphism, 137(2)177, 155(1)221, 160(1)217, 178(1)205, 180(1)81, 189(1)239, 194(1)243-2, 194(1)246, 195(1)91, 225(1)129
normal, 137(1)129, 139(1)243, 139(1)315, 146(1)185, 152(2)269, 152(2)285, 155(1)85, 157(1)53, 161(1)205, 170(1)383, 170(1)407, 171(1)111, 178(1)155, 185(2)379, 186(1)231, 190(1)41, 208(1)33
operation, 141(1)53, 143(1)51, 148(1)171, 149(1)179, 149(2)201, 154(2)165, 156(1)1, 157(2)215, 160(1)87, 161(1)301, 164(1)1, 165(2)391, 166(1)173, 167(1)131, 172(1)135, 173(1)151, 174(1)67, 175(1)183, 179(1)251, 180(1)17, 180(1)341, 181(2)379, 187(1)7, 190(2)363, 191(1)79, 191(1)117, 192(2)167, 192(2)201, 192(2)259, 194(1)242-2, 195(1)61, 196(1)347, 198(1)131, 200(1)1, 205(1)317, 207(1)73, 216(1)159
part, 147(1)165, 148(1)93, 160(1)145, 160(1)185, 166(1)1, 170(1)1, 203(2)205, 221(1)77
point, 138(1)201, 138(2)273, 139(1)1, 140(2)265, 143(2)319, 148(1)67, 150(1)57, 151(1)3, 151(1)29, 156(1)1, 159(2)143, 160(1)1, 163(1)291, 167(1)131, 174(1)203, 175(2)239, 179(1)1, 187(1)49, 187(1)105, 189(1)1, 192(2)167, 193(1)53, 195(1)61, 196(1)201, 217(2)301, 222(1)181
point, fixed-, 146(1)311, 173(1)235, 179(1)1
poset, 154(2)379, 175(2)293, 177(1)111, 192(2)259, 193(1)53