Entry Pierce:1997:HOS from tcs1995.bib

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

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BibTeX entry

@Article{Pierce:1997:HOS,
  author =       "Benjamin Pierce and Martin Steffen",
  title =        "Higher-order subtyping",
  journal =      j-THEOR-COMP-SCI,
  volume =       "176",
  number =       "1--2",
  pages =        "235--282",
  day =          "20",
  month =        apr,
  year =         "1997",
  CODEN =        "TCSCDI",
  ISSN =         "0304-3975 (print), 1879-2294 (electronic)",
  ISSN-L =       "0304-3975",
  bibdate =      "Mon Jul 19 22:20:48 MDT 1999",
  bibsource =    "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1997&volume=176&issue=1-2;
                 http://www.math.utah.edu/pub/tex/bib/tcs1995.bib",
  note =         "See corrigendum \cite{Pierce:1997:CHO}.",
  URL =          "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_sub/browse/browse.cgi?year=1997&volume=176&issue=1-2&aid=2299",
  acknowledgement = ack-nhfb,
  classification = "C4210L (Formal languages and computational
                 linguistics); C4240 (Programming and algorithm theory);
                 C6110F (Formal methods)",
  corpsource =   "Comput. Lab., Cambridge Univ., UK",
  fjournal =     "Theoretical Computer Science",
  journal-URL =  "http://www.sciencedirect.com/science/journal/03043975/",
  keywords =     "algorithm termination; beta conversion; cut rule;
                 decidability; fundamental metatheory; higher order
                 polymorphic lambda calculus; higher order subtyping;
                 Kernel Fun Variant of System $F_\le$; Kernel Fun
                 Variant of System F/sub &lt;or=/; lambda calculus;
                 orthogonal combination; program verification; subtype
                 relation; subtyping; system $F_\le^\omega$; system
                 F/sub &lt;or=//sup omega /; type theory; typechecking;
                 well kinded types",
  pubcountry =   "Netherlands",
  treatment =    "T Theoretical or Mathematical",
}

Related entries

/, 155(1)267, 174(1)259
beta, 137(2)219, 160(1)145, 160(1)185, 170(1)83, 175(1)159
C6110F, 138(1)3, 138(1)169, 138(1)211, 139(1)27, 139(1)275, 140(1)73, 140(1)95, 140(1)179, 142(1)3, 150(1)111, 150(1)161, 152(1)67, 152(1)91, 152(1)139, 152(2)269, 156(1)177, 159(2)245, 165(1)3, 166(1)263, 167(1)3, 167(1)47, 167(1)193, 169(1)39, 170(1)47, 170(1)245, 173(1)49, 173(2)393, 173(2)445, 173(2)513, 177(2)425, 177(2)459, 177(2)487, 179(1)273, 179(1)397, 180(1)309, 181(1)195, 183(2)157, 183(2)215, 183(2)253, 184(1)145, 185(2)393, 186(1)43, 186(1)135, 189(1)179, 189(1)239, 190(2)115, 192(1)31, 193(1)197, 194(1)243, 194(1)243, 194(1)245-1
combination, 137(1)159, 142(2)229, 151(2)487, 192(1)107, 209(1)261
conversion, 137(2)237, 187(1)179, 212(1)247
corrigendum, 135(1)67, 184(1)247, 202(1)1, 206(1)353, 212(1)261, 218(1)95, 254(1)691, 266(1)997
cut, 157(2)215, 160(1)241, 177(1)155, 181(2)267
decidability, 138(1)3, 139(1)1, 139(1)27, 141(1)253, 145(1)111, 146(1)243, 147(1)149, 147(1)165, 148(2)227, 148(2)281, 150(1)1, 154(1)23, 154(1)107, 155(2)321, 155(2)447, 156(1)119, 157(1)115, 158(1)161, 160(1)145, 160(1)185, 161(1)93, 161(1)141, 161(1)191, 164(1)29, 164(1)123, 164(1)141, 164(1)223, 165(2)247, 166(1)1, 166(1)173, 166(1)291, 167(1)171, 168(2)241, 168(2)z, 170(1)1, 170(1)445, 172(1)67, 172(1)309, 174(1)217, 174(1)269, 175(1)15, 175(1)127, 175(1)z, 176(1)67, 176(1)111, 176(1)175, 179(1)301, 180(1)61, 180(1)203, 183(1)83, 183(2)215, 186(1)231, 193(1)149, 193(1)181, 193(1)197, 194(1)87, 194(1)219, 195(1)33, 195(2)113, 197(1)79, 197(1)245, 198(1)1, 215(1)169, 216(1)363
Fun, 193(1)75
fundamental, 141(1)1, 172(1)1
higher, 183(2)157, 194(1)246
higher-order, 139(1)207, 150(1)111, 159(2)191, 165(1)201, 167(1)3, 167(1)193, 170(1)173, 173(2)349, 183(2)157, 184(1)247, 192(1)3, 194(1)246, 196(1)71, 198(1)49, 208(1)33, 227(1)333, 228(1)105
kernel, 145(1)111, 173(2)393, 189(1)71, 193(1)75
lambda, 137(1)3, 139(1)131, 140(1)5, 142(2)277, 142(2)299, 146(1)5, 146(1)69, 151(2)297, 151(2)353, 151(2)385, 155(1)85, 155(1)221, 155(1)265, 155(1)267, 159(2)191, 160(1)145, 160(1)185, 165(1)201, 166(1)83, 169(1)3, 169(1)81, 169(2)201, 170(1)83, 170(1)173, 170(1)407, 173(2)349, 175(1)3, 175(1)75, 175(1)93, 175(1)159, 175(1)z, 176(1)337, 179(1)137, 180(1)371, 189(1)221, 192(1)3, 192(2)201, 193(1)75, 193(1)181, 194(1)244-3, 194(1)245-2, 197(1)242, 197(1)242-2, 198(1)49, 198(1)177, 198(1)239, 212(1)101, 212(1)261, 228(1)175, 266(1)997
omega, 151(1)29, 155(1)267, 166(1)203, 175(1)159, 191(1)79, 193(1)181, 197(1)1
order, 138(2)273, 142(1)89, 143(1)73, 144(1)101, 145(1)271, 147(1)149, 151(1)207, 151(1)z, 154(2)165, 154(2)379, 156(1)119, 160(1)87, 160(1)241, 160(1)271, 160(1)305, 162(2)351, 163(1)117, 163(1)269, 168(1)155, 170(1)145, 174(1)67, 175(1)3, 175(1)127, 175(2)225, 175(2)283, 175(2)337, 175(2)349, 175(2)373, 175(2)393, 176(1)67, 177(1)59, 177(1)217, 179(1)137, 179(1)217, 179(1)421, 180(1)17, 183(2)157, 183(2)187, 184(1)61, 185(2)277, 187(1)7, 187(1)27, 190(2)317, 194(1)245, 194(1)246, 200(1)205, 204(1)131, 212(1)211, 225(1)177
order, Higher-, 192(1)3
orthogonal, 152(2)285, 155(2)321, 159(1)129, 165(1)75, 175(1)93, 175(1)159, 185(1)177, 194(1)244-2
Pierce, Benjamin, 184(1)247, 193(1)75
Pierce:1997:CHO, 184(1)247
Pierce:1997:HOS, 184(1)247
polymorphic, 155(1)179, 173(2)349, 196(1)71, 199(1)57, 212(1)157
relation, 137(2)237, 138(2)391, 139(1)275, 139(1)315, 140(1)139, 141(1)311, 143(2)251, 143(2)269, 147(1)165, 147(1)181, 148(2)227, 149(1)3, 149(1)129, 149(1)179, 149(2)201, 149(2)299, 149(2)333, 150(1)77, 150(1)161, 151(2)437, 152(2)171, 152(2)269, 152(2)285, 155(1)85, 156(1)281, 159(2)191, 159(2)245, 159(2)355, 160(1)1, 160(1)305, 162(1)5, 162(1)45, 165(1)3, 167(1)171, 168(1)155, 171(1)281, 172(1)135, 172(1)309, 173(2)513, 174(1)67, 174(1)97, 175(2)373, 176(1)283, 177(1)183, 179(1)103, 179(1)273, 180(1)1, 181(1)45, 184(1)105, 186(1)83, 186(1)157, 187(1)203, 188(1)211, 193(1)129, 195(2)183, 198(1)159, 206(1)283, 207(1)105, 209(1)237, 209(1)287, 215(1)263
rule, 135(1)67, 138(1)113, 138(1)169, 142(1)3, 142(2)257, 144(1)221, 146(1)25, 146(1)69, 146(1)199, 150(1)161, 152(2)219, 152(2)285, 154(2)329, 155(2)425, 159(2)143, 160(1)283, 162(2)297, 163(1)99, 164(1)185, 165(2)463, 167(1)95, 169(2)201, 170(1)129, 170(1)209, 171(1)111, 173(1)209, 173(2)349, 175(1)75, 175(1)159, 175(2)293, 176(1)67, 178(1)77, 183(2)229, 183(2)253, 190(2)241, 192(1)77, 192(2)287, 194(1)240, 194(1)240-2, 194(1)242-1, 197(1)243, 198(1)49, 201(1)171
See, 127(2)287, 134(1)51, 135(1)67, 141(1)329, 155(2)447, 169(1)113, 174(1)203, 182(1)257, 184(1)247, 202(1)1, 206(1)353, 212(1)261, 218(1)95, 234(1)323, 254(1)691, 266(1)997, 411(31)2999
Steffen, Martin, 184(1)247
subtype, 139(1)131, 212(1)3
subtyping, 184(1)247
termination, 139(1)355, 142(2)179, 142(2)257, 149(2)361, 151(2)487, 152(1)139, 165(1)97, 174(1)193, 175(1)127, 175(1)159, 177(2)407, 190(1)3, 192(1)31, 212(1)247
variant, 193(1)75
verification, 138(1)169, 138(2)391, 139(1)27, 139(1)275, 140(1)95, 141(1)283, 142(2)179, 142(2)257, 149(2)361, 150(1)161, 151(1)125, 151(2)487, 152(1)139, 153(1)95, 156(1)177, 165(1)3, 165(1)57, 165(1)97, 166(1)1, 166(1)173, 167(1)193, 168(1)53, 169(1)81, 170(1)47, 170(1)245, 173(1)49, 174(1)217, 176(1)111, 177(1)183, 177(2)407, 177(2)425, 177(2)459, 178(1)237, 179(1)353, 179(1)397, 180(1)17, 180(1)309, 183(2)215, 183(2)253, 185(2)393, 186(1)135, 189(1)229, 192(1)31, 195(2)259, 216(1)213, 220(2)377
well, 165(2)483, 166(1)221, 176(1)39, 204(1)131