Entry Dranishnikov:1987:IDC from lnm1985.bib
Last update: Sat Oct 14 02:53:33 MDT 2017
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BibTeX entry
@Article{Dranishnikov:1987:IDC,
author = "A. N. Dranishnikov",
title = "Infinite-dimensional compacta with finite
cohomological dimension modulo $p$",
journal = j-LECT-NOTES-MATH,
volume = "1283",
pages = "60--64",
year = "1987",
CODEN = "LNMAA2",
DOI = "https://doi.org/10.1007/BFb0081419",
ISBN = "3-540-18443-0 (print), 3-540-47975-9 (e-book)",
ISBN-13 = "978-3-540-18443-0 (print), 978-3-540-47975-8
(e-book)",
ISSN = "0075-8434 (print), 1617-9692 (electronic)",
ISSN-L = "0075-8434",
MRclass = "54F45 (55M10 57N20)",
MRnumber = "922272 (89g:54085)",
MRreviewer = "John J. Walsh",
bibdate = "Thu May 15 18:46:23 MDT 2014",
bibsource = "http://www.math.utah.edu/pub/tex/bib/lnm1985.bib",
URL = "http://link.springer.com/chapter/10.1007/BFb0081419/",
acknowledgement = ack-nhfb,
book-DOI = "https://doi.org/10.1007/BFb0081412",
book-URL = "http://www.springerlink.com/content/978-3-540-47975-8",
fjournal = "Lecture Notes in Mathematics",
journal-URL = "http://link.springer.com/bookseries/304",
}
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- $p$,
1153(0)369,
1178(0)177,
1185(0)314,
1351(0)146,
1359(0)100,
1361(0)253,
1380(0)254,
1391(0)74,
1391(0)191
- 54F45,
1376(0)1
- cohomological,
1243(0)262,
1318(0)228
- compacta,
1283(0)48,
1283(0)88
- dimension,
1111(0)59,
1123(0)130,
1125(0)99,
1135(0)1,
1153(0)359,
1158(0)201,
1166(0)106,
1167(0)268,
1177(0)135,
1178(0)94,
1188(0)229,
1217(0)196,
1220(0)15,
1236(0)131,
1250(0)298,
1256(0)28,
1267(0)168,
1281(0)31,
1285(0)143,
1296(0)228,
1296(0)247,
1316(0)170,
1317(0)132,
1320(0)251,
1324(0)186,
1331(0)47,
1331(0)86,
1331(0)150,
1331(0)196,
1342(0)220,
1345(0)192,
1350(0)109,
1350(0)144,
1350(0)188,
1358(0)56,
1359(0)199,
1375(0)48,
1376(0)1,
1390(0)147,
1394(0)83,
1398(0)86,
1399(0)40
- Dranishnikov, A. N.,
1283(0)48
- finite,
1121(0)1,
1121(0)85,
1121(0)258,
1121(0)278,
1122(0)130,
1126(0)1,
1127(0)1,
1128(0)164,
1129(0)94,
1135(0)254,
1136(0)1,
1139(0)6,
1142(0)1,
1146(0)325,
1149(0)167,
1149(0)175,
1155(0)131,
1159(0)242,
1164(0)1,
1166(0)106,
1177(0)13,
1177(0)181,
1177(0)341,
1178(0)1,
1178(0)109,
1178(0)129,
1178(0)152,
1178(0)243,
1181(0)1,
1181(0)218,
1181(0)249,
1182(0)272,
1185(0)1,
1185(0)58,
1185(0)210,
1192(0)291,
1192(0)321,
1192(0)327,
1192(0)339,
1192(0)345,
1192(0)353,
1195(0)28,
1198(0)163,
1200(0)9,
1200(0)60,
1200(0)106,
1208(0)73,
1209(0)73,
1217(0)26,
1228(0)1,
1230(0)63,
1230(0)167,
1234(0)160,
1240(0)259,
1266(0)24,
1267(0)96,
1267(0)177,
1270(0)64,
1271(0)201,
1273(0)9,
1273(0)35,
1273(0)265,
1281(0)36,
1281(0)85,
1296(0)158,
1317(0)232,
1320(0)18,
1320(0)218,
1328(0)38,
1329(0)300,
1331(0)161,
1340(0)115,
1342(0)180,
1342(0)329,
1350(0)213,
1350(0)259,
1352(0)114,
1352(0)206,
1357(0)142,
1358(0)168,
1361(0)1,
1369(0)275,
1370(0)15,
1375(0)16,
1376(0)138,
1383(0)186,
1388(0)178,
1390(0)197,
1398(0)65,
1398(0)106,
1410(0)60
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1220(0)33,
1271(0)109,
1277(0)242
- modulo,
1177(0)232,
1262(0)22
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1283(0)48,
1283(0)88