Entry Paneitz:1985:IFD from lnm1985.bib

Last update: Sat Oct 14 02:53:33 MDT 2017

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{Paneitz:1985:IFD,
  author =       "Stephen M. Paneitz",
  title =        "Indecomposable finite dimensional representations of
                 the {Poincar{\'e}} group and associated fields",
  journal =      j-LECT-NOTES-MATH,
  volume =       "1139",
  pages =        "6--9",
  year =         "1985",
  CODEN =        "LNMAA2",
  DOI =          "https://doi.org/10.1007/BFb0074574",
  ISBN =         "3-540-15666-6 (print), 3-540-39585-7 (e-book)",
  ISBN-13 =      "978-3-540-15666-6 (print), 978-3-540-39585-0
                 (e-book)",
  ISSN =         "0075-8434 (print), 1617-9692 (electronic)",
  ISSN-L =       "0075-8434",
  MRclass =      "22E70 (81C40 81D25)",
  MRnumber =     "820466 (88e:22031)",
  MRreviewer =   "N. Backhouse",
  bibdate =      "Fri May 9 19:07:48 MDT 2014",
  bibsource =    "http://www.math.utah.edu/pub/tex/bib/lnm1985.bib",
  URL =          "http://link.springer.com/chapter/10.1007/BFb0074574/",
  acknowledgement = ack-nhfb,
  book-DOI =     "https://doi.org/10.1007/BFb0074572",
  book-URL =     "http://www.springerlink.com/content/978-3-540-39585-0",
  fjournal =     "Lecture Notes in Mathematics",
  journal-URL =  "http://link.springer.com/bookseries/304",
}

Related entries

22E70, 1214(0)21, 1251(0)1, 1410(0)108
81C40, 1165(0)52, 1396(0)182
81D25, 1165(0)136, 1251(0)205
associated, 1109(0)177, 1132(0)30, 1135(0)197, 1151(0)25, 1167(0)260, 1171(0)195, 1179(0)77, 1199(0)21, 1203(0)51, 1218(0)136, 1236(0)40, 1243(0)1, 1243(0)144, 1243(0)181, 1249(0)46, 1249(0)72, 1253(0)113, 1287(0)83, 1294(0)60, 1325(0)16, 1328(0)8, 1329(0)251, 1329(0)261, 1354(0)111, 1395(0)84, 1399(0)1, 1406(0)67, 1410(0)249, 1411(0)124
dimensional, 1139(0)136, 1139(0)253, 1156(0)154, 1164(0)1, 1166(0)106, 1167(0)47, 1172(0)116, 1177(0)341, 1200(0)9, 1200(0)19, 1200(0)60, 1200(0)106, 1208(0)73, 1209(0)243, 1212(0)59, 1236(0)239, 1247(0)246, 1250(0)1, 1250(0)14, 1251(0)265, 1255(0)26, 1267(0)96, 1267(0)122, 1267(0)177, 1273(0)35, 1273(0)265, 1277(0)242, 1296(0)158, 1316(0)130, 1317(0)232, 1346(0)7, 1346(0)13, 1352(0)114, 1353(0)43, 1357(0)116, 1376(0)64, 1376(0)138, 1379(0)125, 1391(0)200, 1410(0)27, 1411(0)15
field, 1109(0)32, 1125(0)15, 1132(0)117, 1135(0)101, 1135(0)254, 1136(0)74, 1136(0)143, 1139(0)25, 1142(0)5, 1155(0)21, 1156(0)154, 1158(0)1, 1158(0)81, 1175(0)1, 1197(0)60, 1205(0)z, 1212(0)124, 1212(0)258, 1214(0)1, 1214(0)196, 1240(0)214, 1240(0)259, 1250(0)106, 1250(0)288, 1255(0)209, 1259(0)1, 1263(0)1
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, 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, 1283(0)60, 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
indecomposable, 1177(0)340, 1178(0)143
Poincaré, 1139(0)169, 1146(0)127, 1183(0)170, 1183(0)195, 1197(0)90, 1217(0)58, 1246(0)115, 1251(0)222, 1318(0)1, 1318(0)155, 1342(0)154, 1350(0)241
representation, 1111(0)135, 1122(0)130, 1142(0)112, 1142(0)126, 1142(0)233, 1146(0)325, 1153(0)297, 1153(0)359, 1167(0)95, 1172(0)130, 1172(0)188, 1177(0)115, 1177(0)199, 1177(0)341, 1178(0)1, 1178(0)243, 1178(0)272, 1179(0)1, 1185(0)58, 1185(0)118, 1195(0)10, 1204(0)1, 1210(0)158, 1217(0)210, 1234(0)34, 1234(0)267, 1237(0)228, 1243(0)1, 1243(0)15, 1243(0)73, 1243(0)108, 1243(0)273, 1258(0)126, 1258(0)150