Entry Dajczer:1985:ECN from lnm1985.bib
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BibTeX entry
@Article{Dajczer:1985:ECN,
author = "Marcos Dajczer and Peter Dombrowski",
title = "Examples of $1$-codimensional non totally geodesic
isometric immersions of pseudo-{Riemannian} space forms
with the same positive constant curvature and the same
space-like rank",
journal = j-LECT-NOTES-MATH,
volume = "1156",
pages = "59--73",
year = "1985",
CODEN = "LNMAA2",
DOI = "https://doi.org/10.1007/BFb0075086",
ISBN = "3-540-15994-0 (print), 3-540-39698-5 (e-book)",
ISBN-13 = "978-3-540-15994-0 (print), 978-3-540-39698-7
(e-book)",
ISSN = "0075-8434 (print), 1617-9692 (electronic)",
ISSN-L = "0075-8434",
MRclass = "53C50 (53C42)",
MRnumber = "824062 (87d:53117)",
MRreviewer = "Larry Graves",
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/BFb0075086/",
acknowledgement = ack-nhfb,
book-DOI = "https://doi.org/10.1007/BFb0075080",
book-URL = "http://www.springerlink.com/content/978-3-540-39698-7",
fjournal = "Lecture Notes in Mathematics",
journal-URL = "http://link.springer.com/bookseries/304",
}
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1123(0)130,
1194(0)56,
1231(0)24,
1247(0)246,
1262(0)22,
1262(0)124,
1318(0)124,
1342(0)251,
1346(0)7,
1369(0)152,
1380(0)185,
1389(0)261
- 53C42,
1156(0)46,
1156(0)227,
1156(0)264,
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1255(0)1,
1255(0)53,
1263(0)55
- 53C50,
1156(0)1,
1156(0)30,
1156(0)264,
1402(0)128
- constant,
1136(0)1,
1151(0)142,
1158(0)81,
1166(0)15,
1169(0)91,
1201(0)33,
1240(0)230,
1241(0)10,
1250(0)31,
1255(0)160,
1283(0)65,
1285(0)150,
1351(0)93,
1369(0)49,
1369(0)176,
1376(0)202,
1410(0)128
- curvature,
1111(0)261,
1139(0)152,
1156(0)74,
1156(0)86,
1194(0)90,
1195(0)28,
1201(0)1,
1201(0)33,
1201(0)41,
1201(0)89,
1201(0)180,
1201(0)202,
1201(0)212,
1240(0)230,
1255(0)88,
1255(0)160,
1339(0)158,
1340(0)115,
1357(0)116,
1365(0)120,
1369(0)49,
1369(0)63,
1369(0)176,
1410(0)77,
1410(0)128,
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- example,
1126(0)159,
1133(0)345,
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1156(0)219,
1156(0)254,
1162(0)45,
1183(0)128,
1186(0)216,
1189(0)229,
1195(0)10,
1195(0)51,
1196(0)35,
1196(0)80,
1209(0)133,
1210(0)68,
1249(0)2,
1271(0)33,
1281(0)9,
1281(0)151,
1287(0)70,
1300(0)1,
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1324(0)186,
1330(0)44,
1332(0)64,
1347(0)50,
1375(0)145,
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1409(0)106,
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- form,
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1111(0)309,
1122(0)163,
1139(0)74,
1139(0)152,
1143(0)71,
1146(0)325,
1154(0)1,
1154(0)41,
1155(0)60,
1156(0)30,
1156(0)46,
1160(0)19,
1160(0)46,
1163(0)170,
1193(0)53,
1201(0)138,
1211(0)92,
1219(0)7,
1219(0)45,
1231(0)78,
1233(0)11,
1240(0)101,
1240(0)135,
1240(0)275,
1242(0)43,
1250(0)87,
1251(0)238,
1255(0)13,
1255(0)73,
1255(0)228
- geodesic,
1158(0)216,
1167(0)125,
1172(0)157,
1209(0)235,
1277(0)35,
1339(0)142,
1342(0)112
- immersion,
1156(0)30,
1156(0)46,
1156(0)264,
1157(0)47,
1167(0)81,
1201(0)230,
1350(0)144,
1350(0)171,
1350(0)188,
1366(0)70,
1366(0)87,
1366(0)101,
1366(0)116,
1366(0)181,
1366(0)188,
1369(0)71,
1369(0)152,
1369(0)164,
1370(0)57
- isometric,
1156(0)264
- non,
1109(0)189,
1111(0)3,
1111(0)261,
1121(0)123,
1136(0)136,
1146(0)106,
1146(0)270,
1182(0)135,
1198(0)98,
1198(0)146,
1204(0)313,
1204(0)317,
1209(0)37,
1236(0)1,
1270(0)210,
1291(0)99,
1292(0)419,
1296(0)276,
1322(0)134,
1324(0)85,
1340(0)201,
1342(0)329,
1396(0)99,
1402(0)114,
1410(0)27
- positive,
1111(0)261,
1136(0)177,
1144(0)146,
1146(0)317,
1184(0)122,
1184(0)163,
1184(0)204,
1184(0)233,
1184(0)247,
1184(0)292,
1184(0)333,
1184(0)376,
1184(0)379,
1184(0)400,
1186(0)258,
1201(0)202,
1209(0)143,
1233(0)69
- pseudo-{Riemannian},
1156(0)30,
1156(0)264
- rank,
1179(0)99,
1181(0)242,
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1217(0)1,
1231(0)24,
1243(0)15,
1244(0)5,
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1266(0)1,
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- totally,
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- {Riemannian}, pseudo-,
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