Entry Kinzelbach:1994:GCD from lnm1990.bib
Last update: Sat Oct 14 02:54:20 MDT 2017
Top |
Symbols |
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{Kinzelbach:1994:GCD,
author = "Martin Kinzelbach",
title = "{A}. {Geometrical} construction of $2$-dimensional
{Galois} representations of {$ A_5$}-type. {B}. {On}
the realisation of the groups {$ {\rm PSL}_2 (1)$} as
{Galois} groups over number fields by means of
$l$-torsion points of elliptic curves",
journal = j-LECT-NOTES-MATH,
volume = "1585",
pages = "47--58",
year = "1994",
CODEN = "LNMAA2",
DOI = "https://doi.org/10.1007/BFb0074109",
ISBN = "3-540-58387-4 (print), 3-540-48681-X (e-book)",
ISBN-13 = "978-3-540-58387-5 (print), 978-3-540-48681-7
(e-book)",
ISSN = "0075-8434 (print), 1617-9692 (electronic)",
ISSN-L = "0075-8434",
MRclass = "11R32 (11G05 12F12)",
MRnumber = "1322318 (96b:11148)",
MRreviewer = "John W. Jones",
bibdate = "Fri May 9 19:07:04 MDT 2014",
bibsource = "http://www.math.utah.edu/pub/tex/bib/lnm1990.bib",
URL = "http://link.springer.com/chapter/10.1007/BFb0074109/",
acknowledgement = ack-nhfb,
book-DOI = "https://doi.org/10.1007/BFb0074106",
book-URL = "http://www.springerlink.com/content/978-3-540-48681-7",
fjournal = "Lecture Notes in Mathematics",
journal-URL = "http://link.springer.com/bookseries/304",
}
Related entries
- $ A_5$,
1585(0)109
- $2$,
1420(0)111,
1424(0)81,
1425(0)40,
1425(0)71,
1425(0)133,
1440(0)96,
1440(0)122,
1447(0)261,
1470(0)159,
1479(0)39,
1480(0)28,
1497(0)194,
1509(0)115,
1510(0)176,
1510(0)259,
1585(0)1,
1585(0)109,
1620(0)120,
1623(0)53
- $l$,
1709(0)349
- 11G05,
1434(0)31,
1479(0)94,
1716(0)1,
1716(0)51,
1716(0)167
- 11R32,
1585(0)1,
1585(0)37,
1585(0)109
- 12F12,
1585(0)37
- construction,
1432(0)187,
1432(0)205,
1437(0)222,
1440(0)192,
1468(0)371,
1488(0)187,
1502(0)31,
1514(0)114,
1550(0)62,
1575(0)16,
1588(0)161,
1643(0)149,
1647(0)66,
1650(0)77,
1650(0)141,
1667(0)1,
1671(0)123,
1671(0)183,
1685(0)155,
1688(0)79,
1698(0)159,
1720(0)7
- curve,
1358(0)225,
1358(0)294,
1420(0)81,
1420(0)149,
1420(0)223,
1422(0)15,
1436(0)77,
1454(0)173,
1462(0)73,
1462(0)276,
1465(0)55,
1479(0)15,
1479(0)131,
1481(0)28,
1494(0)142,
1515(0)100,
1518(0)132,
1518(0)145,
1524(0)52,
1524(0)97,
1540(0)251,
1566(0)111,
1620(0)419,
1638(0)67,
1716(0)1,
1716(0)51,
1716(0)167
- dimensional,
1417(0)287,
1423(0)35,
1433(0)57,
1435(0)143,
1450(0)64,
1469(0)127,
1481(0)175,
1497(0)112,
1540(0)309,
1585(0)1,
1585(0)109,
1611(0)25,
1611(0)61,
1627(0)197,
1632(0)74,
1669(0)117,
1704(0)303,
1715(0)1,
1715(0)65
- elliptic,
1445(0)15,
1445(0)39,
1445(0)53,
1450(0)64,
1450(0)122,
1453(0)137,
1453(0)309,
1457(0)28,
1462(0)27,
1489(0)95,
1499(0)41,
1520(0)237,
1520(0)261,
1545(0)57,
1548(0)17,
1550(0)62,
1559(0)111,
1563(0)89,
1605(0)48,
1614(0)23,
1614(0)72,
1614(0)108,
1649(0)110,
1650(0)249,
1660(0)98,
1683(0)29,
1704(0)22,
1704(0)303,
1716(0)1,
1716(0)51,
1716(0)167,
1719(0)129
- field,
1419(0)150,
1420(0)128,
1427(0)113,
1434(0)196,
1450(0)157,
1450(0)226,
1451(0)49,
1451(0)163,
1452(0)178,
1454(0)351,
1455(0)187,
1455(0)334,
1455(0)369,
1455(0)385,
1480(0)165,
1486(0)141,
1493(0)151,
1500(0)64,
1510(0)210,
1518(0)26,
1518(0)122,
1518(0)145,
1520(0)157,
1530(0)291,
1532(0)144,
1534(0)77,
1534(0)97,
1550(0)149,
1554(0)1,
1554(0)11,
1554(0)50,
1554(0)95,
1554(0)103,
1566(0)111,
1585(0)37,
1588(0)68,
1588(0)96,
1620(0)120,
1632(0)74,
1636(0)5,
1640(0)1,
1648(0)1,
1674(0)59,
1674(0)62,
1696(0)61,
1696(0)129,
1696(0)143,
1696(0)177,
1705(0)73,
1712(0)43,
1712(0)189
- Galois,
5(0)81,
5(0)127,
1454(0)125,
1488(0)157,
1534(0)1,
1534(0)109,
1585(0)1,
1585(0)109,
1625(0)123,
1625(0)188,
1666(0)111,
1716(0)145
- Geometrical,
1451(0)95,
1667(0)156
- mean,
1434(0)103,
1435(0)27,
1481(0)108,
1481(0)138,
1494(0)68,
1530(0)291,
1660(0)98,
1713(0)211
- number,
1420(0)22,
1428(0)263,
1442(0)204,
1447(0)303,
1447(0)315,
1452(0)165,
1452(0)178,
1462(0)276,
1474(0)193,
1477(0)64,
1490(0)9,
1497(0)194,
1503(0)1,
1509(0)250,
1514(0)83,
1518(0)178,
1530(0)85,
1530(0)226,
1534(0)77,
1554(0)1,
1554(0)11,
1554(0)50,
1554(0)95,
1554(0)103,
1559(0)30,
1559(0)155,
1566(0)111,
1572(0)12,
1605(0)48,
1615(0)61,
1623(0)96,
1623(0)104,
1632(0)74,
1669(0)37,
1680(0)51,
1698(0)77
- point,
1417(0)111,
1422(0)37,
1422(0)101,
1431(0)23,
1432(0)245,
1450(0)1,
1452(0)1,
1452(0)139,
1453(0)201,
1453(0)227,
1457(0)154,
1486(0)159,
1490(0)21,
1490(0)86,
1490(0)118,
1493(0)14,
1493(0)168,
1504(0)1,
1511(0)120,
1513(0)47,
1514(0)229,
1518(0)145,
1518(0)178,
1520(0)157,
1524(0)140,
1524(0)163,
1526(0)81,
1537(0)143,
1557(0)33,
1557(0)177,
1558(0)9,
1558(0)85,
1558(0)101,
1558(0)119,
1558(0)149,
1560(0)8,
1566(0)111,
1595(0)13,
1595(0)52,
1647(0)10,
1658(0)73,
1658(0)119,
1661(0)1,
1688(0)15,
1716(0)145
- realisation,
1485(0)31
- representation,
1418(0)184,
1425(0)58,
1428(0)1,
1447(0)237,
1447(0)287,
1455(0)243,
1456(0)14,
1456(0)96,
1461(0)8,
1468(0)170,
1472(0)66,
1472(0)72,
1472(0)89,
1486(0)51,
1488(0)30,
1500(0)56,
1503(0)1,
1510(0)197,
1511(0)141,
1542(0)119,
1542(0)141,
1552(0)254,
1560(0)30,
1560(0)72,
1585(0)1,
1585(0)109,
1587(0)85,
1603(0)127,
1613(0)108,
1618(0)30,
1628(0)97,
1636(0)37,
1639(0)47,
1662(0)7,
1685(0)51,
1685(0)177,
1692(0)33,
1708(0)52,
1708(0)104,
1711(0)67,
1716(0)145
- torsion,
1474(0)295,
1553(0)1,
1622(0)135,
1662(0)94,
1683(0)137,
1716(0)145
- type,
1418(0)156,
1428(0)1,
1428(0)159,
1428(0)181,
1428(0)205,
1429(0)111,
1430(0)88,
1432(0)41,
1435(0)45,
1440(0)96,
1445(0)85,
1449(0)94,
1453(0)51,
1453(0)201,
1456(0)96,
1460(0)70,
1468(0)177,
1470(0)183,
1486(0)196,
1494(0)95,
1496(0)309,
1507(0)166,
1509(0)146,
1513(0)167,
1516(0)90,
1516(0)103,
1523(0)149,
1531(0)7,
1557(0)114,
1559(0)138,
1570(0)104,
1570(0)125,
1585(0)109,
1587(0)102,
1592(0)51,
1611(0)78,
1622(0)135,
1623(0)53,
1625(0)123,
1626(0)312,
1639(0)47,
1662(0)113,
1680(0)19,
1682(0)23,
1682(0)45,
1685(0)221