Entry Kinzelbach:1994:GCD from lnm1990.bib

Last update: Sat Oct 14 02:54:20 MDT 2017

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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