| Record ID | marc_columbia/Columbia-extract-20221130-007.mrc:215799025:1944 |
| Source | marc_columbia |
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LEADER: 01944mam a2200337 a 4500
001 3186194
005 20221020003840.0
008 010523t20022002maua b 001 0 eng
010 $a 2001036049
020 $a1568811195
035 $a(OCoLC)ocm47056375
035 $9AUD0746CU
035 $a3186194
040 $aDLC$cDLC$dC#P$dOrLoB-B
050 00 $aQA247$b.S76 2002
082 00 $a512/.74$221
100 1 $aStewart, Ian,$d1945-$0http://id.loc.gov/authorities/names/n50023086
245 10 $aAlgebraic number theory and Fermat's last theorem /$cIan Stewart, David Tall.
250 $a3rd ed.
260 $aNatick, Mass. :$bAK Peters,$c[2002], ©2002.
300 $axix, 313 pages :$billustrations ;$c24 cm
336 $atext$btxt$2rdacontent
337 $aunmediated$bn$2rdamedia
500 $aRev. ed. of: Algebraic number theory. 2nd. 1987.
504 $aIncludes bibliographical references (p. 303-308) and index.
505 00 $tThe Origins of Algebraic Number Theory --$gI.$tAlgebraic Methods.$g1.$tAlgebraic Background.$g2.$tAlgebraic Numbers.$g3.$tQuadratic and Cyclotomic Fields.$g4.$tFactorization into Irreducibles.$g5.$tIdeals --$gII.$tGeometric Methods.$g6.$tLattices.$g7.$tMinkowski's Theorem.$g8.$tGeometric Representation of Algebraic Numbers.$g9.$tClass-Group and Class-Number --$gIII.$tNumber-Theoretic Applications.$g10.$tComputational Methods.$g11.$tKummer's Special Case of Fermat's Last Theorem.$g12.$tThe Path to the Final Breakthrough.$g13.$tElliptic Curves.$g14.$tElliptic Functions --$gIV.$tAppendices --$gA.$tQuadratic Residues --$gB.$tDirichlet's Units Theorem.
650 0 $aAlgebraic number theory.$0http://id.loc.gov/authorities/subjects/sh85003436
650 0 $aFermat's last theorem.$0http://id.loc.gov/authorities/subjects/sh85047827
700 1 $aTall, David Orme.$0http://id.loc.gov/authorities/names/n81042680
700 1 $aStewart, Ian,$d1945-$tAlgebraic number theory.
852 00 $bmat$hQA247$i.S76 2002