Polynomial Invariants of Finite GroupsCambridge University Press, 7 oct 1993 - 118 páginas This is the first book to deal with invariant theory and the representations of finite groups. |
Índice
II | 1 |
III | 3 |
IV | 5 |
VI | 9 |
VII | 10 |
VIII | 13 |
IX | 15 |
X | 18 |
XXVII | 50 |
XXVIII | 52 |
XXIX | 55 |
XXX | 59 |
XXXI | 61 |
XXXII | 62 |
XXXIII | 63 |
XXXIV | 64 |
XI | 20 |
XII | 21 |
XIII | 23 |
XIV | 25 |
XV | 27 |
XVI | 30 |
XVII | 31 |
XVIII | 32 |
XIX | 33 |
XX | 34 |
XXI | 37 |
XXII | 39 |
XXIII | 40 |
XXIV | 42 |
XXV | 43 |
XXVI | 45 |
XXXV | 69 |
XXXVI | 70 |
XXXVII | 73 |
XXXVIII | 74 |
XXXIX | 79 |
XLI | 82 |
XLII | 86 |
XLIII | 89 |
XLIV | 91 |
XLV | 92 |
XLVI | 99 |
XLVII | 103 |
XLVIII | 109 |
116 | |
Términos y frases comunes
abelian group annihilator associated prime characteristic zero choose coefficient Cohen-Macaulay commutative ring complex contained coprime Corollary DB/A dim(A dim(M direct sum divisors eigenvalues elements of degree elements of positive equal equation Ext¼(M field of fractions finite dimensional finite extension finite group finitely generated A-module finitely generated graded fractional ideal free module graded A-module graded Gorenstein graded ring group G height one prime hence Hilbert's homogeneous elements homomorphism induction integral domain integrally closed invariant theory Invariants of finite isomorphism K-algebra Krull dimension Lemma linear linearly reductive M₁ Math matrix maximal ideal multiplication non-zero element normal domain Poincaré series polynomial ring polynomial subring positive degree prime ideal Proposition prove pseudoreflections reflection groups reflexive regular local ring regular sequence representation ring of invariants Section short exact sequence subgroup submodule Suppose surjective syzygy theorem torsion-free unique factorization domain vector space