000 02338nam a22004695i 4500
001 978-3-540-39680-2
003 DE-He213
005 20160624101816.0
007 cr nn 008mamaa
008 150519s2003 gw | s |||| 0|eng d
020 _a9783540396802
_9978-3-540-39680-2
024 7 _a10.1007/b93836
_2doi
050 4 _aQA174-183
072 7 _aPBG
_2bicssc
072 7 _aMAT002010
_2bisacsh
082 0 4 _a512.2
_223
245 1 0 _aGröbner Bases and the Computation of Group Cohomology
_h[electronic resource].
260 1 _aBerlin, Heidelberg :
_bSpringer Berlin Heidelberg,
_c2003.
264 1 _aBerlin, Heidelberg :
_bSpringer Berlin Heidelberg,
_c2003.
300 _aXII, 144 p.
_bonline resource.
336 _atext
_btxt
_2rdacontent
337 _acomputer
_bc
_2rdamedia
338 _aonline resource
_bcr
_2rdacarrier
347 _atext file
_bPDF
_2rda
490 1 _aLecture Notes in Mathematics,
_x0075-8434 ;
_v1828
505 0 _aIntroduction -- Part I Constructing minimal resolutions: Bases for finite-dimensional algebras and modules; The Buchberger Algorithm for modules; Constructing minimal resolutions -- Part II Cohomology ring structure: Gröbner bases for graded commutative algebras; The visible ring structure; The completeness of the presentation -- Part III Experimental results: Experimental results -- A. Sample cohomology calculations -- Epilogue -- References -- Index.
520 _aThis monograph develops the Gröbner basis methods needed to perform efficient state of the art calculations in the cohomology of finite groups. Results obtained include the first counterexample to the conjecture that the ideal of essential classes squares to zero. The context is J. F. Carlson’s minimal resolutions approach to cohomology computations.
650 0 _aMathematics.
650 0 _aAlgebra.
650 0 _aGroup theory.
650 1 4 _aMathematics.
650 2 4 _aGroup Theory and Generalizations.
650 2 4 _aAssociative Rings and Algebras.
710 2 _aSpringerLink (Online service)
773 0 _tSpringer eBooks
776 0 8 _iPrinted edition:
_z9783540203391
786 _dSpringer
830 0 _aLecture Notes in Mathematics,
_x0075-8434 ;
_v1828
856 4 0 _uhttp://dx.doi.org/10.1007/b93836
942 _2EBK1152
_cEBK
999 _c30446
_d30446