Web16 sep. 2002 · Hyman Bass and Ubiquity: Gorenstein Rings. C. Huneke. Published 16 September 2002. Mathematics. arXiv: Commutative Algebra. This paper is based on a talk given by the author in October, 1997 at a conference at Columbia University in celebration of Hyman Bass's 65th birthday. The paper details some of the history of Gorenstein rings … WebHis work on Gorenstein ring expands to the thematically related Pure mathematics. His Combinatorics study combines topics from a wide range of disciplines, such as Group theory, Polynomial, Group and Extension. His research integrates issues of Ring, Global field, Algebraic number field and Milnor K-theory in his study of Topology.
Hyman Bass and Ubiquity: Gorenstein Rings - CORE
Web16 sep. 2002 · Corpus ID: 17774581 Hyman Bass and Ubiquity: Gorenstein Rings C. Huneke Published 16 September 2002 Mathematics arXiv: Commutative Algebra This … WebTorsion in genus class groups; C. Huneke, Hyman Bass and ubiquity: Gorenstein rings; I. Kaplansky, A salute to Euler and Dickson on the occasion of Hy’s 65th birthday; T. Y. Lam, Bass’s work in ring theory and projective modules; A. Lubotzky, One for almost all: Generation of SL(n;p)by subsets of n;Z; inclisiran molecular weight
Regular local rings of dimension four and Gorenstein syzygetic …
Web1 mrt. 2015 · A famous paper by Hyman Bass [1] has the title: “On the ubiquity of Gorenstein rings”. The original starting point of our paper was to point out that a class of rings basically introduced by Dedekind, Noether and Grell has not – to our knowledge – been mentioned in the literature on Gorenstein rings. Web19 mei 2024 · Request PDF Regular local rings of dimension four and Gorenstein syzygetic prime ideals ... C. Huneke, Hyman Bass and ubiquity: Gorenstein rings. Algebra, K-theory, groups, and education ... In commutative algebra, a Gorenstein local ring is a commutative Noetherian local ring R with finite injective dimension as an R-module. There are many equivalent conditions, some of them listed below, often saying that a Gorenstein ring is self-dual in some sense. Gorenstein rings were introduced by Grothendieck in his 1961 seminar (published in (Hartshorne 1967)). The name comes from a duality property of singular plane curves studied by Gorenstein (… inc dayton ohio