<--- Back to Details
First PageDocument Content
Homological conjectures in commutative algebra / Cohen–Macaulay ring / Monomial conjecture / Integrally closed domain / Regular sequence / D-module / Stanley–Reisner ring / Abstract algebra / Commutative algebra / Algebra
Date: 2005-07-21 04:17:14
Homological conjectures in commutative algebra
Cohen–Macaulay ring
Monomial conjecture
Integrally closed domain
Regular sequence
D-module
Stanley–Reisner ring
Abstract algebra
Commutative algebra
Algebra

Add to Reading List

Source URL: www5a.biglobe.ne.jp

Download Document from Source Website

File Size: 59,49 KB

Share Document on Facebook

Similar Documents

LOCAL RINGS OF COUNTABLE COHEN-MACAULAY TYPE arXiv:math.ACv1 6 May 2002 CRAIG HUNEKE AND GRAHAM J. LEUSCHKE Abstract. We prove (the excellent case of) Schreyer’s conjecture that a local ring with countable

DocID: 1lYOQ - View Document

LARGE INDECOMPOSABLE MCM MODULES Graham Leuschke and Roger Wiegand August 21, 2008 Theorem. Let (S, n) be a Cohen-Macaulay local ring of dimension at least two, and let Z be an indeterminate. Then R := S[Z]/(Z 2 ) has u

DocID: 1l3zJ - View Document

LOCAL RINGS OF BOUNDED COHEN–MACAULAY TYPE arXiv:math.ACv2 22 Apr 2003 GRAHAM J. LEUSCHKE AND ROGER WIEGAND Abstract. Let (R, m, k) be a local Cohen–Macaulay (CM) ring of dimension one. It is

DocID: 1kVH2 - View Document

Finite, Countable, and Bounded CM type Graham Leuschke, 9 April 03 Notation: (R, m, k) is a complete local ring (graded if time allows at the end) Usually k = C. Always Cohen–Macaulay (depth R = dim R)

DocID: 1kQfr - View Document

Bibliography [1] Y. Aoyama and S. Goto, On the endomorphism ring of the canonical module, J. Math. Kyoto Univ. 25, (–M. Auslander and R. O. Buchweitz, The homological theory of Cohen-Macaulay approximat

DocID: 1cyEt - View Document