On reducing homological dimensions over Noetherian rings

AbstractGroup algebras of symmetric groups and their Hecke algebras are in Schur-Weyl duality with classical and quantised Schur algebras, respectively. Two homological dimensions, the dominant dimension and the global dimension, of the indecomposable summands (blocks) of these Schur algebras S(n, r) and $$S_q(n,r)$$ S q ( n , r ) with $$n \geqslant r$$ n ⩾ r are determined explicitly, using a result on derived invariance in Fang, Hu and Koenig (J Reine Angew Math 770:59–85, 2021).

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The converse to a well known theorem on Noetherian rings

Mathematische Annalen ◽

10.1007/bf01350720 ◽

1968 ◽

Vol 177 (4) ◽

pp. 278-282 ◽

Cited By ~ 52

Author(s):

Paul M. Eakin

Keyword(s):

Noetherian Rings

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Indecomposable modules over one-dimensional Noetherian rings

Journal of Pure and Applied Algebra ◽

10.1016/j.jpaa.2006.03.007 ◽

2007 ◽

Vol 208 (2) ◽

pp. 739-760 ◽

Cited By ~ 4

Author(s):

Meral Arnavut ◽

Melissa Luckas ◽

Sylvia Wiegand

Keyword(s):

Noetherian Rings ◽

Indecomposable Modules ◽

One Dimensional

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A note on Noetherian orders in Artinian rings

Glasgow Mathematical Journal ◽

10.1017/s0017089500003827 ◽

1979 ◽

Vol 20 (2) ◽

pp. 125-128 ◽

Cited By ~ 5

Author(s):

A. W. Chatters

Keyword(s):

Noetherian Ring ◽

Quotient Ring ◽

Triangular Matrix ◽

Idempotent Element ◽

Noetherian Rings ◽

Central Idempotent ◽

Matrix Rings ◽

Regular Elements ◽

Zero Divisors ◽

Left And Right

Throughout this note, rings are associative with identity element but are not necessarily commutative. Let R be a left and right Noetherian ring which has an Artinian (classical) quotient ring. It was shown by S. M. Ginn and P. B. Moss [2, Theorem 10] that there is a central idempotent element e of R such that eR is the largest Artinian ideal of R. We shall extend this result, using a different method of proof, to show that the idempotent e is also related to the socle of R/N (where N, throughout, denotes the largest nilpotent ideal of R) and to the intersection of all the principal right (or left) ideals of R generated by regular elements (i.e. by elements which are not zero-divisors). There are many examples of left and right Noetherian rings with Artinian quotient rings, e.g. commutative Noetherian rings in which all the associated primes of zero are minimal together with full or triangular matrix rings over such rings. It was shown by L. W. Small that if R is any left and right Noetherian ring then R has an Artinian quotient ring if and only if the regular elements of R are precisely the elements c of R such that c + N is a regular element of R/N (for further details and examples see [5] and [6]). By the largest Artinian ideal of R we mean the sum of all the Artinian right ideals of R, and it was shown by T. H. Lenagan in [3] that this coincides in any left and right Noetherian ring R with the sum of all the Artinian left ideals of R.

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Equivariant K -Theory for Noetherian Rings

Journal of the London Mathematical Society ◽

10.1112/jlms/s2-39.3.414 ◽

1989 ◽

Vol s2-39 (3) ◽

pp. 414-426 ◽

Cited By ~ 4

Author(s):

Timothy J. Hodges

Keyword(s):

Noetherian Rings ◽

K Theory

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Some results concerning the local analytic branches of an algebraic variety

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100028541 ◽

1953 ◽

Vol 49 (3) ◽

pp. 386-396 ◽

Cited By ~ 1

Author(s):

D. G. Northcott

Keyword(s):

Algebraic Geometry ◽

Power Series ◽

Algebraic Variety ◽

Recent Progress ◽

Rapid Development ◽

Noetherian Rings ◽

Local Rings ◽

Power Series Rings ◽

Analytic Algebra ◽

Topological Theories

The recent progress of modern algebra in analysing, from the algebraic standpoint, the foundations of algebraic geometry, has been marked by the rapid development of what may be called ‘analytic algebra’. By this we mean the topological theories of Noetherian rings that arise when one uses ideals to define neighbourhoods; this includes, for instance, the theory of power-series rings and of local rings. In the present paper some applications are made of this kind of algebra to some problems connected with the notion of a branch of a variety at a point.

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On Ramification Theory in Noetherian Rings

American Journal of Mathematics ◽

10.2307/2372926 ◽

1959 ◽

Vol 81 (3) ◽

pp. 749 ◽

Cited By ~ 38

Author(s):

M. Auslander ◽

D. A. Buchsbaum

Keyword(s):

Noetherian Rings ◽

Ramification Theory

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