In abstract algebra, the weak dimension of a nonzero right moduleM over a ringR is the largest number n such that the Tor group is nonzero for some left R-module N (or infinity if no largest such n exists), and the weak dimension of a left R-module is defined similarly. The weak dimension was introduced by Henri Cartan and Samuel Eilenberg (1956, p.122). The weak dimension is sometimes called the flat dimension as it is the shortest length of the resolution of the module by flat modules. The weak dimension of a module is, at most, equal to its projective dimension.
The weak global dimension of a ring is the largest number n such that is nonzero for some right R-module M and left R-module N. If there is no such largest number n, the weak global dimension is defined to be infinite. It is at most equal to the left or right global dimension of the ring R.
Examplesedit
The module of rational numbers over the ring of integers has weak dimension 0, but projective dimension 1.
A product of infinitely many fields has weak global dimension 0 but its global dimension is nonzero.
If a ring is right Noetherian, then the right global dimension is the same as the weak global dimension, and is at most the left global dimension. In particular if a ring is right and left Noetherian then the left and right global dimensions and the weak global dimension are all the same.
The triangular matrix ring has right global dimension 1, weak global dimension 1, but left global dimension 2. It is right Noetherian, but not left Noetherian.
Năstăsescu, Constantin; Van Oystaeyen, Freddy (1987), Dimensions of ring theory, Mathematics and its Applications, vol. 36, D. Reidel Publishing Co., doi:10.1007/978-94-009-3835-9, ISBN9789027724618, MR 0894033
weak, dimension, this, article, includes, list, references, related, reading, external, links, sources, remain, unclear, because, lacks, inline, citations, please, help, improve, this, article, introducing, more, precise, citations, june, 2021, learn, when, re. This article includes a list of references related reading or external links but its sources remain unclear because it lacks inline citations Please help to improve this article by introducing more precise citations June 2021 Learn how and when to remove this template message In abstract algebra the weak dimension of a nonzero right module M over a ring R is the largest number n such that the Tor group Tor n R M N displaystyle operatorname Tor n R M N is nonzero for some left R module N or infinity if no largest such n exists and the weak dimension of a left R module is defined similarly The weak dimension was introduced by Henri Cartan and Samuel Eilenberg 1956 p 122 The weak dimension is sometimes called the flat dimension as it is the shortest length of the resolution of the module by flat modules The weak dimension of a module is at most equal to its projective dimension The weak global dimension of a ring is the largest number n such that Tor n R M N displaystyle operatorname Tor n R M N is nonzero for some right R module M and left R module N If there is no such largest number n the weak global dimension is defined to be infinite It is at most equal to the left or right global dimension of the ring R Examples editThe module Q displaystyle mathbb Q nbsp of rational numbers over the ring Z displaystyle mathbb Z nbsp of integers has weak dimension 0 but projective dimension 1 The module Q Z displaystyle mathbb Q mathbb Z nbsp over the ring Z displaystyle mathbb Z nbsp has weak dimension 1 but injective dimension 0 The module Z displaystyle mathbb Z nbsp over the ring Z displaystyle mathbb Z nbsp has weak dimension 0 but injective dimension 1 A Prufer domain has weak global dimension at most 1 A Von Neumann regular ring has weak global dimension 0 A product of infinitely many fields has weak global dimension 0 but its global dimension is nonzero If a ring is right Noetherian then the right global dimension is the same as the weak global dimension and is at most the left global dimension In particular if a ring is right and left Noetherian then the left and right global dimensions and the weak global dimension are all the same The triangular matrix ring Z Q 0 Q displaystyle begin bmatrix mathbb Z amp mathbb Q 0 amp mathbb Q end bmatrix nbsp has right global dimension 1 weak global dimension 1 but left global dimension 2 It is right Noetherian but not left Noetherian References editCartan Henri Eilenberg Samuel 1956 Homological algebra Princeton Mathematical Series vol 19 Princeton University Press ISBN 978 0 691 04991 5 MR 0077480 Năstăsescu Constantin Van Oystaeyen Freddy 1987 Dimensions of ring theory Mathematics and its Applications vol 36 D Reidel Publishing Co doi 10 1007 978 94 009 3835 9 ISBN 9789027724618 MR 0894033 nbsp This commutative algebra related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Weak dimension amp oldid 1170052071, wikipedia, wiki, book, books, library,
