RD-projective module whose subprojectivity domain is minimal

Mares [9] has called a projective module semiperfect if every homomorphic image has a projective cover and has shown that many of the properties of semiperfect rings can be extended to these modules. More recently Zelmanowitz [16] has called a module regular if every finitely generated submodule is a projective direct summand. In the present paper a class of semiregular modules is introduced which contains all regular and all semiperfect modules. Several characterizations of these modules are given and a structure theorem is proved. In addition several theorems about regular and semiperfect modules are extended.

Download Full-text

OPENLY SEMIPRIMITIVE PROJECTIVE MODULE

Communications of the Korean Mathematical Society ◽

10.4134/ckms.2004.19.4.619 ◽

2004 ◽

Vol 19 (4) ◽

pp. 619-637 ◽

Cited By ~ 1

Author(s):

Soon-Sook Bae

Keyword(s):

Projective Module

Download Full-text

Characterizing rings by a direct decomposition property of their modules

Journal of the Australian Mathematical Society ◽

10.1017/s1446788700014063 ◽

2006 ◽

Vol 80 (3) ◽

pp. 359-366 ◽

Cited By ~ 1

Author(s):

Dinh Van Huynh ◽

S. Tariq Rizvi

Keyword(s):

Projective Module ◽

Direct Decomposition ◽

Decomposition Property ◽

Direct Sum ◽

Continuous Module

AbstractA module M is said to satisfy the condition (℘*) if M is a direct sum of a projective module and a quasi-continuous module. In an earlier paper, we described the structure of rings over which every (countably generated) right module satisfies (℘*), and it was shown that such a ring is right artinian. In this note some additional properties of these rings are obtained. Among other results, we show that a ring over which all right modules satisfy (℘*) is also left artinian, but the property (℘*) is not left-right symmetric.

Download Full-text

Rank Element of a Projective Module

Nagoya Mathematical Journal ◽

10.1017/s002776300001148x ◽

1965 ◽

Vol 25 ◽

pp. 113-120 ◽

Cited By ~ 42

Author(s):

Akira Hattori

Keyword(s):

Finite Group ◽

Commutative Ring ◽

Local Ring ◽

Projective Module ◽

Projective Modules ◽

Local Theorem ◽

Complete Local Ring ◽

A Finite Group

In § 1 of this note we first define the trace of an endomorphism of a projective module P over a non-commutative ring A. Then we call the trace of the identity the rank element r(P) of P, which we shall illustrate by several examples. For a projective module P over the groupalgebra of a finite group G, the rank element of P is essentially the character of G in P. In § 2 we prove that under certain assumption two projective modules Pi and P2 over an algebra over a complete local ring o are isomorphic if and only if their rank elements are identical. This is a type of proposition asserting that two representations are equivalent if and only if their characters are identical, and in fact, when A is the groupalgebra, the above theorem may be considered as another formulation of Swan’s local theorem [9]).

Download Full-text

A ZERO-DIVISOR GRAPH FOR MODULES WITH RESPECT TO THEIR (FIRST) DUAL

Journal of Algebra and Its Applications ◽

10.1142/s0219498812501514 ◽

2012 ◽

Vol 12 (02) ◽

pp. 1250151 ◽

Cited By ~ 7

Author(s):

M. BAZIAR ◽

E. MOMTAHAN ◽

S. SAFAEEYAN

Keyword(s):

Commutative Ring ◽

Chromatic Number ◽

Complete Graph ◽

Projective Module ◽

Zero Divisor ◽

Undirected Graph ◽

Clique Number ◽

Covariant Functor ◽

Zero Divisor Graph

Let M be an R-module. We associate an undirected graph Γ(M) to M in which nonzero elements x and y of M are adjacent provided that xf(y) = 0 or yg(x) = 0 for some nonzero R-homomorphisms f, g ∈ Hom (M, R). We observe that over a commutative ring R, Γ(M) is connected and diam (Γ(M)) ≤ 3. Moreover, if Γ(M) contains a cycle, then gr (Γ(M)) ≤ 4. Furthermore if ∣Γ(M)∣ ≥ 1, then Γ(M) is finite if and only if M is finite. Also if Γ(M) = ∅, then any nonzero f ∈ Hom (M, R) is monic (the converse is true if R is a domain). For a nonfinitely generated projective module P we observe that Γ(P) is a complete graph. We prove that for a domain R the chromatic number and the clique number of Γ(M) are equal. When R is self-injective, we will also observe that the above adjacency defines a covariant functor between a subcategory of R-MOD and the Category of graphs.

Download Full-text

A NON-FREE SUPPLEMENTABLE PROJECTIVE MODULE

Finite Free Resolutions ◽

10.1017/cbo9780511565892.009 ◽

1976 ◽

pp. 235-237

Keyword(s):

Projective Module

Download Full-text

Natural maps of extension functors and a theorem of R. G. Swan

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100035544 ◽

1961 ◽

Vol 57 (3) ◽

pp. 489-502 ◽

Cited By ~ 24

Author(s):

P. J. Hilton ◽

D. Rees

Keyword(s):

Finite Group ◽

Exact Sequence ◽

Group Ring ◽

Projective Module ◽

Additive Group ◽

Integral Group Ring ◽

Integral Group ◽

Natural Maps ◽

Image Position ◽

A Finite Group

The present paper has been inspired by a theorem of Swan(5). The theorem can be described as follows. Let G be a finite group and let Γ be its integral group ring. We shall denote by Z an infinite cyclic additive group considered as a left Γ-module by defining gm = m for all g in G and m in Z. By a Tate resolution of Z is meant an exact sequencewhere Xn is a projective module for − ∞ < n < + ∞, and.

Download Full-text