论文信息 - An Exact Sequence Associated with a Generalized Crossed Product

An Exact Sequence Associated with a Generalized Crossed Product

The purpose of this paper is to generalize the seven terms exact sequence given by Chase, Harrison and Rosenberg [8]. Our work was motivated by Kanzaki [16] and, of course, [8], [9]. The main theorem holds for any generalized crossed product, which is a more general one than that in Kanzaki [16]. In §1, we define a group P(A/B) for any ring extension A/B, and prove some preliminary exact sequences. In §2, we fix a group homomorphism J from a group G to the group of all invertible two-sided B-submodules of A.

Y. Miyashita

[1] Y. Miyashita. ON GALOIS EXTENSIONS AND CROSSED PRODUCTS , 1971 .

[2] K. Hirata. Separable Extensions and Centralizers of Rings , 1969, Nagoya Mathematical Journal.

[3] T. Kanzaki. On generalized crossed product and Brauer group , 1968 .

[4] K. Hirata. Some types of Separable Extensions of Rings , 1968, Nagoya Mathematical Journal.

[5] H. Bass,et al. Lectures on topics in algebraic k-theory , 1967 .

[6] G. Azumaya. Completely Faithful Modules and Self-Injective Rings , 1966, Nagoya Mathematical Journal.

[7] Gerald J. Janusz,et al. Separable algebras over commutative rings , 1966 .

[8] Y. Miyashita. FINITE OUTER GALOIS THEORY OF NON-COMMUTATIVE RINGS , 1966 .

[9] T. Kanzaki. On Galois algebra over a commutative ring , 1965 .

[10] F. DeMeyer,et al. Some notes on the general Galois theory of rings , 1965 .

[11] D. Harrison. Abelian extensions of commutative rings , 1965 .

[12] Maurice Auslander,et al. The Brauer group of a commutative ring , 1960 .

[13] Kiiti Morita,et al. Duality for modules and its applications to the theory of rings with minimum condition , 1958 .

[14] Gorô Azumaya,et al. On Maximally Central Algebras , 1951, Nagoya Mathematical Journal.