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Modules, comodules and cotensor products over Frobenius algebras

环与代数 2007-05-23 v3 代数拓扑

摘要

We characterize noncommutative Frobenius algebras A in terms of the existence of a coproduct which is a map of left A^e-modules. We show that the category of right (left) comodules over A, relative to this coproduct, is isomorphic to the category of right (left) modules. This isomorphism enables a reformulation of the cotensor product of Eilenberg and Moore as a functor of modules rather than comodules. We prove that the cotensor product M \Box N of a right A-module M and a left A-module N is isomorphic to the vector space of homomorphisms from a particular left A^e-module D to N \otimes M, viewed as a left A^e-module. Some properties of D are described. Finally, we show that when A is a symmetric algebra, the cotensor product M \Box N and its derived functors are given by the Hochschild cohomology over A of N \otimes M.

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引用

@article{arxiv.math/9806044,
  title  = {Modules, comodules and cotensor products over Frobenius algebras},
  author = {Lowell Abrams},
  journal= {arXiv preprint arXiv:math/9806044},
  year   = {2007}
}

备注

LaTeX2e, uses diagram.sty. Submitted to Journal of Algebra. Corrected, with some expository improvements