Graded equivalence theory with applications

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Title: Graded equivalence theory with applications
Author: Haefner, Jeremy
Abstract: We develop the foundations for graded equivalence theory and apply them to investigate properties such as primeness, finite representation type, and vertex theory of graded rings. The key fact that we prove is that, for any two G-graded rings R and S such that there is a category equivalence from gr(R) to gr(S) that commutes with suspensions, then, for any subgroup H of G, the categories gr(HIG, R) and gr(HIG, S) of modules graded by the G-set of right cosets are also equivalent.
Description: RIT community members may access full-text via RIT Libraries licensed databases: http://library.rit.edu/databases/
Record URI: http://hdl.handle.net/1850/9699
Publishers URL: http://dx.doi.org/10.1016/S0021-8693(05)80009-2
Date: 1995-03-01

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