On group rings of the simple group of order 168, 504 or 360 and their modules
Abstract
Let p be a prime and Zp the ring of p-adic integers. Let G denote the simple group of order 168, 504 or 360. In this paper, we study the structure of the -part of a Zp[Im()][G]-module come from ideal class groups, Artin L-functions and Iwasawa theory.
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