Discrete valuation rings, partitions and p-groups I
Abstract
A finite abelian p-group having an automorphism x such that 1+…+xp-1=0, can be viewed as a module over an appropriate discrete valuation ring O containing Zp (the ring of p-adic integer). This yields the natural problem of comparing the invariants of A as a Zp-module to its invariants as an O-module. We solve the latter problem in a more general context, and give some applications to the structure of some p-groups and their automorphisms.
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