Periodicity of Adams operations on the Green ring of a finite group
Abstract
The Adams operations n and Sn on the Green ring of a group G over a field K provide a framework for the study of the exterior powers and symmetric powers of KG-modules. When G is finite and K has prime characteristic p we show that n and Sn are periodic in n if and only if the Sylow p-subgroups of G are cyclic. In the case where G is a cyclic p-group we find the minimum periods and use recent work of Symonds to express Sn in terms of n.
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