Permutation modules for Ramsey structures

Abstract

Suppose R is a commutative ring and G is a group acting on a set W. We consider the RG-module RW in the case where G is the automorphism group of an ω-categorical structure M and W is, for example, Mn (for n ∈ N). We develop methods which may provide information about two questions in the case where R is a field F: whether FW has a.c.c. on submodules; and in the case where M is finitely homogeneous, whether FW is of finite composition length. In the case where M is a Ramsey structure and so G is extremely amenable, we give a simple `decision procedure' for membership in a submodule of RW specified by a given generating set. If F is a field, we show that there is a duality between submodules of FW and the topological FG-module of definable functions from W to F.

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