Monomial structures, I

Abstract

The goal of a series of papers is to define G-actions on various A-fibered structures, where G is a finite group and A is an abelian group. One prominent such example is the A-fibered Burnside ring. If A=C×, it is also called the ring of monomial representations (introduced by Dress in Dress1971) and is the natural home for the canonical induction formula (see Boltje1990). In this first part of the series, motivated by constructions in BoucMutlu, we introduce A-fibered structures on posets, on abstract simplicial complexes, and on A-bundles over topological spaces, together with natural notions of homotopy, and functors between these structures respecting homotopy. In a sequel we will continue with G-representations in these A-fibered structures and associate to them elements in the A-fibered Burnside ring.

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