Monomial G-posets and their Lefschetz invariants

Abstract

Let G be a finite group, and C be an abelian group. We introduce the notions of C-monomial G-sets and C-monomial G-posets, and state some of their categorical properties. This gives in particular a new description of the C-monomial Burnside ring BC(G). We also introduce Lefschetz invariants of C-monomial G-posets, which are elements of BC(G). These invariants allow for a definition of a generalized tensor induction multiplicative map TU,λ: BC(G) BC(H) associated to any C-monomial (G,H)-biset (U,λ), which in turn gives a group homomorphism BC(G)× BC(H)× between the unit groups of C-monomial Burnside rings.