Virtual Surjection and the $n$-$(n+1)$-$(n+2)$ Theorem for Profinite Groups

Mark Shusterman

Virtual Surjection and the n-(n+1)-(n+2) Theorem for Profinite Groups

Abstract

We prove the Virtual Surjection Conjecture for profinite groups. Namely, given a product of n profinite FPk groups, a subgroup that virtually surjects onto k-tuples must be FPk as well. We also prove the n-(n+1)-(n+2) Conjecture for profinite groups, as well as a few other FPn permanence results for fibre products. Our main tool is a numerical criterion for property FPn of modules of profinite groups. Our work suggests a new finiteness property to investigate.

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