Simple groups separated by finiteness properties
Abstract
We show that for every positive integer n there exists a simple group that is of type Fn-1 but not of type Fn. For n 3 these groups are the first known examples of this kind. They also provide infinitely many quasi-isometry classes of finitely presented simple groups. The only previously known infinite family of such classes, due to Caprace--R\'emy, consists of non-affine Kac--Moody groups over finite fields. Our examples arise from R\"over--Nekrashevych groups, and contain free abelian groups of infinite rank.
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