Simple totally disconnected locally compact groups separated by finiteness properties

Abstract

We construct a sequence of simple non-discrete totally disconnected locally compact (tdlc) groups separated by finiteness properties; that is, for every positive integer n there exists a simple non-discrete tdlc group that is of type Fn-1 but not of type Fn. This generalizes a result for discrete groups of Skipper--Witzel--Zaremsky. Furthermore, we construct a simple non-discrete tdlc group that is of type FP2 over Z but not compactly presented. Our examples arise as Smith universal groups U(M, N) associated to permutation groups M and N. We generalize a theorem of Haglund--Wise to tdlc groups and show that under mild conditions on M and N the finiteness properties of U(M, N) reflect those of its local actions M and N.