Subgroups of CAT(0) groups, exotic finiteness properties and non-QI-embeddings into linear groups
Abstract
For every positive integer n we construct an example of a subgroup L< G of a linear CAT(0) group G such that L is of finiteness type Fn-1 and not Fn, and L does not admit a representation into GLd(k) which is a quasi-isometric embedding for any local field k. We further prove that there is a faithful representation of L into some GL(C) which is not the restriction of any representation of G. This generalises a family of fibre products of type F2 not F3 with these properties constructed by the second author.
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