Geometric invariants of locally compact groups: the homotopical perspective
Abstract
We extend the classical theory of homotopical -sets n developed by Bieri, Neumann, Renz and Strebel for abstract groups, to -sets topn for locally compact Hausdorff groups. Given such a group G, our topn(G) are sets of continuous homomorphisms G R ("characters"). They match the classical -sets n(G) if G is discrete, and refine the homotopical compactness properties Cn of Abels and Tiemeyer. Moreover, our theory recovers the definition of top1 and top2 proposed by Kochloukova. Besides presenting various characterizations of topn (particularly for n∈ \1,2\), we show that characters in topn(G) are also in topn(H) if H G is a closed cocompact subgroup, and we generalize several classical results. Namely, we prove that the set of nonzero elements of topn(G) is open, we prove that characters in a group of type Cn that do not vanish on the center always lie in topn(G), and we relate the -sets of a group with those of its quotients by closed subgroups of type Cn. Lastly, we describe how topn(G) governs whether a closed normal subgroup with abelian quotient is of type Cn, generalizing one of the highlights of the classical theory.
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