Isomorphisms in l1-homology

Abstract

Taking the l1-completion and the topological dual of the singular chain complex gives rise to l1-homology and bounded cohomology respectively. In contrast to l1-homology, major structural properties of bounded cohomology are well understood by the work of Gromov and Ivanov. Based on an observation by Matsumoto and Morita, we derive a mechanism linking isomorphisms on the level of homology of Banach chain complexes to isomorphisms on the level of cohomology of the dual Banach cochain complexes and vice versa. Therefore, certain results on bounded cohomology can be transferred to l1-homology. For example, we obtain a new proof of the fact that l1-homology depends only on the fundamental group and that l1-homology with twisted coefficients admits a description in terms of projective resolutions. The latter one in particular fills a gap in Park's approach. In the second part, we demonstrate how l1-homology can be used to get a better understanding of simplicial volume of non-compact manifolds.

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