The combinatorial cost
Abstract
We study the combinatorial analogues of the classical invariants of measurable equivalence relations. We introduce the notion of cost and β-invariants (the analogue of the first L2-Betti number introduced by Gaboriau) for sequences of finite graphs with uniformly bounded vertex degrees and examine the relation of these invariants and the rank gradient resp. mod p homology gradient invariants introduced by Lackenby for residually finite groups.
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