Groupoid Homology and Classifying-Space Homology Are Not Isomorphic: The Cantor Unit Groupoid

Abstract

For an ample groupoid G, Matui-type groupoid homology H(G;Z) is built from the nerve G via the Moore complex of compactly supported, locally constant chains Cc(Gn,Z), with differential given by the alternating sum of pushforwards along the face maps. As both this complex and the singular complex of the classifying space BG originate from the same nerve, one might expect the two homologies to coincide. We show that they need not, and that the failure is sharp: for the unit groupoid on the Cantor set X, we compute H0(G;Z) C(X,Z), a countable group, whereas H0sing(BG;Z) x∈ XZ has cardinality 20. Thus the two groups are non-isomorphic for cardinality reasons alone, exhibiting a discrepancy already in degree 0.