Bloch's conjecture for Enriques varieties
Abstract
Enriques varieties have been defined as higher-dimensional generalizations of Enriques surfaces. Bloch's conjecture implies that Enriques varieties should have trivial Chow group of zero-cycles. We prove this is the case for all known examples of irreducible Enriques varieties of index larger than 2. The proof is based on results concerning the Chow motive of generalized Kummer varieties.
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