Motives of isogenous K3 surfaces

Published 11 May 2017 in math.AG | (1705.04063v4)

Abstract: We prove that isogenous K3 surfaces have isomorphic Chow motives. This provides a motivic interpretation of a long standing conjecture of Safarevich which has been settled only recently by Buskin. The main step consists of a new proof of Safarevich's conjecture that circumvents the analytic parts in Buskin's approach, avoiding twistor spaces and non-algebraic K3 surfaces.

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Daniel Huybrechts

Motives of isogenous K3 surfaces

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