Motivic HyperK\"ahler Resolution Conjecture : I. Generalized Kummer varieties

Abstract

Given a smooth projective variety M endowed with a faithful action of a finite group G, following Jarvis-Kaufmann-Kimura and Fantechi-G\"ottsche, we define the orbifold motive (or Chen-Ruan motive) of the quotient stack [M/G] as an algebra object in the category of Chow motives. Inspired by Ruan, one can formulate a motivic version of his Cohomological HyperK\"ahler Resolution Conjecture. We prove this motivic version, as well as its K-theoretic analogue conjectured by Jarvis-Kaufmann-Kimura, in two situations related to an abelian surface A and a positive integer n. Case (A) concerns Hilbert schemes of points of A : the Chow motive of A[n] is isomorphic as algebra objects, up to a suitable sign change, to the orbifold motive of the quotient stack [An/Sn]. Case (B) for generalized Kummer varieties : the Chow motive of the generalized Kummer variety Kn(A) is isomorphic as algebra objects, up to a suitable sign change, to the orbifold motive of the quotient stack [A0n+1/ Sn+1], where A0n+1 is the kernel abelian variety of the summation map An+1 A. As a byproduct, we prove the original Cohomological HyperK\"ahler Resolution Conjecture for generalized Kummer varieties. As an application, we provide multiplicative Chow-K\"unneth decompositions for Hilbert schemes of abelian surfaces and for generalized Kummer varieties. In particular, we have a multiplicative direct sum decomposition of their Chow rings with rational coefficients, which is expected to be the splitting of the conjectural Bloch-Beilinson-Murre filtration. The existence of such a splitting for holomorphic symplectic varieties is conjectured by Beauville.