Monodromy rank and the semisimple Mumford-Tate conjecture for hyper-K\"ahler varieties

Abstract

In this paper, we establish two main results concerning the Mumford-Tate conjecture for hyper-K\"ahler varieties. First, we prove the conjecture for the semisimplified -adic Galois representations attached to hyper-K\"ahler varieties with second Betti number b2 ≥ 4. As a direct consequence, we deduce that the Hodge conjecture implies the Tate conjecture for powers of hyper-K\"ahler varieties. Second, we show that the Mumford-Tate conjecture for hyper-K\"ahler varieties is invariant under deformation. The proofs rely on comparing the ranks of -adic algebraic monodromy groups in higher degrees to those in degree 2 via the theory of Frobenius tori and the Looijenga-Lunts-Verbitsky Lie algebra.