Finiteness and infiniteness results for Torelli groups of (hyper-)K\"ahler manifolds

Abstract

The Torelli group T(X) of a closed smooth manifold X is the subgroup of the mapping class group π0(Diff+(X)) consisting of elements which act trivially on the integral cohomology of X. In this note we give counterexamples to Theorem 3.4 of Verbitsky's paper "Mapping class group and a global Torelli theorem for hyperk\"ahler manifolds" (Duke Math.~J.~162 (2013), no.~15, 2929-2986) which states that the Torelli group of simply connected K\"ahler manifolds of complex dimension 3 is finite. This is done by constructing under some mild conditions homomorphisms J: T(X) H3(X; Q) and showing that for certain K\"ahler manifolds this map is non-trivial. We also give a counterexample to Theorem 3.5 (iv) in this paper where Verbitsky claims that the Torelli group of hyperk\"ahler manifolds are finite. These examples are detected by the action of diffeomorphsims on π4(X). Finally we confirm the finiteness result for the special case of the hyperk\"ahler manifold K[2].