Reflexive symmetric differentials and quotients of bounded symmetric domains

Abstract

For each classical irreducible bounded symmetric domain D, Klingler has computed the minimum number mD such that any smooth projective quotient X=D/, for ∈Aut0(D), satisfies H0(X,Symi1X)=0 for 0<i<mD. In this article, we extend Klingler's result to the case when X is normal and projective. This, together with a normal version of Arapura's result about the relationship between the vanishing of global symmetric differentials on X and the rigidity of finite dimensional representations of π1(X), gives rigidity statements for representations of π1(X) and π1(Xreg) in a low dimensional range, when X is a normal projective quotient of a bounded symmetric domain.

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