Local rigidity of covering constructions and Weil--Petersson subvarieties of the moduli space of curves
Abstract
We show that totally geodesic subvarieties of the moduli space Mg,n of genus g curves with n marked points, endowed with the Weil--Petersson metric, are locally rigid. This implies that covering constructions -- examples of totally geodesic subvarieties of Mg,n endowed with the Teichm\"uller metric -- are locally rigid. We deduce the local rigidity statement from a more general rigidity result for a class of orbifold maps to Mg,n.
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