Obstructions to deforming curves on an Enriques-Fano 3-fold

Abstract

We study the deformations of a curve C on an Enriques-Fano 3-fold X ⊂ Pn, assuming that C is contained in a smooth hyperplane section S ⊂ X, that is a smooth Enriques surface in X. We give a sufficient condition for C to be (un)obstructed in X, in terms of half pencils and (-2)-curves on S. Let Hilbsc X denote the Hilbert scheme of smooth connected curves in X. By using the Hilbert-flag scheme of X, we also compute the dimension of Hilbsc X at [C] and give a sufficient condition for Hilbsc X to contain a generically non-reduced irreducible component of Mumford type.