Generalized parabolic structures over smooth curves with many components and principal bundles over reducible nodal curves

Abstract

Let Y1,…,Yl be smooth irreducible projective curves and let Y be its disjoint union. Given a semisimple reductive algebraic group G and a faithful representation :G SL(V) we construct a projective moduli space of (,δ)-(semi)stable singular principal G-bundles with generalized parabolic structure of type e. In case Y is the normalization of a connected and reducible projective nodal curve X, there is a closed subscheme coarsely representing the subfunctor corresponding to descending bundles. We prove that the descent operation induces a birational, surjective and proper morphism onto the schematic closure of the space of δ-stable singular principal G-bundles whose associated torsion free sheaf is of local type e.