Singularity of the varieties of representations of lattices in solvable Lie groups

Abstract

For a lattice of a simply connected solvable Lie group G, we describe the analytic germ in the variety of representations of at the trivial representation as an analytic germ which is linearly embedded in the analytic germ associated with the nilpotent Lie algebra determined by G. By this description, under certain assumption, we study the singularity of the analytic germ in the variety of representations of at the trivial representation by using the Kuranishi space construction. By a similar technique, we also study deformations of holomorphic structures of trivial vector bundles over complex parallelizable solvmanifolds.