Reflective lattices and hyperkahler manifolds

Using the results of Nikulin and Vinberg on the groups of isometries generated by reflections, we construct a subvariety called the Nikulin-Vinberg locus in the moduli space of polarized hyperkahler manifolds. It is obtained as a finite union of components of higher Noether-Lefschetz loci which parameterize manifolds with certain special Neron-Severi lattices. The Nikulin-Vinberg locus is the closure of the set of hyperkahler manifolds with Picard number $\geq 3$ which have finite groups of birational automorphisms. Using this construction and a refinement of an argument by Oguiso, we show that any non-trivial family of projective deformations of a hyperkahler manifold with $b_2(M)\geq 6$ has a dense set of fibers which have an infinite group of birational automorphisms.