Rational components of Hilbert schemes

Abstract

The Gr\"obner stratum of a monomial ideal j is an affine variety that parametrizes the family of all ideals having j as initial ideal (with respect to a fixed term ordering). The Gr\"obner strata can be equipped in a natural way of a structure of homogeneous variety and are in a close connection with Hilbert schemes of subvarieties in the projective space n. Using properties of the Gr\"obner strata we prove some sufficient conditions for the rationality of components of p(z)n. We show for instance that all the smooth, irreducible components in p(z)n (or in its support) and the Reeves and Stillman component HRS are rational.