On jet schemes of determinantal varieties

Abstract

Determinantal varieties are important objects of study in algebraic geometry. In this paper, we will investigate them using the jet scheme approach. We have found a new connection for the Hilbert series between a determinantal variety and its jet schemes. We denote the k-th order jet scheme of the determinantal variety defined by r-minors in an m × n matrix as Lm,nr,k. For the special case where m, n, and r are equal, and m and r are 3 while k is 1, we establish a correspondence between the defining ideals of Lm,nr,k and abstract simplicial complexes, proving their shellability and obtaining the Hilbert series of Lm,nr,k accordingly. Moreover, for general Lm,nr,k, 12 provides its irreducible decomposition. We further provide a specific polynomial family defining its irreducible components. Keywords. Determinantal varieties, jet schemes, shellability, Hilbert series.