Resolution of ideals associated to subspace arrangements

Abstract

Let I1,…,In be ideals generated by linear forms in a polynomial ring over an infinite field and let J = I1 ·s In. We describe a minimal free resolution of J and show that it is supported on a polymatroid obtained from the underlying representable polymatroid by means of the so-called Dilworth truncation. Formulas for the projective dimension and Betti numbers are given in terms of the polymatroid as well as a characterization of the associated primes. Along the way we show that J has linear quotients. In fact, we do this for a large class of ideals JP, where P is a certain poset ideal associated to the underlying subspace arrangement.