Multideterminantal measures

Abstract

We define multideterminantal probability measures, a family of probability measures on [k]n where [k]=\1,2,…,k\, generalizing determinantal measures (which correspond to the case k=2). We give examples coming from the positive Grassmannian, from the dimer model and from the spanning tree model. We characterize kernels of pure k-determinantal measures as those arising from k-tuples of Grassmannian elements whose maximal minors have certain sign restrictions. As a special case we construct all kernels of pure determinantal measures via a pair of elements of Grn1,n having corresponding Pl\"ucker coordinates of the same signs. We also define and completely characterize determinantal probability measures on the permutation group Sn.