On bases of tropical Pl\"ucker functions

Abstract

We consider functions f:B that obey tropical analogs of classical Pl\"ucker relations on minors of a matrix. The most general set B that we deal with in this paper is of the form \x∈ n 0 x a, m x1+...+xn m'\ (a rectangular integer box ``truncated from below and above''). We construct a basis for the set of tropical Pl\"ucker functions on B, a subset ⊂eq B such that the restriction map is bijective. Also we characterize, in terms of the restriction to the basis, the classes of submodular, so-called skew-submodular, and discrete concave functions in , discuss a tropical analogue of the Laurentness property, and present other results.