Vector-valued Laurent polynomial equations, toric vector bundles and matroids

Abstract

Let L ⊂ Cr C[x1, …, xn] be a finite dimensional subspace of vector-valued Laurent polynomials invariant under the action of torus (C*)n. We study subvarieties in the torus, defined by equations f = 0 for generic f ∈ L. We generalize the BKK theorem, that counts the number of solutions of a system of Laurent polynomial equations generic for their Newton polytopes, to this setting. The answer is in terms of mixed volume of certain virtual polytopes encoding discrete invariants of L which involves matroid data. Moreover, we prove an Alexandrov-Fenchel type inequality for these virtual polytopes. Finally, we extend this inequality to non-representable polymatroids. This extends the usual Alexandrov-Fenchel inequality for polytopes as well as log-concavity results related to matroids.