Proto-exact categories of matroids, Hall algebras, and K-theory

Abstract

This paper examines the category Mat of pointed matroids and strong maps from the point of view of Hall algebras. We show that Mat has the structure of a finitary proto-exact category - a non-additive generalization of exact category due to Dyckerhoff-Kapranov. We define the algebraic K-theory K* (Mat) of Mat via the Waldhausen construction, and show that it is non-trivial, by exhibiting injections πsn (S) Kn (Mat) from the stable homotopy groups of spheres for all n. Finally, we show that the Hall algebra of Mat is a Hopf algebra dual to Schmitt's matroid-minor Hopf algebra.