Topological Bijections for Oriented Matroids.

In previous work by the first and third author with Matthew Baker, a family of bijections between bases of a regular matroid and the Jacobian group of the matroid was given. The core of the work is a geometric construction using zonotopal tilings that produces bijections between the bases of a realizable oriented matroid and the set of $(sigma,sigma^*)$-compatible orientations with respect to some acyclic circuit (respectively, cocircuit) signature $sigma$ (respectively, $sigma^*$). In this work, we extend this construction to general oriented matroids and circuit (respectively, cocircuit) signatures coming from generic single-element liftings (respectively, extensions). As a corollary, when both signatures are induced by the same lexicographic data, we give a new (bijective) proof of the interpretation of $T_M(1,1)$ using orientation activity due to Gioan and Las Vergnas. Here $T_M(x,y)$ is the Tutte polynomial of the matroid.