On the tangent bundle and the divisor theory of a general matroid
Abstract
Extending classical algebro-geometric constructions to arbitrary matroids, we construct a K-class TM∈ K(M) for every loopless matroid M. When M is realizable by a linear subspace L, TM recovers the K-class of the tangent bundle of the wonderful compactification WL. We derive two formulas for the total Chern class of TM (one combinatorial and one geometric) and show that the associated Todd class agrees with the Todd class appearing in the matroid Hirzebruch--Riemann--Roch formula. To develop a positivity theory entirely at the combinatorial level, we introduce the notion of ``fake effective cone,'' a combinatorial analogue of the classical effective cone, and use it to characterize big and nef divisors in A(M). Finally, we define the βS classes, obtained from Cremona conjugates of the classical αS classes, and study their properties to provide a rich and computable family of combinatorially nef divisors.
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