Almost-valuative invariants of connected split matroids: The cd-index

Abstract

We derive a formula for matroid invariants Ψ on a large family of matroids, provided that Ψ is almost-valuative, namely, it satisfies a hyperplane-cut formula. Our primary application is to the cd-index Ψcd of the base polytope P(M), a polynomial in two non-commutative variables that compactly encodes the number of face-flags F = \σ1 ⊂ … ⊂ σs \ with prescribed dimensions σi = di. This generalizes recent work by Ferroni and Schröter on the f-vector of P(M), yielding a formula that can be understood as a valuative part plus an error term that surprisingly depends only on modular pairs of cyclic flats. This enables computations requiring only the following data: the evaluations of Ψ on hypersimplices Δk,n and cuspidal matroids Λr,hk,n; and counts λ(r,h) and μ(a,b;α,β) of cyclic flats and modular pairs of cyclic flats in M, respectively, satisfying specific rank and cardinality conditions. We compute these for the cd-index, yielding explicit results for sparse paving matroids and rank-2 matroids.

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