k-Adjoint of Hyperplane Arrangements

Abstract

In this paper, we introduce the k-adjoint of a given hyperplane arrangement A associated with rank-k elements in the intersection lattice L(A), which generalizes the classical adjoint proposed by Bixby and Coullard. The k-adjoint of A induces a decomposition of the Grassmannian, which we call the A-adjoint decomposition. Inspired by the work of Gelfand, Goresky, MacPherson, and Serganova, we generalize the matroid decomposition and refined Schubert decomposition of the Grassmannian from the perspective of A. Furthermore, we prove that these three decompositions are exactly the same decomposition. A notable application involves providing a combinatorial classification of all the k-dimensional restrictions of A. Consequently, we establish the anti-monotonicity property of some combinatorial invariants, such as Whitney numbers of the first kind and the independece numbers.

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