Bijections for faces of braid-type arrangements
Abstract
We establish a general bijective framework for encoding faces of some classical hyperplane arrangements. Precisely, we consider hyperplane arrangements in Rn whose hyperplanes are all of the form \xi-xj=s\ for some i,j∈[n] and s∈ Z. Such an arrangement A is strongly transitive if it satisfies the following condition: if \xi-xj=s\ A and \xj-xk=t\ A for some i,j,k∈ [n] and s,t≥ 0, then \xi-xk=s+t\ A. For any strongly transitive arrangement A, we establish a bijection between the faces of A and some set of decorated plane trees.
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