A Simple Bijection for the Regions of the Shi Arrangement of Hyperplanes

Abstract

The Shi arrangement Sn is the arrangement of affine hyperplanes in Rn of the form xi - xj = 0 or 1, for 1 ≤ i < j ≤ n. It dissects Rn into (n+1)n-1 regions, as was first proved by Shi. We give a simple bijective proof of this result. Our bijection generalizes easily to any subarrangement of Sn containing the hyperplanes xi - xj = 0 and to the extended Shi arrangements.

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