Inversion arrangements and the weak Bruhat order

Abstract

For each permutation w, we can construct a collection of hyperplanes Aw according to the inversions of w, which is called the inversion hyperplane arrangement associated to w. It was conjectured by Postnikov and confirmed by Hultman, Linusson, Shareshian and Sj\"ostrand that the number of regions of Aw is less than or equal to the number of permutations below w in the Bruhat order, with the equality holds if and only if w avoids the four patterns 4231, 35142, 42513 and 351624. In this paper, we show that the number of regions of Aw is greater than or equal to the number of permutations below w in the weak Bruhat order, with the equality holds if and only if w avoids the patterns 231 and 312.