Inductive Freeness of Ziegler's Canonical Multiderivations for Reflection Arrangements

Abstract

Let A be a free hyperplane arrangement. In 1989, Ziegler showed that the restriction A'' of A to any hyperplane endowed with the natural multiplicity is then a free multiarrangement. We initiate a study of the stronger freeness property of inductive freeness for these canonical free multiarrangements and investigate them for the underlying class of reflection arrangements. More precisely, let A = A(W) be the reflection arrangement of a complex reflection group W. By work of Terao, each such reflection arrangement is free. Thus so is Ziegler's canonical multiplicity on the restriction A'' of A to a hyperplane. We show that the latter is inductively free as a multiarrangement if and only if A'' itself is inductively free.