Parking Spaces for Complex Reflection Groups

Abstract

We answer an open problem of arXiv:1204.1760 and arXiv:1205.4293, extending their work to irreducible well--generated complex reflection groups W. We define a combinatorial W-noncrossing parking space and an algebraic W-parking space for such W, and exhibit a (W × C)-equivariant isomorphism between the two. As a consequence of this isomorphism, we enumerate the W-noncrossing parking functions. Finally, we extend our results to the Fuss case. We prove the results for all such complex reflection groups except G34, E7, and E8.

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