On Extending Type B Parking Spaces
Abstract
Armstrong, Reiner, and Rhoades defined for all Weyl groups W a natural representation of W called the W-parking space. The type B parking space is the representation C[(Z/(2n+1)Z)n] of the nth signed symmetric group. We consider more general representations of the form C[(Z/mZ)n]; we conjecture that this representation extends to the (n+1)th signed symmetric group for all n and m. We prove this conjecture when m = 3 or when n ≤ 2.
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