Lefschetz theory for exterior algebras and fermionic diagonal coinvariants

Abstract

Let W be an irreducible complex reflection group acting on its reflection representation V. We consider the doubly graded action of W on the exterior algebra (V V*) as well as its quotient DRW := (V V*)/ (V V*)W+ by the ideal generated by its homogeneous W-invariants with vanishing constant term. We describe the bigraded isomorphism type of DRW; when W = Sn is the symmetric group, the answer is a difference of Kronecker products of hook-shaped Sn-modules. We relate the Hilbert series of DRW to the (type A) Catalan and Narayana numbers and describe a standard monomial basis of DRW using a variant of Motzkin paths. Our methods are type-uniform and involve a Lefschetz-like theory which applies to the exterior algebra (V V*).