A new modular plethystic SL2(F)-isomorphism SymN-1E N+1 Symd+1E (2,1N-1) Symd E
Abstract
Let F be a field and let E be the natural representation of SL2(F). Given a vector space V, let (2,1N-1)V be the kernel of the multiplication map N V V → N+1V. We construct an explicit SL2(F)-isomorphism SymN-1E N+1 Symd+1E (2,1N-1) Symd E. This SL2(F)-isomorphism is a modular lift of the q-binomial identity qN(N-1)2[N]q d+1N+1q = s(2,1N-1)(1,q,…, qd), where s(2,1N-1) is the Schur function for the partition (2,1N-1). This identity, which follows from our main theorem, implies the existence of an isomorphism when F is the field of complex numbers but it is notable, and not typical of the general case, that there is an explicit isomorphism defined in a uniform way for any field.
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