A proof of the fermionic Theta coinvariant conjecture

Abstract

Let (x1, …, xn, y1, …, yn) be a list of 2n commuting variables, (θ1, …, θn, 1, …, n) be a list of 2n anticommuting variables, and C[Xn, Yn] \n, n\ be the algebra generated by these variables. D'Adderio, Iraci, and Vanden Wyngaerd introduced the Theta operators on the ring of symmetric functions and used them to conjecture a formula for the quadruply-graded Sn-isomorphism type of C[Xn,Yn] \n, n\/I where I is the ideal generated by Sn-invariants with vanishing constant term. We prove their conjecture in the `purely fermionic setting' obtained by setting the commuting variables equal xi, yi equal to zero.