Jack superpolynomials with negative fractional parameter: clustering properties and super-Virasoro ideals

Abstract

The Jack polynomials Pλ(α) at α=-(k+1)/(r-1) indexed by certain (k,r,N)-admissible partitions are known to span an ideal I(k,r)N of the space of symmetric functions in N variables. The ideal I(k,r)N is invariant under the action of certain differential operators which include half the Virasoro algebra. Moreover, the Jack polynomials in I(k,r)N admit clusters of size at most k: they vanish when k+1 of their variables are identified, and they do not vanish when only k of them are identified. We generalize most of these properties to superspace using orthogonal eigenfunctions of the supersymmetric extension of the trigonometric Calogero-Moser-Sutherland model known as Jack superpolynomials. In particular, we show that the Jack superpolynomials P(α) at α=-(k+1)/(r-1) indexed by certain (k,r,N)-admissible superpartitions span an ideal I(k,r)N of the space of symmetric polynomials in N commuting variables and N anticommuting variables. We prove that the ideal I(k,r)N is stable with respect to the action of the negative-half of the super-Virasoro algebra. In addition, we show that the Jack superpolynomials in I(k,r)N vanish when k+1 of their commuting variables are equal, and conjecture that they do not vanish when only k of them are identified. This allows us to conclude that the standard Jack polynomials with prescribed symmetry should satisfy similar clustering properties. Finally, we conjecture that the elements of I(k,2)N provide a basis for the subspace of symmetric superpolynomials in N variables that vanish when k+1 commuting variables are set equal to each other.