English

Vandermondes in superspace

Combinatorics 2019-07-18 v3

Abstract

Superspace of rank nn is a Q\mathbb{Q}-algebra with nn commuting generators x1,,xnx_1, \dots, x_n and nn anticommuting generators θ1,,θn\theta_1, \dots, \theta_n. We present an extension of the Vandermonde determinant to superspace which depends on a sequence a=(a1,,ar)\mathbf{a} = (a_1, \dots, a_r) of nonnegative integers of length rnr \leq n. We use superspace Vandermondes to construct graded representations of the symmetric group. This construction recovers hook-shaped Tanisaki quotients, the coinvariant ring for the Delta Conjecture constructed by Haglund, Rhoades, and Shimozono, and a superspace quotient related to positroids and Chern plethysm constructed by Billey, Rhoades, and Tewari. We define a notion of partial differentiation with respect to anticommuting variables to construct doubly graded modules from superspace Vandermondes. These doubly graded modules carry a natural ring structure which satisfies a 2-dimensional version of Poincar\'e duality. The application of polarization operators gives rise to other bigraded modules which give a conjectural module for the symmetric function Δek1en\Delta'_{e_{k-1}} e_n appearing in the Delta Conjecture of Haglund, Remmel, and Wilson.

Keywords

Cite

@article{arxiv.1906.03315,
  title  = {Vandermondes in superspace},
  author = {Brendon Rhoades and Andrew Timothy Wilson},
  journal= {arXiv preprint arXiv:1906.03315},
  year   = {2019}
}

Comments

32 pages

R2 v1 2026-06-23T09:47:28.453Z