Set superpartitions and superspace duality modules
Combinatorics
2021-08-10 v2
Abstract
The superspace ring is a rank polynomial ring tensor a rank exterior algebra. Using an extension of the Vandermonde determinant to , the authors previously defined a family of doubly graded quotients of which carry an action of the symmetric group and satisfy a bigraded version of Poincar\'e Duality. In this paper, we examine the duality modules in greater detail. We describe a monomial basis of and give combinatorial formulas for its bigraded Hilbert and Frobenius series. These formulas involve new combinatorial objects called {\em ordered superpartitions}. These are ordered set partitions of in which the non-minimal elements of any block may be barred or unbarred.
Cite
@article{arxiv.2104.05630,
title = {Set superpartitions and superspace duality modules},
author = {Brendon Rhoades and Andrew Timothy Wilson},
journal= {arXiv preprint arXiv:2104.05630},
year = {2021}
}
Comments
49 pages