English

A Shuffle Theorem for Paths Under Any Line

Combinatorics 2021-09-07 v4 Quantum Algebra Representation Theory

Abstract

We generalize the shuffle theorem and its (km,kn)(km,kn) version, as conjectured by Haglund et al. and Bergeron et al., and proven by Carlsson and Mellit, and Mellit, respectively. In our version the (km,kn)(km,kn) Dyck paths on the combinatorial side are replaced by lattice paths lying under a line segment whose xx and yy intercepts need not be integers, and the algebraic side is given either by a Schiffmann algebra operator formula or an equivalent explicit raising operator formula. We derive our combinatorial identity as the polynomial truncation of an identity of infinite series of GLlGL_{l} characters, expressed in terms of infinite series versions of LLT polynomials. The series identity in question follows from a Cauchy identity for non-symmetric Hall-Littlewood polynomials.

Keywords

Cite

@article{arxiv.2102.07931,
  title  = {A Shuffle Theorem for Paths Under Any Line},
  author = {Jonah Blasiak and Mark Haiman and Jennifer Morse and Anna Pun and George H. Seelinger},
  journal= {arXiv preprint arXiv:2102.07931},
  year   = {2021}
}

Comments

43 pages, 7 figures; v4: fixed missing reference and minor spacing mistakes

R2 v1 2026-06-23T23:11:46.418Z