English

Supersymmetric monoidal categories

Category Theory 2021-02-16 v2 Representation Theory

Abstract

We develop the idea of a supersymmetric monoidal supercategory, following ideas of Kapranov. Roughly, this is a monoidal category in which the objects and morphisms are Z/2{\bf Z}/2-graded, equipped with isomorphisms XYYXX \otimes Y \to Y \otimes X of parity XY\vert X \vert \vert Y \vert on homogeneous objects. There are two fundamental examples: the groupoid of spin-sets, and the category of queer vector spaces equipped with the half tensor product; other important examples can be derived from these (such as the category of linear spin species). There are also two general constructions. The first is the exterior algebra of a supercategory (due to Ganter--Kapranov). The second is a construction we introduce called Clifford eversion. This defines an equivalence between a certain 2-category of supersymmetric monoidal supercategories and a corresponding 2-category of symmetric monoidal supercategories. We use our theory to better understand some aspects of the queer superalgebra, such as certain factors of 2\sqrt{2} in the theory of Q-symmetric functions and Schur--Sergeev duality.

Keywords

Cite

@article{arxiv.2011.12501,
  title  = {Supersymmetric monoidal categories},
  author = {Steven V Sam and Andrew Snowden},
  journal= {arXiv preprint arXiv:2011.12501},
  year   = {2021}
}

Comments

59 pages

R2 v1 2026-06-23T20:29:34.924Z