English

Universal tensor categories generated by dual pairs

Representation Theory 2020-08-26 v1 Category Theory Rings and Algebras

Abstract

Let VVCV_*\otimes V\rightarrow\mathbb{C} be a non-degenerate pairing of countable-dimensional complex vector spaces VV and VV_*. The Mackey Lie algebra g=glM(V,V)\mathfrak{g}=\mathfrak{gl}^M(V,V_*) corresponding to this paring consists of all endomorphisms φ\varphi of VV for which the space VV_* is stable under the dual endomorphism φ:VV\varphi^*: V^*\rightarrow V^*. We study the tensor Grothendieck category T\mathbb{T} generated by the g\mathfrak{g}-modules VV, VV_* and their algebraic duals VV^* and VV^*_*. This is an analogue of categories considered in prior literature, the main difference being that the trivial module C\mathbb{C} is no longer injective in T\mathbb{T}. We describe the injective hull II of C\mathbb{C} in T\mathbb{T}, and show that the category T\mathbb{T} is Koszul. In addition, we prove that II is endowed with a natural structure of commutative algebra. We then define another category IT_I\mathbb{T} of objects in T\mathbb{T} which are free as II-modules. Our main result is that the category IT{}_I\mathbb{T} is also Koszul, and moreover that IT{}_I\mathbb{T} is universal among abelian C\mathbb{C}-linear tensor categories generated by two objects XX, YY with fixed subobjects XXX'\hookrightarrow X, YYY'\hookrightarrow Y and a pairing XY1X\otimes Y\rightarrow \text{\textbf{1}} where \textbf{1} is the monoidal unit. We conclude the paper by discussing the orthogonal and symplectic analogues of the categories T\mathbb{T} and IT{}_I\mathbb{T}.

Keywords

Cite

@article{arxiv.2008.11179,
  title  = {Universal tensor categories generated by dual pairs},
  author = {Alexandru Chirvasitu and Ivan Penkov},
  journal= {arXiv preprint arXiv:2008.11179},
  year   = {2020}
}

Comments

35 pages + references

R2 v1 2026-06-23T18:05:55.307Z