Arboreal tensor categories

Abstract

We introduce some new symmetric tensor categories based on the combinatorics of trees: a discrete family D(n), for n 3 an integer, and a continuous family C(t), for t 1 a complex number. The construction is based on the general oligomorphic theory of Harman--Snowden, but relies on two non-trivial results we establish. The first determines the measures for the class of trees, and the second is a semi-simplicity theorem. These categories have some notable properties: for instance, C(t) is the first example of a 1-parameter family of pre-Tannakian categories of superexponential growth that cannot be obtained by interpolating categories of moderate growth.