Traces for factorization homology in dimension 1

Abstract

We construct a circle-invariant trace from the factorization homology of the circle trace ∫α S1 \ End(V) associated to a dualizable object V∈ X in a symmetric monoidal ∞-category. This proves a conjecture of To\"en--Vezzosi on existence of circle-invariant traces. Underlying our construction is a calculation of the factorization homology over the circle of the walking adjunction in terms of the paracyclic category of Getzler--Jones: ∫ S1 Adj ~~ \! ~. This calculation exhibits a form of Poincar\'e duality for 1-dimensional factorization homology.