A Higher Spin-Statistics Theorem for Invertible Quantum Field Theories

Abstract

We prove that every unitary invertible quantum field theory satisfies a generalization of the famous spin-statistics theorem. To formulate this extension, we define a `higher spin' action of the stable orthogonal group O on appropriate spacetime manifolds, which extends both the reflection involution and spin flip. On the algebraic side, we define a `higher statistics' action of O on the universal target for invertible field theories, IZ, which extends both complex conjugation and fermion parity (-1)F. We prove that every unitary invertible quantum field theory intertwines these actions.