Non-existence of genuine (compact) quantum symmetries of compact, connected smooth manifolds

Abstract

Suppose that a compact quantum group Q acts faithfully on a smooth, compact, connected manifold M, i.e. has a C (co)-action α on C(M), such that α(C∞(M)) ⊂eq C∞(M, Q) and the linear span of α(C∞(M))(1 Q) is dense in C∞(M, Q) with respect to the Frechet topology. It was conjectured by the author quite a few years ago that Q must be commutative as a C algebra i.e. Q C(G) for some compact group G acting smoothly on M. The goal of this paper is to prove the truth of this conjecture. A remarkable aspect of the proof is the use of probabilistic techniques involving Brownian stopping time.