Portrait of the Handle as a Hopf Algebra

Following a suggestion of Turaev, we explain results of Crane and Yetter concerning the ubiquity of Hopf algebras in constructions of 3D tqft’s as showing that the punctured torus is a formal Hopf algebra object in the circle, regarded as a formal braided monoidal category in the symmetric monoidal 2-category of 3-dimensional cobordisms with corners.