A topologically extendible mapping class that is not smoothly extendible

Abstract

We give an example of a smooth characteristic embedding of a torus in 2 × 2 \# 1 × 3 such that there exists no diffeomorphism of the ambient 4-manifold that induces the Dehn twist along a meridian of the torus, but there exists a homeomorphism of the ambient 4-manifold, isotopic to identity, that induces the Dehn twist. As an application of our methods, we provide examples of two proper smooth embeddings of an annulus in 2 × 2 \# 1 × 3 int(4) which are topologically isotopic, but not smoothly isotopic (relative to boundary).