Isotopy classes of involutions of del Pezzo surfaces

Abstract

Let Mn := CP2 \# nCP2 for 0 ≤ n ≤ 8 be the underlying smooth manifold of a degree 9-n del Pezzo surface. We prove three results about the mapping class group Mod(Mn) := π0(Homeo+(Mn)): 1. the classification of, and a structure theorem for, all involutions in Mod(Mn), 2. a positive solution to the smooth Nielsen realization problem for involutions of Mn, and 3. a purely topological characterization of three remarkable types of involutions on certain Mn coming from birational geometry: de Jonqui\'eres involutions, Geiser involutions, and Bertini involutions. One main ingredient is the theory of hyperbolic reflection groups.