Mapping classes fixing an isotropic homology class of minimal genus 0 in rational 4-manifolds

Abstract

For any N ≥ 1, let MN denote the rational 4-manifold CP2 \# N CP2. In this paper we study the stabilizer Stab(w) of a primitive, isotropic class w∈ H2(MN; Z) of minimal genus 0 under the natural action of the topological mapping class group Mod(MN) on H2(MN; Z). Although most elements of Stab(w) cannot be represented by homeomorphisms that preserve any Lefschetz fibration MN , we show that any element of Stab(w) can be represented by a diffeomorphism that almost preserves a holomorphic, genus-0 Lefschetz fibration pr: MN CP1 whose generic fibers represent the homology class w. We also answer the Nielsen realization problem for a certain maximal torsion-free, abelian subgroup w of Mod(MN) by finding a lift of w to Diff+(MN) ≤ Homeo+(MN) under the quotient map q: Homeo+(MN) Mod(MN) which can be made to almost preserve pr: MN CP1. All results of this paper also hold for every primitive, isotropic class w ∈ H2(MN; Z) if N ≤ 8 because any such class has minimal genus 0.