On the geography of simply connected nonspin symplectic 4-manifolds with nonnegative signature

Abstract

In AP3, AHP, the first author and his collaborators constructed the irreducible symplectic 4-manifolds that are homeomorphic but not diffeomorphic to (2n-1)CP2\#(2n-1)CP2 for each integer n ≥ 25, and the families of simply connected irreducible nonspin symplectic 4-manifolds with positive signature that are interesting with respect to the symplectic geography problem. In this paper, we improve the main results in AP3, AHP. In particular, we construct (i) an infinitely many irreducible symplectic and non-symplectic 4-manifolds that are homeomorphic but not diffeomorphic to (2n-1)CP2\#(2n-1)CP2 for each integer n ≥ 12, and (ii) the families of simply connected irreducible nonspin symplectic 4-manifolds that have the smallest Euler characteristics among the all known simply connected 4-manifolds with positive signature and with more than one smooth structure. Our construction uses the complex surfaces of Hirzebruch and Bauer-Catanese on Bogomolov-Miyaoka-Yau line with c12 = 9h = 45, along with the exotic symplectic 4-manifolds constructed in A4, AP1, ABBKP, AP2, AS.