Topology of multiple log transforms of 4-manifolds

Abstract

Given a 4-manifold X and an imbedding of T2 x B2 into X, we describe an algorithm X --> Xp,q for drawing the handlebody of the 4-manifold obtained from X by (p,q)-logarithmic transforms along the parallel tori. By using this algorithm, we obtain a simple handle picture of the Dolgachev surface E(1)p,q, from that we deduce that the exotic copy E(1)p,q # 5(-CP2) of E(1) # 5(-CP2) differs from the original one by a codimension zero simply connected Stein submanifold Mp,q, which are therefore examples of infinitely many Stein manifolds that are exotic copies of each other (rel boundaries). Furthermore, by a similar method we produce infinitely many simply connected Stein submanifolds Zp of E(1)p,2 # 2(-CP2)$ with the same boundary and the second Betti number 2, which are (absolutely) exotic copies of each other; this provides an alternative proof of a recent theorem of the author and Yasui [AY4]. Also, by using the description of S2 x S2 as a union of two cusps glued along their boundaries, and by using this algorithm, we show that multiple log transforms along the tori in these cusps do not change smooth structure of S2 x S2.