Exotic elliptic surfaces without 1-handles
Abstract
In this article, we consider a sufficient condition that a knot-surgery or log-transformation of E(n) admits a handle decomposition without 1-handles. We show that if K is a knot that the bridge number is b(K) 9n, then the knot-surgery E(n)K of the elliptic surface E(n) admits a handle decomposition without 1-handles. This means that if (p,q)=1, and \p,q\ 9, then E(1)p,q admits a handle decomposition without 1-handles. We also show that if (p,q)=1, \p,q\ 4, then the double log-transformation E(n)p,q admits a handle decomposition without 1-handles for any positive integer n.
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