Exponential decay estimates and smoothness of the moduli space of pseudoholomorphic curves
Kenji Fukaya, Yong-Geun Oh, Hiroshi Ohta, Kaoru Ono
Abstract
In this paper, we examine the dependence of standard gluing process for pseudoholomorphic curves under the change of the length $T$ of the neck-region with respect to the cylindrical metrics associated to the given analytic coordinates near the punctures in the setting of bordered open Riemann surface with boundary punctures. We establish exponential decay of the $T$-derivatives of the $T$-dependent family of glued solutions under the change of the length $T$ of the neck-region in a precise manner. This exponential decay estimate is an important ingredient to prove the smoothness of the Kuranishi structure constructed on the compactified moduli space of pseudoholomorphic curves given in the appendix of the authors' book. We also demonstrate the way how this smoothness follows from the exponential decay.