A nonlinear singular perturbation problem

Abstract

Let F(u)+(u-w)=0 (1) where F is a nonlinear operator in a Hilbert space H, w∈ H is an element, and >0 is a parameter. Assume that F(y)=0, and F'(y) is not a boundedly invertible operator. Sufficient conditions are given for the existence of the solution to e1.1 and for the convergence 0\|u-y\|=0. An example of applications is considered. In this example F is a nonlinear integral operator.

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