Solvability conditions for some non-Fredholm operators with shifted arguments

Abstract

In the first part of the article we establish the existence in the sense of sequences of solutions in H2(R) for some nonhomogeneous linear differential equation in which one of the terms has the argument translated by a constant. It is shown that under the reasonable technical conditions the convergence in L2(R) of the source terms implies the existence and the convergence in H2(R) of the solutions. The second part of the work deals with the solvability in the sense of sequences in H2(R) of the integro-differential equation in which one of the terms has the argument shifted by a constant. It is demonstrated that under the appropriate auxiliary assumptions the convergence in L1(R) of the integral kernels yields the existence and the convergence in H2(R) of the solutions. Both equations considered involve the second order differential operator with or without the Fredholm property depending on the value of the constant by which the argument gets translated.

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