Solvability of coupled systems of generalized Hammerstein-type integral equations in the real line
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Abstract
In this work, we consider a generalized coupled system of integral equations of
Hammerstein-type with, eventually, discontinuous nonlinearities. The main existence tool is
Schauder’s fixed point theorem in the space of bounded and continuous functions with bounded and
continuous derivatives on R, combined with the equiconvergence at ±∞ to recover the compactness
of the correspondent operators. To the best of our knowledge, it is the first time where coupled
Hammerstein-type integral equations in real line are considered with nonlinearities depending on
several derivatives of both variables and, moreover, the derivatives can be of different order on each
variable and each equation. On the other hand, we emphasize that the kernel functions can change
sign and their derivatives in order to the first variable may be discontinuous. The last section contains
an application to a model to study the deflection of a coupled system of infinite beams.
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Minhós, F.; de Sousa, R. Solvability of Coupled Systems of Generalized Hammerstein-Type Integral Equations in the Real Line. Mathematics 2020, 8(1), 111; https://doi.org/10.3390/math8010111.
https://www.mdpi.com/2227-7390/8/1/111