Pablo dos Santos Corrêa Junior, Luiz Fernando de Oliveira Faria
Published 2024-06-03Version 1
This work aims to obtain a positive, smooth, even, and homoclinic to zero (i.e zero at infinity) solution to a non-autonomous, second-order, nonlinear differential equation involving quadratic growth on the derivative. We apply Galerkin's method combined with Strauss' approximation on the term involving the first derivative to obtain weak solutions. We also study the regularity of the solutions and the dependence on their existence with a parameter
Bounded and Almost Periodic Solutions for Second Order Differential Equation Involving Reflection of the Argument
Moments and the Range of the Derivative
Interlacing and non-orthogonality of spectral polynomials for the Lamé operator
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