An explicit formula of the parameter dependence of de partial derivatives of the Green's functions related to arbitrary two-point boundary conditions

Abstract

In this paper we obtain an explicit formula of the parameter dependence of the partial derivatives of the Green's functions related to two-point boundary conditions. Such expression follows as an integral of both kernels times the difference of the corresponding parameters of each Green's function. As a direct consequence, we deduce a simpler proof of the monotony of the constant sign of the partial derivative of a Green's function with respect to a real parameter. As a consequence, we improve the results obtained in C1, where the monotone dependence was proved for the constant sign Green's function (not for any ot its partial derivatives) and under weaker assumptions on the Green's function. The arguments are valid for any other types of Ordinary Differential Equations coupled to Nonlocal Conditions. Moreover, analogous ideas could be developed for Partial and Fractional Differential Equations.

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