RT Journal Article
T1 Existence of solutions of nonlinear systems subject to arbitrary linear non-local boundary conditions
A1 Cabada Fernández, Alberto
A1 López Somoza, Lucía
A1 Yousfi, Mouhcine
K1 Green’s function
K1 Nonlinear systems
K1 Non-local boundary conditions
AB In this paper, we obtain an explicit expression for the Green’s function of a certain type of systems of differential equations subject to non-local linear boundary conditions. In such boundary conditions, the dependence on certain parameters is considered. The idea of the study is to transform the given system into another first-order differential linear system together with the two-point boundary value conditions. To obtain the explicit expression of the Green’s function of the considered linear system with non-local boundary conditions, it is assumed that the Green’s function of the homogeneous problem, that is, when all the parameters involved in the non-local boundary conditions take the value zero, exists and is unique. In such a case, the homogeneous problem has a unique solution that is characterized by the corresponding Green’s function g. The expression of the Green’s function of the given system is obtained as the sum of the function g and a part that depends on the parameters involved in the boundary conditions and the expression of function g. The novelty of our work is that in the system to be studied, the unknown functions do not appear separated neither in the equations nor in the boundary conditions. The existence of solutions of nonlinear systems with linear non-local boundary conditions is also studied. We illustrate the obtained results in this paper with examples.
PB Springer
SN 1661-7738
YR 2023
FD 2023
LK http://hdl.handle.net/10347/33044
UL http://hdl.handle.net/10347/33044
LA eng
NO Cabada, A., López-Somoza, L. & Yousfi, M. Existence of solutions of nonlinear systems subject to arbitrary linear non-local boundary conditions. J. Fixed Point Theory Appl. 25, 81 (2023). https://doi.org/10.1007/s11784-023-01083-7
NO Partially supported by Grant PID2020-113275GB-I00 funded by MCIN/AEI/10.13039/501100011033 and by “ERDF Away of making Europe” of the“EuropeanUnion”.
DS Minerva
RD 29 abr 2026