Alberto Cabada, Lucía López-Somoza, Mouhcine Yousfi
abstract:
In this paper, we deduce several properties of Green's functions related to
Hill's equation coupled to various boundary value conditions. In particular, the
idea is to study Green's functions of the second order differential operator
coupled to the Neumann, Dirichlet, periodic and mixed boundary conditions, by
expressing Green's function of a given problem as a linear combination of
Green's functions of the other problems. This will allow us to compare different
Green's functions when their sign is constant. Finally, such properties of
Green's function of the linear problem will be fundamental to deduce the
existence of solutions to the nonlinear problem. The results are derived from
the fixed point theory applied to the related operators defined on suitable
cones in Banach spaces.
Mathematics Subject Classification: 34B05, 34B08, 34B09, 34B15, 34B18, 34B27, 34B30
Key words and phrases: Green's function, Hill's equation, comparison results, nonlinear boundary value problems