Localization of nonsmooth lower and upper functions for periodic boundary value problems

Abstract: In this paper we present conditions ensuring the existence and localization of lower and upper functions of the periodic boundary value problem $u"+k u=f(t,u)$, $ u(0)=u(2 \pi )$, $u'(0)=u'(2\pi )$, $k\in \R $, $k\ne 0.$ These functions are constructed as solutions of some related generalized linear problems and can be nonsmooth in general.

Keywords: second order nonlinear ordinary differential equation, periodic problem, lower and upper functions, generalized linear differential equation

Classification (MSC2000): 34B15, 34C25

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