Existence and location result for a fourth order boundary value problems
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Abstract
In the present work we prove an existence and location result for the fourth order fully nonlinear equation
u^{(iv)}=f(t,u,u′,u′′,u′′′), 0<t<1,
with the Lidstone boundary conditions
u(0)=u′′(0)=u(1)=u′′(1)=0,
where f:[0,1]×R⁴→R is a continuous function satisfying a Nagumo type condition. The existence of at least a solution lying between a pair of well ordered lower and upper solutions is obtained using an a priori estimates, lower and upper solutions method and degree theory.