Constant sign Green's function for simply supported beam equation

Abstract

The aim of this paper consists on the study of the following fourth-order operator: equationEc::T4 T[M]\,u(t) u(4)(t)+p1(t)\,u"'(t)+p2(t)\,u"(t)+M\,u(t)\,,\ t∈ I [a,b]\,, equation coupled with the two point boundary conditions: equationEc::cf u(a)=u(b)=u"(a)=u"(b)=0\,. equation So, we define the following space: equationEc::esp X= u∈ C4(I) u(a)=u(b)=u"(a)=u"(b)=0 \,. equation Here p1∈ C3(I) and p2∈ C2(I). By assuming that the second order linear differential equation equationEc::2or L2\, u(t) u"(t)+p1(t)\,u'(t)+p2(t)\,u(t)=0\,, t∈ I, equation is disconjugate on I, we characterize the parameter's set where the Green's function related to operator T[M] in X is of constant sign on I × I. Such characterization is equivalent to the strongly inverse positive (negative) character of operator T[M] on X and comes from the first eigenvalues of operator T[0] on suitable spaces.