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We investigate nonlinear singular fourth-order eigenvalue problems with nonlocal boundary condition u(4)(t)-λh(t)f(t,u,u′′)=0, 0<t<1, u(0)=u(1)=∫01a(s)u(s)ds, u′′(0)=u′′(1)=∫01b(s)u′′(s)ds, where a,b∈L1[0,1], λ>0, h may be singular at t=0 and/or 1. Moreover f(t,x,y) may also have singularity at x=0 and/or y=0. By using fixed point theory in cones, an explicit interval for λ is derived such that for any λ in this interval, the existence of at least one symmetric positive solution to the boundary value problem is guaranteed. Our results extend and improve many known results including singular and nonsingular cases. The associated Green's function for the above problem is also given

Symmetric Positive Solutions for Nonlinear Singular Fourth-Order Eigenvalue Problems with Nonlocal Boundary Condition