Positive solutions for a mixed boundary problem

In this paper, we establish the existence of triple positive solutions of a two-point boundary value problem for the nonlinear singular second-order differential equations of mixed type with a p-Laplacian operator. We also demonstrate that the results obtained can be applied to study certain higher

We deal with the existence of solution for the nonlinear elliptic problem is a suitable function and λ > 0 is a real parameter. The nonlinearity f is allowed to behave like either f (x, s) s→0 -→ ∞ and/or f (x, s) s→∞ -→ ∞ for each x ∈ Ω.

We will be concerned with the focal boundary value problem (-1)'~An[p(t)Any (h,t,y(t) ..... An-ls/(t)), Ail/(0) = A'~+ill(b+ 1) ----0, 0 \_< i \_< n --1. Using cone theory in a Bausch space, we show that under certain Bumptioas on f, this focal boundary value problem has two positive solutions. In t