Existence of positive solutions for second-order ODEs with reverse Carathéodory functions

We afford a existence criterion of positive solutions of a boundary value problem concerning a second order functional differential equation by using the Krasnoselskii fixed point theorem on cones in Banach spaces. Moreover, we also apply our results to establish several existence theorems of multip

We consider the nonlinear neutral differential equations. This work contains some sufficient conditions for the existence of a positive solution which is bounded with exponential functions. The case when the solution converges to zero is also treated.

We use a fixed-point theorem in cones to investigate the existence of positive solutions for boundary value problem of a second-order Functional Differential Equation (FDE) with the form: where yt(O) = y(t + O) for # E [-%a]. We allow that r(t) has the singularity at the endpoints t = 0 and t = 1 o

This paper is concerned with the following system on time scale T: where 0, T ∈ T and T > 0. By using the theory of the fixed point index, we investigate the effect of σ 2 (T ) on the existence and nonexistence of positive solution for the above system in sublinear cases. The results obtained are e

In this paper, a new fixed-point theorem of functional type in a cone is established. With using the new fixed-point theorem and imposing growth conditions on the nonlinearity, the existence of three positive solutions for the boundary value problem x"(O+f(t,x(t),x'(t))=O , 0<t<l, x(0) = x(1) = 0,