The existence of multiple positive solutions for singular functional differential equations with sign-changing nonlinearity

In this paper, we investigate the existence of positive solutions in case of the nonlinear fractional differential equation where 0 < s < 1, D s is the standard Riemann-Liouville fractional derivative, f : [0, ∞) → [0, ∞), f (0) > 0, a : [0, 1] → (-∞, +∞) may change sign, and > 0 is a parameter. Ou

A p-Laplacian system with Dirichlet boundary conditions is investigated. By analysis of the relationship between the Nehari manifold and fibering maps, we will show how the Nehari manifold changes as λ, µ varies and try to establish the existence of multiple positive solutions.

We consider the nonlinear singular differential equation where µ and σ are two positive Radon measures on 0 ω not charging points. For a regular function f and under some hypotheses on A, we prove the existence of an infinite number of nonnegative solutions. Our approach is based on the use of the