Existence of solutions for discrete fractional boundary value problems with ap-Laplacian operator

Using perturbation results on the sums of ranges of nonlinear accretive mappings of Calvert and Gupta [B.D. Calvert, C.P. Gupta, Nonlinear elliptic boundary value problems in L p -spaces and sums of ranges of accretive operators, Nonlinear Anal. 2 (1978) 1-26], we present some abstract existence res

This paper proves the existence, multiplicity, and nonexistence of symmetric positive solutions to nonlinear boundary value problems with Laplacian operator. We improve and generalize some relative results. Our analysis mainly relies on the fixed point theorem of cone expansion and compression of no

Sufficient conditions for the existence of positive solutions of the nonlinear m-Laplacian boundary value problem are constructed, where m > 2 and f : [0, 1) x (0, oo) --\* (0, oo) satisfying f(t, u) is locally Lipschitz continuous for u 6 (0, cx)), and f(t,u)/u m-1 is strictly decreasing in u > 0