Positive solutions for second-order superlinear repulsive singular Neumann boundary value problems

The existence of multiple positive solutions to superlinear periodic boundary value problems with repulsive singular forces is discussed in this paper. Our nonlinearity may be singular in its dependent variable and our analysis relies on a nonlinear alternative of Leray-Schauder type and on a fixed

New existence results are presented for the second-order equation y" + f(t, y) = 0, 0 < t < 1 with Dirichlet or mixed boundary data. In our theory the nonlinearity f is allowed to change sign.

This paper investigates 2mth-order (m > 1) superlinear singular two-point boundary value problems and obtains some necessary and sufficient conditions for existence of C2(m-') or C2m-1 positive solutions on the closed interval.

This paper is devoted to study the existence of positive solutions to the second-order semipositone periodic boundary value problem x'+ a(t)x = f(t,x), x(O) = x(1), xt(0) = xt(1). Here, f(t, x) may be singular at x = 0 and may be superlinear at x = +c¢. Our analysis relies on a fixed-point theorem