Continuous branches of positive solutions for a class of nonlinear second-order differential equations

We prove the existence of positive solutions to the scalar equation y (x) + F (x, y, y ) = 0. Applications to semilinear elliptic equations in exterior domains are considered.

Necessary and sufficient conditions are obtained for the existence of positive solutions of a nonlinear differential equation. Relations between this equation and an advanced type nonlinear differential equation are also discussed. ᮊ 1998 Aca- demic Press y t G t . The solutions vanishing in some ne

We obtain an existence theorem for monotone positive solutions of nonlinear second-order ordinary di erential equations by using the Schauder-Tikhonov ÿxed point theorem. The result can also be applied to prove the existence of positive solutions of certain semilinear elliptic equations in R n (n ¿

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.