Pairs of positive periodic solutions of nonlinear ODEs with indefinite weight: a topological degree approach for the super-sublinear case

Abstract

We study the periodic and the Neumann boundary value problems associated with the second order nonlinear differential equation equation* u'' + c u' + λ a(t) g(u) = 0, equation* where g [0,+∞[ [0,+∞[ is a sublinear function at infinity having superlinear growth at zero. We prove the existence of two positive solutions when ∫0T a(t) \!dt < 0 and λ > 0 is sufficiently large. Our approach is based on Mawhin's coincidence degree theory and index computations.