On the study of solutions for a non linear differential equation on compact Riemannian Manifolds

Abstract

In this paper we study the existence of solutions for a class of non-linear differential equation on compact Riemannian manifolds. We establish a lower and upper solutions' method to show the existence of a smooth positive solution for the equation (EQ1) equation E4 u \ + \ a(x)u \ = \ f(x)F(u) \ + \ h(x)H(u), (EQ1) equation where \ a, \ f, \ h \ are positive smooth functions on Mn, a n-dimensional compact Riemannian manifold, and \ F, \ H \ are non-decreasing smooth functions on R. In djadli the equation (EQ1) was studied when F(u)=u2-1 and H(u)=uq in the Riemannian context, i.e., equation E3 u \ + \ a(x)u \ = \ f(x)u2-1 \ + \ h(x)uq, (EQ2) equation where \ 0 \ < \ q \ < 1. In correa Corr\ea, Goncalves and Melo studied an equation of the type equation (EQ2), in the Euclidean context.