Eigenvalue, bifurcation, existence and nonexistence of solutions for Monge-Amp\`ere equations

Abstract

In this paper we study the following eigenvalue boundary value problem for Monge-Amp\`ere equations: equation \arrayl (D2u)=λN f(-u)\,\, in\,\, , u=0,\,on\,\, ∂ . array. equation We establish the unilateral global bifurcation results for the problem with f(u)=uN+g(u) and being the unit ball of RN. More precisely, under some natural hypotheses on the perturbation function g:R→R, we show that (λ1,0) is a bifurcation point of the problem and there are two distinct unbounded continua of one-sign solutions, where λ1 is the first eigenvalue of the problem with f(u)=uN. As the applications of the above results, we consider with determining interval of λ, in which there exist solutions for this problem in unit ball. Moreover, we also get some results on the existence and nonexistence of convex solutions for this problem in general domain by domain comparison method.