On the existence of positive solution for a Neumann problem with double critical exponents in half-space

In this paper, we consider the existence and nonexistence of positive solution for a Neumann problem with double critical exponents and fast increasing weighted in half-space. This problem is closely related to the study of self-similar solutions for nonlinear heat equation. By applying the Mountain Pass Theorem without (PS) condition and the delicate estimates for the Mountain Pass level, we obtain the existence of a positive solution under different assumptions. Meanwhile, some nonexistence results for this problem is also obtained by an improved Pohozaev identity and Hardy inequality according to the value of the parameters. Particularly, we give the best lower bound of the parameter for the existence of a positive solution of this problem if dimension N=4.