Supercritical Moser-Trudinger inequalities and related elliptic problems

Abstract

Given α >0, we establish the following two supercritical Moser-Trudinger inequalities \[ u ∈ W1,n0, rad(B): ∫B |∇ u|n dx ≤ 1 ∫B ( (αn + |x|α) |u|nn-1 ) dx < +∞ \] and \[ u∈ W1,n0, rad(B): ∫B |∇ u|n dx ≤ 1 ∫B ( αn |u|nn-1 + |x|α ) dx < +∞, \] where W1,n0, rad(B) is the usual Sobolev spaces of radially symmetric functions on B in Rn with n≥ 2. Without restricting to the class of functions W1,n0, rad(B), we should emphasize that the above inequalities fail in W1,n0, rad(B). Questions concerning the sharpness of the above inequalities as well as the existence of the optimal functions are also studied. To illustrate the finding, an application to a class of boundary value problems on balls is presented. This is the second part in a set of our works concerning functional inequalities in the supercritical regime.