Wave equations with logarithmic nonlinearity on hyperbolic spaces

Abstract

In light of the exponential decay of solutions of linear wave equations on hyperbolic spaces Hn, to illustrate the critical nature, we investigate nonlinear wave equations with logarithmic nonlinearity, which behaves like ( 1/|u|)1-p|u| near u=0, on hyperbolic spaces. Concerning the global existence vs blow up with small data, we expect that the problem admits a critical power pc(n)>1. When n=3, we prove that the critical power is 3, by proving global existence for p>3, as well as generically blow up for p∈ (1,3).