Global small data weak solutions of 2-D semilinear wave equations with scale-invariant damping, III

Abstract

For the 2-D semilinear wave equation with scale-invariant damping u+μt∂tu=|u|p, where t≥ 1, μ>0 and p>1, it is conjectured that the global small data weak solution u exists when p>ps(2+μ) =μ+3+μ2+14μ+172(μ+1) for 0<μ≤ 2 and p>pf(2)=2 for μ≥ 2. In our previous papers, the global small solution u has been obtained for p>ps(2+μ) and 0<μ<2 but μ=1. In the present paper, by the vector field method together with the delicate analysis on the Bessel functions, we will show the global existence of small solution u for p>2 and μ>2. In forthcoming paper, for μ=1 and p>ps(2+μ)=ps(3)=1+ 2, the global solution u is also obtained. Therefore, collecting our series of conclusions together with partial results from others, this open question has been solved completely.