Critical exponent for the semilinear wave equations with a damping increasing in the far field

Abstract

We consider the Cauchy problem of the semilinear wave equation with a damping term align* utt - u + c(t,x) ut = |u|p, (t,x)∈ (0,∞)× RN, u(0,x) = u0(x), \ ut(0,x) = u1(x), x∈ RN, align* where p>1 and the coefficient of the damping term has the form align* c(t,x) = a0 (1+|x|2)-α/2 (1+t)-β align* with some a0 > 0, α < 0, β ∈ (-1, 1]. In particular, we mainly consider the cases α < 0, β =0 or α < 0, β = 1, which imply α + β < 1, namely, the damping is spatially increasing and effective. Our aim is to prove that the critical exponent is given by p = 1+ 2N-α. This shows that the critical exponent is the same as that of the corresponding parabolic equation c(t,x) vt - v = |v|p. The global existence part is proved by a weighted energy estimates with an exponential-type weight function and a special case of the Caffarelli-Kohn-Nirenberg inequality. The blow-up part is proved by a test-function method introduced by Ikeda and Sobajima (arXiv:1710.06780v1). We also give an upper estimate of the lifespan.