Blow-up and lifespan estimate for wave equations with critical damping term of space-dependent type related to Glassey conjecture

Abstract

The main purpose of the present paper is to study the blow-up problem of the wave equation with space-dependent damping in the scale-invariant case and time derivative nonlinearity with small initial data. Under appropriate initial data which are compactly supported, by using a test function method and taking into account the effect of the damping term (μ1+|x|2ut), we provide that in higher dimensions the blow-up region is given by p ∈ (1, pG(N+μ)] where pG(N) is the Glassey exponent. Furthermore, we shall establish a blow-up region, independent of μ given by p∈ (1, 1+2N), for appropriate initial data in the energy space with noncompact support.