Morawetz type estimate for damped wave equation in Rn (n≥ 4) and its application
Abstract
In this paper we establish a Morawetz type etimate for the linear inhomogeneous wave equation with time-dependent scale invariant damping in Rn (n≥ 4). The novelty is that we view the differential operator +μt∂t as n+1+μ dimensional operator, then a well-matched multiplier is introduced. As an application, a sharp global existence result for the small data Cauchy problem of the semilinear wave equation \[ ∂t2u- u+∂tut=|u|p,~~~t>t0≥ 0 \] is obtained in Rn (n≥ 4).
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