Decay estimate for the wave equation with a small potential

## Abstract We study the electromagnetic wave equation and the perturbed massless Dirac equation on ℝ~__t__~ × ℝ^3^: where the potentials __A__(__x__), __B__(__x__), and __V__(__x__) are assumed to be small but may be rough. For both equations, we prove the expected time decay rate of the solution

We study the asymptotic behavior of solutions of dissipative wave equations with space-time-dependent potential. When the potential is only time-dependent, Fourier analysis is a useful tool to derive sharp decay estimates for solutions. When the potential is only space-dependent, a powerful techniqu

We derive a fast decay estimate for the wave equation with a local degenerate dissipation of the type a(x)u t in a bounded domain Ω. The dissipative coefficient a(x) is a nonnegative function only on a neighborhood of some part of the boundary ∂Ω and may vanish somewhere in Ω. The results obtained e

Estimates for a Slowly-Varying Wave Equation with a Periodic Potential\* CATHLEEN S. MORAWETZ Consider the equation for t 2 0, where P ( t ) is a smooth function of period 2 ~. I n general the solutions of the homogeneous initial value problem will grow exponentially and so too will the solutions of