On the L2 estimates of the diffusion waves

Abstract

In this paper, we investigate the long-time behavior of the L2-norm of solutions to the Cauchy problem for the strongly damped wave equation on Rn, with particular focus on the low-dimensional cases n=1 and n=2. Although the energy is dissipative, the L2-norm may grow because of low-frequency effects. We compare the diffusion-wave profile of the strongly damped equation with the corresponding free-wave evolution generated by the same initial velocity. Introducing the difference operator D(t) between these two evolutions, we prove that in one dimension D(t) is controlled by Ct1/4\|g\|L1, showing that the free wave remains an effective asymptotic profile. In contrast, in two dimensions D(t) has a logarithmic lower bound when the mass of the initial velocity is nonzero, implying that the wave approximation fails. Corresponding estimates for the original solution are also obtained.