Large time behavior for the classical wave equation with different regular data and its applications

Abstract

In this paper, we mainly consider large time behavior for the classical free wave equation utt- u=0 in Rn. We derive some large time optimal estimates for the quantity of solution \|u(t,·)\|L2 with initial data belonging to L2 or with additional weighted L1 integrabilities. Particularly, some thresholds are discovered for the (local or global in time) stabilization of this quantity. We also apply these results to the wave equation with scale-invariant terms, the undamped σ-evolution equation, the critical Moore-Gibson-Thompson equation, and the linearized compressible Euler system.