Global existence for the Jordan--Moore--Gibson--Thompson equation in Besov spaces

Abstract

In this paper, we consider the Cauchy problem of a model in nonlinear acoustic, named the Jordan--Moore--Gibson--Thompson equation. This equation arises as an alternative model to the well-known Kuznetsov equation in acoustics. We prove global existence and optimal time decay of solutions in Besov spaces with a minimal regularity assumption on the initial data, lowering the regularity assumption required in RackeSaid2019 for the proof of the global existence. Using a time-weighted energy method with the help of appropriate Lyapunov-type estimates, we also extend the decay rate in RackeSaid2019 and show an optimal decay rate of the solution for initial data in the Besov space B2,∞-3/2(R3), which is larger than the Lebesgue space L1(3) due to the embedding L1(R% 3) B2,∞-3/2(R3). Hence we removed the L1-assumption on the initial data required in RackeSaid2019 in order to prove the decay estimates of the solution.