New thresholds separate diffusion-wave and non-diffusive regimes for low-regularity solutions of the structurally damped wave equation u_tt - Δu + Δ²u_t = 0.
Asymptotic profiles for damped plate equations with rotational inertia terms
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abstract
We consider the Cauchy problem for plate equations with rotational inertia and frictional damping terms. We will derive asymptotic profiles of the solution in L^2-sense as time goes to infinity in the case when the initial data have high and low regularity, respectively. Especially, in the low regularity case of the initial data one encounters the regularity-loss structure of the solutions, and the analysis is more delicate. We employ the so-called Fourier splitting method combined with the explicit expression of the solutions (high frequency estimates) and the method due to Ikehata (low frequency estimates).
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math.AP 1years
2019 1verdicts
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Thresholds for low regularity solutions to wave equations with structural damping
New thresholds separate diffusion-wave and non-diffusive regimes for low-regularity solutions of the structurally damped wave equation u_tt - Δu + Δ²u_t = 0.