Almost global existence for 2-D incompressible isotropic elastodynamics

Lei, Zhen; Sideris, Thomas; Zhou, Yi

doi:10.1090/tran/6294

Almost global existence for 2-D incompressible isotropic elastodynamics
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by Zhen Lei, Thomas C. Sideris and Yi Zhou PDF

Trans. Amer. Math. Soc. 367 (2015), 8175-8197 Request permission

Abstract:

We consider the Cauchy problem for 2-D incompressible isotropic elastodynamics. Standard energy methods yield local solutions on a time interval $[0,{T}/{\epsilon }]$ for initial data of the form $\epsilon U_0$, where $T$ depends only on some Sobolev norm of $U_0$. We show that for such data there exists a unique solution on a time interval $[0, \exp {T}/{\epsilon }]$, provided that $\epsilon$ is sufficiently small. This is achieved by careful consideration of the structure of the nonlinearity. The incompressible elasticity equation is inherently linearly degenerate in the isotropic case; in other words, the equation satisfies a null condition. This is essential for time decay estimates. The pressure, which arises as a Lagrange multiplier to enforce the incompressibility constraint, is estimated in a novel way as a nonlocal nonlinear term with null structure. The proof employs the generalized energy method of Klainerman, enhanced by weighted $L^2$ estimates and the ghost weight introduced by Alinhac.

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