On the persistence of spatial analyticity for the Beam Equation
Abstract
Persistence of spatial analyticity is studied for solution of the beam equation utt + (m+2) u + |u|p-1u = 0 on Rn × R. In particular, for a class of analytic initial data with a uniform radius of analyticity σ0, we obtain an asymptotic lower bound σ(t) c/ t on the uniform radius of analyticity σ(t) of solution u(·, t), as t → ∞.
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