Blowup of the solution to a nonlinear system of Sobolev-type equations

P. A. Chubenko

Faculty of Physics, Moscow State University, Moscow, 119992, Russia

Abstract: An initial-boundary value problem is considered for a fifth-order nonlinear equation describing the dynamics of a Kelvin–Voigt fluid with allowance for strong spatial dispersion in the presence of sources with a cubic nonlinearity. A local existence theorem is proved. The method of energy inequalities is used to find sufficient conditions for the solution to blowup in a finite time.

Key words: Kelvin–Voigt fluid, Sobolev-type equation, strong generalized solution, contraction mapping principle, method of differential inequalities, solution blowup.

UDC: 519.63

Received: 16.05.2008

 English version: Computational Mathematics and Mathematical Physics, 2009, 49:4, 638–646

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