Existence and convergence of the Beris-Edwards system with general Landau-de Gennes energy
Abstract
In this paper, we investigate the Beris-Edwards system for both biaxial and uniaxial Q-tensors with a general Landau-de Gennes energy density depending on four non-zero elastic constants. We prove existence of the strong solution of the Beris-Edwards system for uniaxial Q-tensors up to a maximal time. Furthermore, we prove that the strong solutions of the Beris-Edwards system for biaxial Q-tensors converge smoothly to the solution of the Beris-Edwards system for uniaxial Q-tensors up to its maximal existence time.
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