On Two Nonlinear Biharmonic Evolution Equations: Existence, Uniqueness and Stability
DOI10.1080/00036810410001647126zbMath1071.35042OpenAlexW2075607109WikidataQ58138016 ScholiaQ58138016MaRDI QIDQ4818346
Chun Liu, Ming-Jun Lai, Paul R. Wenston
Publication date: 28 September 2004
Published in: Applicable Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00036810410001647126
asymptotic behaviorexistence and uniquenessGinzburg-Landau type equationsliquid crystalsnonlinear biharmonic evolution equations
Asymptotic behavior of solutions to PDEs (35B40) Nonlinear parabolic equations (35K55) Stability in context of PDEs (35B35) Nonlinear elliptic equations (35J60) A priori estimates in context of PDEs (35B45) Variational methods for higher-order elliptic equations (35J35)
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Cites Work
- The effect of a singular perturbation on nonconvex variational problems
- The morphology and folding patterns of buckling-driven thin-film blisters
- Nonlinear continuum theory of smectic-\(A\) liquid crystals
- Radial configurations of smectic A materials and focal conics
- Smectic A liquid crystal configurations with interface defects
- Fast Reaction, Slow Diffusion, and Curve Shortening
- Local minimisers and singular perturbations
- Analysis and Approximation of the Ginzburg–Landau Model of Superconductivity
- On the Approximation Power of Splines on Triangulated Quadrangulations
- On Two Nonlinear Biharmonic Evolution Equations: Existence, Uniqueness and Stability
- Bivariate spline method for numerical solution of steady state Navier-Stokes equations over polygons in stream function formulation
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