Hilbert complexes with mixed boundary conditions—Part 2: Elasticity complex
DOI10.1002/MMA.8242arXiv2108.10792OpenAlexW3194589966MaRDI QIDQ6182338
Publication date: 21 December 2023
Published in: Mathematical Methods in the Applied Sciences (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2108.10792
compact embeddingsmixed boundary conditionsde Rham complexHilbert complexesregular decompositionselasticity complexregular potentials
de Rham theory in global analysis (58A12) Differential complexes (58J10) Maxwell equations (35Q61) Inequalities applied to PDEs involving derivatives, differential and integral operators, or integrals (35A23)
Related Items (1)
Cites Work
- An elementary proof for a compact imbedding result in generalized electromagnetic theory
- Maxwell's boundary value problem on Riemannian manifolds with nonsmooth boundaries
- The index of some mixed order Dirac type operators and generalised Dirichlet-Neumann tensor fields
- Poincaré meets Korn via Maxwell: extending Korn's first inequality to incompatible tensor fields
- A global div-curl-lemma for mixed boundary conditions in weak Lipschitz domains and a corresponding generalized \(A_0^*\)-\(A_1\)-lemma in Hilbert spaces
- On the Maxwell and Friedrichs/Poincaré constants in ND
- Time-Harmonic Maxwell Equations in the Exterior of Perfectly Conducting, Irregular Obstacles
- The Maxwell Compactness Property in Bounded Weak Lipschitz Domains with Mixed Boundary Conditions
- On the Maxwell constants in 3D
- A local compactness theorem for Maxwell's equations
- A remark on a compactness result in electromagnetic theory
- A compactness result for vector fields with divergence and curl in Lq(ω) involving mixed boundary conditions
- The divDiv-complex and applications to biharmonic equations
- Solution Theory, Variational Formulations, and Functional a Posteriori Error Estimates for General First Order Systems with Applications to Electro-Magneto-Statics and More
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