Pages that link to "Item:Q4599270"
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The following pages link to Layer potentials for general linear elliptic systems (Q4599270):
Displaying 17 items.
- Layer potentials and boundary value problems for elliptic systems in Lipschitz domains (Q810274) (← links)
- A multiple-layer potential theory alternative to Agmon's (Q1261968) (← links)
- The Neumann problem for higher order elliptic equations with symmetric coefficients (Q1751026) (← links)
- Layer potentials and Poisson problems for the nonsmooth coefficient Brinkman system in Sobolev and Besov spaces (Q1756639) (← links)
- Variational approach for the Stokes and Navier-Stokes systems with nonsmooth coefficients in Lipschitz domains on compact Riemannian manifolds (Q1794400) (← links)
- Layer potentials for the harmonic mixed problem in the plane (Q1950461) (← links)
- Critical perturbations for second-order elliptic operators. I: Square function bounds for layer potentials (Q2081324) (← links)
- Multilayer potentials for higher-order systems in rough domains (Q2236635) (← links)
- Boundary value problems for the Brinkman system with \(L^\infty\) coefficients in Lipschitz domains on compact Riemannian manifolds. A variational approach (Q2334871) (← links)
- On the convergence of local expansions of layer potentials (Q2870622) (← links)
- The method of layer potentials in<i>L<sup>p</sup></i>and endpoint spaces for elliptic operators with<i>L<sup>∞</sup></i>coefficients (Q2949679) (← links)
- Continuity of simple layer potentials generated by a generalized shift (Q3979360) (← links)
- Layer potential theory for the anisotropic Stokes system with variable <i>L</i><sub><i>∞</i></sub> symmetrically elliptic tensor coefficient (Q4957052) (← links)
- The Ẇ−1,p Neumann problem for higher order elliptic equations (Q5164828) (← links)
- Potentials and transmission problems in weighted Sobolev spaces for anisotropic Stokes and Navier–Stokes systems with <i>L</i><sub>∞</sub> strongly elliptic coefficient tensor (Q5205922) (← links)
- Gradient estimates and the fundamental solution for higher-order elliptic systems with lower-order terms (Q6162788) (← links)
- Skeleton integral equations for acoustic transmission problems with varying coefficients (Q6612255) (← links)
