Pages that link to "Item:Q2822581"
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The following pages link to On the first nontrivial eigenvalue of the \(\infty\)-Laplacian with Neumann boundary conditions (Q2822581):
Displaying 20 items.
- The first nontrivial eigenvalue for a system of \(p\)-Laplacians with Neumann and Dirichlet boundary conditions (Q272723) (← links)
- The limit as \({p\to\infty}\) in the eigenvalue problem for a system of \(p\)-Laplacians (Q325965) (← links)
- On the geometry of the \(p\)-Laplacian operator (Q524553) (← links)
- The behavior of solutions to an elliptic equation involving a \(p\)-Laplacian and a \(q\)-Laplacian for large \(p\) (Q730413) (← links)
- Steklov eigenvalues for the \(\infty\)-Laplacian (Q996935) (← links)
- Eigenvalues for systems of fractional \(p\)-Laplacians (Q1799882) (← links)
- A sharp weighted anisotropic Poincaré inequality for convex domains (Q2012341) (← links)
- The first non-zero Neumann \(p\)-fractional eigenvalue (Q2347861) (← links)
- The limit as \(p \to + \infty\) of the first eigenvalue for the \(p\)-Laplacian with mixed Dirichlet and Robin boundary conditions (Q2349069) (← links)
- The Neumann eigenvalue problem for the \(\infty\)-Laplacian (Q2354076) (← links)
- Monotonicity with respect to \(p\) of the first nontrivial eigenvalue of the \(p\)-Laplacian with homogeneous Neumann boundary conditions (Q2658635) (← links)
- The inhomogeneous \(p\)-Laplacian equation with Neumann boundary conditions in the limit \(p\to \infty \) (Q2681444) (← links)
- An inequality à la Szegő-Weinberger for the \(p\)-Laplacian on convex sets (Q2828655) (← links)
- (Q3507038) (← links)
- Sharp Upper Bound to the First Nonzero Neumann Eigenvalue for Bounded Domains in Spaces of Constant Curvature (Q4864060) (← links)
- A system of local/nonlocal p-Laplacians: The eigenvalue problem and its asymptotic limit as p → ∞ (Q5081928) (← links)
- Extremal <i>p</i> -Laplacian eigenvalues (Q5243481) (← links)
- Shape derivative of the Cheeger constant (Q5250288) (← links)
- On the first eigenvalue of the Neumann problem (Q6113218) (← links)
- The best approximation of a given function in \(L^2\)-norm by Lipschitz functions with gradient constraint (Q6661345) (← links)
