Pages that link to "Item:Q2828655"
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The following pages link to An inequality à la Szegő-Weinberger for the \(p\)-Laplacian on convex sets (Q2828655):
Displaying 16 items.
- The equality case in a Poincaré-Wirtinger type inequality (Q333006) (← links)
- An optimal anisotropic Poincaré inequality for convex domains (Q453225) (← links)
- On the geometry of the \(p\)-Laplacian operator (Q524553) (← links)
- On some unexpected properties of radial and symmetric eigenvalues and eigenfunctions of the \(p\)-Laplacian on a disk (Q526038) (← links)
- Optimal Szegő-Weinberger type inequalities (Q906794) (← links)
- An upper bound for nonlinear eigenvalues on convex domains by means of the isoperimetric deficit (Q971857) (← links)
- A toy Neumann analogue of the nodal line conjecture (Q1702165) (← links)
- Extension of Díaz-Saá's inequality in \(\mathbb{R}^N\) and application to a system of \(p\)-Laplacian. (Q1860942) (← links)
- A quantitative Weinstock inequality for convex sets (Q2007991) (← links)
- On the Cheeger inequality for convex sets (Q2050906) (← links)
- Lyapunov-type inequalities for partial differential equations with \(p\)-Laplacian (Q2126297) (← links)
- On principal frequencies and isoperimetric ratios in convex sets (Q2214734) (← links)
- Une inégalité du type Payne-Polya-Weinberger pour le laplacien brut (Q4425436) (← links)
- On principal frequencies and inradius in convex sets (Q5215074) (← links)
- Extremal <i>p</i> -Laplacian eigenvalues (Q5243481) (← links)
- The role of topology and capacity in some bounds for principal frequencies (Q6604716) (← links)
