Pages that link to "Item:Q535194"

The following pages link to Global comparison principles for the \(p\)-Laplace operator on Riemannian manifolds (Q535194):

Displaying 11 items.

• A Thomson's principle and a Rayleigh's monotonicity law for nonlinear networks (Q345033) (← links)
• A general comparison theorem for \(p\)-harmonic maps in homotopy class (Q412433) (← links)
• Stokes theorem, volume growth and parabolicity (Q654022) (← links)
• Potential theory for manifolds with boundary and applications to controlled mean curvature graphs (Q1683969) (← links)
• The Liouville theorem for \(p\)-harmonic functions and quasiminimizers with finite energy (Q2223536) (← links)
• On the Dirichlet problem for \(p\)-harmonic maps. I: Compact targets (Q2516432) (← links)
• Liouville properties for \(p\)-harmonic maps with finite \(q\)-energy (Q2796507) (← links)
• Global divergence theorems in nonlinear PDEs and geometry (Q2879453) (← links)
• A divergence theorem for non-compact Riemannian manifolds: a dynamical approach (Q4623160) (← links)
• Analysis of weighted p-harmonic forms and applications (Q5243548) (← links)
• Comparability of partial differential operators and manifold linearity (Q5424651) (← links)