Nonlocal porous medium equation: Difference between revisions

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imported>Nestor
(Created page with "The nonlocal porous medium equation of order $\sigma$ is the name currently given to two very different equations, namely \[ u_t = \nabla \cdot \left ( u \nabla \mathcal{K_\alph...")
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Revision as of 01:37, 2 June 2011

The nonlocal porous medium equation of order $\sigma$ is the name currently given to two very different equations, namely

\[ u_t = \nabla \cdot \left ( u \nabla \mathcal{K_\alpha} (u) \right )\]

\[\mbox{ where } \mathcal{K}_\alpha(u) := C_{n,\alpha}\; u * |x|^{-n+\alpha},\;\; \alpha+2=\sigma \]

and

\[ u_t +(-\Delta)^{s}(u^m) = 0 \]

These equations agree when $s=1$ and $m=2$. They are fractional order Quasilinear equations.