Existence results for Leibenson's equation on Riemannian manifolds

· 2026 · math.AP · arXiv 2601.20640

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abstract

We consider on an arbitrary Riemannian manifold $M$ the \textit{Leibenson equation} $\partial _{t}u=\Delta _{p}u^{q}$, that is also known as a \textit{doubly nonlinear evolution equation}. We prove that if $p>1, q>0$ and $pq\geq 1$ then the Cauchy-problem \begin{equation*} \left\{\begin{array}{ll}\partial _{t}u=\Delta _{p}u^{q} &\text{in}~M\times (0, \infty), \\u(x, 0)=u_{0}(x)& \text{in}~M,\end{array}\right.\end{equation*} has a unique weak solution for any $u_{0}\in L^{1}(M)\cap L^{\infty}(M)$.

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Long time upper bounds for solutions of Leibenson's equation on Riemannian manifolds

math.AP · 2026-04-25 · unverdicted · novelty 4.0

A certain upper bound for weak solutions of the Leibenson equation on Riemannian manifolds is equivalent to a Euclidean-type Sobolev inequality.

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Long time upper bounds for solutions of Leibenson's equation on Riemannian manifolds math.AP · 2026-04-25 · unverdicted · none · ref 29 · internal anchor
A certain upper bound for weak solutions of the Leibenson equation on Riemannian manifolds is equivalent to a Euclidean-type Sobolev inequality.

Existence results for Leibenson's equation on Riemannian manifolds

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