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Sharp long distance upper bounds for solutions of Leibenson's equation on Riemannian manifolds

Published 29 Mar 2026 in math.AP and math.DG | (2603.27791v1)

Abstract: We consider on Riemannian manifolds the Leibenson equation $\partial {t}u=Δ{p}u{q}$ that is also known as a doubly nonlinear evolution equation. We prove sharp upper estimates of weak subsolutions to this equation on Riemannian manifolds with non-negative Ricci curvature in the whole range of $p>1$ and $q>0$ satisfying $q(p-1)<1$. In this way, we improve the result of \cite{Grigoryan2024a} and prove Conjecture 1.2 from \cite{Grigoryan2024a}.

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