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arxiv: 2504.01864 · v3 · pith:ZLL7ZVAAnew · submitted 2025-04-02 · 🧮 math.FA · math.MG· math.PR

On the W-entropy and Shannon entropy power on RCD(K, N) and RCD(K, n, N) spaces

classification 🧮 math.FA math.MGmath.PR
keywords entropyspacesinequalityproveshannonlogarithmicmathbbpower
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In this paper, we prove the $W$-entropy formula and the monotonicity and rigidity theorem of the $W$-entropy for the heat flow on RCD$(K, N)$ and RCD$(K, n, N)$ spaces $(X, d, \mu)$, where $K\in \mathbb{R}$, $n\in \mathbb{N}$ is the geometric dimension of $(X, d, \mu)$ and $N\geq n$. We also prove the $K$-concavity of the Shannon entropy power on RCD$(K, N)$ spaces. As an application, we derive the Shannon entropy isoperimetric inequality and the Stam type logarithmic Sobolev inequality on RCD$(0, N)$ spaces with maximal volume growth condition. Finally, we prove the rigidity theorem for the Stam type logarithmic Sobolev inequality with sharp constant on noncollapsing RCD$(0, N)$ spaces.

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