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In the Gaussian case, for all $p\ge4$, we prove that \[ \|\nabla f\|_{L^p(\gamma^n)} \le C(p)d^{\frac12+\theta_p}\|f\|_{L^p(\gamma^n)} \] for every polynomial $f$ of degree at most $d$, where $\theta_p\le \frac{2}{3p}$ and $\theta_p=0$ whenever $p$ is an even integer. Thus, in the even-integer case, we establish the sharp dependence on the degree conjectured by Eskenazis--Ivanisvili. For general $p\ge4$, the estimate improves upon their dimension-free inequality.
From: Egor Kosov [view email]
[v1]
Thu, 11 Jun 2026 17:01:24 UTC (22 KB)
[v2]
Wed, 1 Jul 2026 20:20:17 UTC (22 KB)
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