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Thin shell implies spectral gap up to polylog via a stochastic localization scheme

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abstract

We consider the isoperimetric inequality on the class of high-dimensional isotropic convex bodies. We establish quantitative connections between two well-known open problems related to this inequality, namely, the thin shell conjecture, and the conjecture by Kannan, Lovasz, and Simonovits, showing that the corresponding optimal bounds are equivalent up to logarithmic factors. In particular we prove that, up to logarithmic factors, the minimal possible ratio between surface area and volume is attained on ellipsoids. We also show that a positive answer to the thin shell conjecture would imply an optimal dependence on the dimension in a certain formulation of the Brunn-Minkowski inequality. Our results rely on the construction of a stochastic localization scheme for log-concave measures.

fields

cs.LG 1

years

2026 1

verdicts

UNVERDICTED 1

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A Mathematical Introduction to Diffusion Models

cs.LG · 2026-07-02 · unverdicted · novelty 0.0

An educational exposition that layers core definitions, simplified estimates, and research-level theorems on diffusion sampling for probability-background graduate students.

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  • A Mathematical Introduction to Diffusion Models cs.LG · 2026-07-02 · unverdicted · none · ref 22 · internal anchor

    An educational exposition that layers core definitions, simplified estimates, and research-level theorems on diffusion sampling for probability-background graduate students.