Limit Theorems for Distances in $l_p^n$-Balls

Research Paper #Probability, High-Dimensional Geometry, Statistics 🔬 Research|Analyzed: Jan 3, 2026 15:36•

Published: Dec 30, 2025 17:25

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1 min read

Analysis

This paper investigates the statistical properties of the Euclidean distance between random points within and on the boundaries of $l_p^n$-balls. The core contribution is proving a central limit theorem for these distances as the dimension grows, extending previous results and providing large deviation principles for specific cases. This is relevant to understanding the geometry of high-dimensional spaces and has potential applications in areas like machine learning and data analysis where high-dimensional data is common.

Key Takeaways

•Proves a central limit theorem for the Euclidean distance between random points in $l_p^n$-balls.
•Provides a compact proof for the spherical case (previously proven by Hammersley).
•Offers large deviation principles for cases where $p \geq 2$.

Reference / Citation

"The paper proves a central limit theorem for the Euclidean distance between two independent random vectors uniformly distributed on $l_p^n$-balls."

A

ArXivDec 30, 2025 17:25

* Cited for critical analysis under Article 32.

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