On the geometry of random polytopes
classification
🧮 math.FA
keywords
randomgammaabsconvassumptionsbiglbigrcopiesentries
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We present a simple proof to a fact recently established in [5]: let $\xi$ be a symmetric random variable that has variance $1$, let $\Gamma=(\xi_{ij})$ be an $N \times n$ random matrix whose entries are independent copies of $\xi$, and set $X_1,...,X_N$ to be the rows of $\Gamma$. Then under minimal assumptions on $\xi$ and as long as $N \geq c_1n$, $$ c_2 \bigl(B_\infty^n \cap \sqrt{\log(eN/n)} B_2^n \bigr) \subset {\rm absconv}(X_1,...,X_N) $$ with high probability.
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Cited by 1 Pith paper
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On the geometry of polytopes generated by heavy-tailed random vectors
Under minimal assumptions on X, centrally symmetric random polytopes generated by N ≳ n copies of X contain the polar of its floating body with high probability.
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