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arxiv: 2502.20152 · v1 · pith:HQ76HW5J · submitted 2025-02-27 · math.FA

Kolmogorov widths of balls in mixed norms: the case of rigidity

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classification math.FA
keywords ballscaselinearmixednormssubspaceswidthsapproximated
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We describe the set of parameters $(p_1,p_2,q_1,q_2)$ such that the balls $B_{q_1,q_2}^{s,b}$ are rigid in $\ell_{q_1,q_2}^{s,b}$ metric i.e. they are poorly approximated by linear subspaces of dimension $\le (1-\varepsilon)sb$, for large $s, b$. Thus we have settled an important qualitative case in the problem of estimating widths of balls in mixed norms. The proof combines lower bounds from our previous papers and a new construction for the approximation by linear subspaces in the so-called exceptional case.

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