Product of octahedra is badly approximated in the $\ell_{2,1}$-metric

Yu.V. Malykhin; K.S. Ryutin

arXiv:1606.00738·math.FA·June 3, 2016·2 cites

Product of octahedra is badly approximated in the $\ell_{2,1}$-metric

Yu.V. Malykhin, K.S. Ryutin

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TL;DR

This paper demonstrates that the Cartesian product of octahedra is poorly approximated by half-dimensional subspaces in a mixed-norm setting, impacting the understanding of widths of certain function classes in the $L_q$ metric.

Contribution

It establishes lower bounds for approximation errors of octahedral products in mixed-norm spaces, leading to new results on linear widths of H"older--Nikolskii classes.

Findings

01

Lower bounds for approximation in mixed-norm spaces

02

Implications for widths of H"older--Nikolskii classes

03

Quantitative estimates in the $oldsymbol{ ext{ell}_{2,1}}$-metric

Abstract

We prove that the cartesian product of octahedra $B_{1, \infty}^{n, m} = B_{1}^{n} \times \dots \times B_{1}^{n}$ ( $m$ octahedra) is badly approximated by half--dimensional subspaces in mixed--norm: $d_{N /2} (B_{1, \infty}^{n, m}, ℓ_{2, 1}^{n, m}) \geq c m$ , $N = mn$ . As a corollary the orders for linear widths of H\"older--Nikolskii classes $H_{p}^{r} (T^{d})$ in the $L_{q}$ metric are obtained for $(p, q)$ in a certain set (a domain in the parameter space).

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Taxonomy

TopicsMathematical Approximation and Integration · Point processes and geometric inequalities · Graph theory and applications