QMC strength for some random configurations on the sphere
A sequence $(X_N ) \subset \mathbb S^d$ of N-point sets from the d-dimensional sphere has QMC strength $s^*>d/2$ if it has worst-case error of optimal order, $N^{s/d}$, for Sobolev spaces of order $s$ for all $d/2 < s < s^*$ , and the order is not optimal for $s > s^*$ . In arXiv:1208.32...
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| Zusammenfassung: | A sequence $(X_N ) \subset \mathbb S^d$ of N-point sets from the
d-dimensional sphere has QMC strength $s^*>d/2$ if it has worst-case error of
optimal order, $N^{s/d}$, for Sobolev spaces of order $s$ for all $d/2 < s <
s^*$ , and the order is not optimal for $s > s^*$ . In arXiv:1208.3267
conjectured values of the strength are given for some well known point families
in $\mathbb S^2$ based on numerical results. We study the average QMC strength
for some related random configurations. |
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| DOI: | 10.48550/arxiv.2302.01001 |