Tallennettuna:
| Päätekijä: | |
|---|---|
| Aineistotyyppi: | Preprint |
| Julkaistu: |
2023
|
| Aiheet: | |
| Linkit: | https://arxiv.org/abs/2310.06821 |
| Tagit: |
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Sisällysluettelo:
- We show that there exists an absolute constant $c_0<1$ such that for all $n \ge 2$, any measurable set $A \subset S^{n-1}$ of density at least $c_0$ contains $n$ pairwise orthogonal vectors. The result is sharp up to the value of the constant $c_0$. Moreover, we show that for all $2\le k \le n$ a set $A$ avoiding $k$ pairwise orthogonal vectors has measure at most $\exp(-c_1 \min\{\sqrt{n}, n/k\})$ for some $c_1>0$. Proofs rely on the harmonic analysis on the sphere and the hypercontractive inequality.