On an inequality of Sagher and Zhou concerning Stein's lemma
- Autores: Marco Annoni, Loukas Grafakos, Petr Honzík
- Localización: Collectanea mathematica, ISSN 0010-0757, Vol. 60, Fasc. 3, 2009, págs. 296-306
- Idioma: español
- Enlaces
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Resumen
We provide two alternative proofs of the following formulation of Stein’s lemma obtained by Sagher and Zhou [6]: there exists a constant A > 0 such that for any measurable setE⊂ [0, 1], |E| ≠ 0, there is an integerN that depends only onE such that for any square-summable real-valued sequence {ck}_k^=0/∞ we have:
A \cdot \sum\limits_{k > N} {\left| {c_k } \right|} ^2 \leqslant \mathop {sup}\limits_I \mathop {inf}\limits_{a \in \mathbb{R}} \frac{1}{{\left| I \right|}} \int_{I \cap E} {\left| {f(t) - a} \right|^2 } dt, where the supremum is taken over all dyadic intervals I and f(t) = \sum\limits_{k = 0}^\infty {c_k r_k } (t), wherer k denotes thekth Rademacher function. The first proof does not rely on Khintchine’s inequality while the second is succinct and applies to general lacunary Walsh series.
