p Style Bounds in Orlicz Spaces Close to L2
Abstract
Let (i)i=1n be mutually orthogonal functions on a probability space such that \|i\|∞ ≤ 1 for all i ∈ [n]. Let α > 0. Let (u) = u2 α(u) for u ≥ u0, and (u) = c(α) u2 otherwise. u0 ≥ e and c(α) are constants chosen so that is a Young function, depending only on α. Our main result shows that with probability at least 1/4 over subsets I of [n], where I is constructed by choosing each index of [n] independently from a Bernoulli distribution, the following holds: |I| ≥ ne α+1(n) and for any a ∈ Cn, \|Σi ∈ I ai i \| ≤ K(α) α2( n) · \|a\|2. K(α) is a constant depending only on α. In the main Theorem of Ryou22, Ryou proved the result above to a constant factor, depending on p and α, when the Orlicz space is a Lp( L)pα space for p > 2 where |I| n2/p2 α /p(n). However, their work did not extend to the case where p=2, an open question in Iosevich25. Our result resolves the latter question up to n factors. Moreover, our result sharpens the constants of Limonova's main result in Limonova23 from a factor of n to a factor of n, if the orthogonal functions are bounded by a constant. In addition, our proof is much shorter and simpler than the latter's. Finally, to complement our main result, we give a probabilistic lower bound (subsets of [n] are selected by a Bernoulli distribution over [n]'s indices) that matches our main result's upper bound.
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