Sharpening the gap between L1 and L2 norms

Abstract

We refine the classical Cauchy--Schwartz inequality \|X\|1 ≤ \|X\|2 by demonstrating that for any p and q with q>p>2, there exists a constant C=C(p,q) such that \|X\|1 ≤ 1 - C (\|X\|pp - 1)q-2q-p(\|X\|qq - 1)2-pq-p holds true for all Borel measurable random variables X with \|X\|2=1 and \|X\|p<∞. We illustrate two applications of this result: one for biased Rademacher sums and another for exponential sums.

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