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1. Verfasser: Jaguzović, Vladan
Format: Preprint
Veröffentlicht: 2024
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Online-Zugang:https://arxiv.org/abs/2408.17093
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author Jaguzović, Vladan
author_facet Jaguzović, Vladan
contents Let \(P_+\) be the Riesz's projection operator and let \(P_-=I-P_+.\) We find the best upper estimates of the expression \(\left\lVert \left( \left\lvert P_+f \right\rvert ^s + \left\lvert P_-f \right\rvert ^s \right) ^{1/s} \right\rVert _p \) in terms of Lebesgue p-norm of the function \(f \in L^p(\mathbf{T})\) for \(p \in (4/3,2)\) and \(0 < s \leq \frac{p}{p-1},\) thus extending results from \cite{Melentijevic_2022} and \cite{Melentijevic_2023}, where the mentioned range is not considered. Also, we find the best lower estimates of the same quantities for \(p \in (2,4)\) and \(s \geq \frac{p}{p-1},\) thus extending results from \cite{melentijevic-reverse-2025}.
format Preprint
id arxiv_https___arxiv_org_abs_2408_17093
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On Hollenbeck-Verbitsky conjecture for $4/3 < p < 2$ and reverse Riesz-type inequalities for $2<p<4$
Jaguzović, Vladan
Complex Variables
Let \(P_+\) be the Riesz's projection operator and let \(P_-=I-P_+.\) We find the best upper estimates of the expression \(\left\lVert \left( \left\lvert P_+f \right\rvert ^s + \left\lvert P_-f \right\rvert ^s \right) ^{1/s} \right\rVert _p \) in terms of Lebesgue p-norm of the function \(f \in L^p(\mathbf{T})\) for \(p \in (4/3,2)\) and \(0 < s \leq \frac{p}{p-1},\) thus extending results from \cite{Melentijevic_2022} and \cite{Melentijevic_2023}, where the mentioned range is not considered. Also, we find the best lower estimates of the same quantities for \(p \in (2,4)\) and \(s \geq \frac{p}{p-1},\) thus extending results from \cite{melentijevic-reverse-2025}.
title On Hollenbeck-Verbitsky conjecture for $4/3 < p < 2$ and reverse Riesz-type inequalities for $2<p<4$
topic Complex Variables
url https://arxiv.org/abs/2408.17093