On $\ell_4 : \ell_2$ ratio of functions with restricted Fourier support
Given a subset $A \subseteq \{0,1\}^n$, let $\mu(A)$ be the maximal ratio between $\ell_4$ and $\ell_2$ norms of a function whose Fourier support is a subset of $A$. We make some simple observations about the connections between $\mu(A)$ and the additive properties of $A$ on one hand, and between $\...
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creator | Kirshner, Naomi Samorodnitsky, Alex |
description | Given a subset $A \subseteq \{0,1\}^n$, let $\mu(A)$ be the maximal ratio
between $\ell_4$ and $\ell_2$ norms of a function whose Fourier support is a
subset of $A$. We make some simple observations about the connections between
$\mu(A)$ and the additive properties of $A$ on one hand, and between $\mu(A)$
and the uncertainty principle for $A$ on the other hand. One application
obtained by combining these observations with results in additive number theory
is a stability result for the uncertainty principle on the discrete cube.
Our more technical contribution is determining $\mu(A)$ rather precisely,
when $A$ is a Hamming sphere $S(n,k)$ for all $0 \le k \le n$. |
doi_str_mv | 10.48550/arxiv.1801.08507 |
format | Article |
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between $\ell_4$ and $\ell_2$ norms of a function whose Fourier support is a
subset of $A$. We make some simple observations about the connections between
$\mu(A)$ and the additive properties of $A$ on one hand, and between $\mu(A)$
and the uncertainty principle for $A$ on the other hand. One application
obtained by combining these observations with results in additive number theory
is a stability result for the uncertainty principle on the discrete cube.
Our more technical contribution is determining $\mu(A)$ rather precisely,
when $A$ is a Hamming sphere $S(n,k)$ for all $0 \le k \le n$.</description><identifier>DOI: 10.48550/arxiv.1801.08507</identifier><language>eng</language><subject>Mathematics - Combinatorics</subject><creationdate>2018-01</creationdate><rights>http://arxiv.org/licenses/nonexclusive-distrib/1.0</rights><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>228,230,780,885</link.rule.ids><linktorsrc>$$Uhttps://arxiv.org/abs/1801.08507$$EView_record_in_Cornell_University$$FView_record_in_$$GCornell_University$$Hfree_for_read</linktorsrc><backlink>$$Uhttps://doi.org/10.48550/arXiv.1801.08507$$DView paper in arXiv$$Hfree_for_read</backlink></links><search><creatorcontrib>Kirshner, Naomi</creatorcontrib><creatorcontrib>Samorodnitsky, Alex</creatorcontrib><title>On $\ell_4 : \ell_2$ ratio of functions with restricted Fourier support</title><description>Given a subset $A \subseteq \{0,1\}^n$, let $\mu(A)$ be the maximal ratio
between $\ell_4$ and $\ell_2$ norms of a function whose Fourier support is a
subset of $A$. We make some simple observations about the connections between
$\mu(A)$ and the additive properties of $A$ on one hand, and between $\mu(A)$
and the uncertainty principle for $A$ on the other hand. One application
obtained by combining these observations with results in additive number theory
is a stability result for the uncertainty principle on the discrete cube.
Our more technical contribution is determining $\mu(A)$ rather precisely,
when $A$ is a Hamming sphere $S(n,k)$ for all $0 \le k \le n$.</description><subject>Mathematics - Combinatorics</subject><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2018</creationdate><recordtype>article</recordtype><sourceid>GOX</sourceid><recordid>eNotzz1PwzAUhWEvDKjwA5i4Q9eE6zjGvmyoogWpUpeOlSLHuVEtpUnkOHz8eyAwnXc60iPEncS8tFrjg4uf4T2XFmWOVqO5FrtDD-sTd11VwhMsUawhuhQGGFpo597_ZD_BR0hniDylGHziBrbDHANHmOZxHGK6EVet6ya-_d-VOG5fjpvXbH_YvW2e95l7NCbzSKSkahRbwyRrQ9JobGpsSl0UhUc2UjEheyLvLSFh6RU7S1I6XddqJe7_bhdJNcZwcfGr-hVVi0h9A0e7RNE</recordid><startdate>20180125</startdate><enddate>20180125</enddate><creator>Kirshner, Naomi</creator><creator>Samorodnitsky, Alex</creator><scope>AKZ</scope><scope>GOX</scope></search><sort><creationdate>20180125</creationdate><title>On $\ell_4 : \ell_2$ ratio of functions with restricted Fourier support</title><author>Kirshner, Naomi ; Samorodnitsky, Alex</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-a677-c099313d3e87e91b791750db0d45222c0e713e90ec99cc890904c3ea8911a5bb3</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2018</creationdate><topic>Mathematics - Combinatorics</topic><toplevel>online_resources</toplevel><creatorcontrib>Kirshner, Naomi</creatorcontrib><creatorcontrib>Samorodnitsky, Alex</creatorcontrib><collection>arXiv Mathematics</collection><collection>arXiv.org</collection></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext_linktorsrc</fulltext></delivery><addata><au>Kirshner, Naomi</au><au>Samorodnitsky, Alex</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>On $\ell_4 : \ell_2$ ratio of functions with restricted Fourier support</atitle><date>2018-01-25</date><risdate>2018</risdate><abstract>Given a subset $A \subseteq \{0,1\}^n$, let $\mu(A)$ be the maximal ratio
between $\ell_4$ and $\ell_2$ norms of a function whose Fourier support is a
subset of $A$. We make some simple observations about the connections between
$\mu(A)$ and the additive properties of $A$ on one hand, and between $\mu(A)$
and the uncertainty principle for $A$ on the other hand. One application
obtained by combining these observations with results in additive number theory
is a stability result for the uncertainty principle on the discrete cube.
Our more technical contribution is determining $\mu(A)$ rather precisely,
when $A$ is a Hamming sphere $S(n,k)$ for all $0 \le k \le n$.</abstract><doi>10.48550/arxiv.1801.08507</doi><oa>free_for_read</oa></addata></record> |
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subjects | Mathematics - Combinatorics |
title | On $\ell_4 : \ell_2$ ratio of functions with restricted Fourier support |
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