Locally decodable codes and the failure of cotype for projective tensor products | Zendy

Oded Regev | Zendy; Assaf Naor | Zendy; Jop Briët | Zendy

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Locally decodable codes and the failure of cotype for projective tensor products

Author(s) -

Oded Regev,

Assaf Naor,

Jop Briët

Publication year - 2012

Publication title -

electronic research announcements

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.865

H-Index - 23

ISSN - 1935-9179

DOI - 10.3934/era.2012.19.120

Subject(s) - tensor product , mathematics , banach space , product (mathematics) , combinatorics , connection (principal bundle) , space (punctuation) , discrete mathematics , pure mathematics , geometry , computer science , operating system

International audienceIt is shown that for every p is an element of (1, infinity) there exists a Banach space X of finite cotype such that the projective tensor product l(p) (circle times) over cap X fails to have finite cotype. More generally, if p(1); p(2); p(3) is an element of (1, infinity) satisfy 1/p(1) + 1/p(2) + 1/p(3) <= 1 then l(p1) (circle times) over capl(p2)(circle times) over capl(p3) does not have fi nite cotype. This is proved via a connection to the theory of locally decodable codes

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