Locally decodable codes and the failure of cotype for projective tensor products
Abstract
It is shown that for every p∈ (1,∞) there exists a Banach space X of finite cotype such that the projective tensor product p X fails to have finite cotype. More generally, if p1,p2,p3∈ (1,∞) satisfy 1p1+1p2+1p3 1 then p1p2p3 does not have finite cotype. This is a proved via a connection to the theory of locally decodable codes.
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