On Weissler's conjecture on the Hamming cube I
Abstract
Let 1≤ p ≤ q <∞, and let w ∈ C. Weissler conjectured that the Hermite operator ew is bounded as an operator from Lp to Lq on the Hamming cube \-1,1\n with the norm bound independent of n if and only if align* |p-2-e2w(q-2)|≤ p-|e2w|q. align* It was proved by Bonami (1970), Beckner (1975), and Weissler (1979) in all cases except 2<p≤ q <3 and 3/2<p≤ q <2, which stood open until now. The goal of this paper is to give a full proof of Weissler's conjecture in the case p=q. Several applications will be presented.
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