The optimal hypercontractive constants for Z3 and biased Bernoulli random variables

Abstract

We resolve a folklore problem of determining the optimal hypercontractive constants rp,q(Z3) for the cyclic group Z3 for all 1 < p < q < ∞. More precisely, we have \[ rp,q(Z3) = (1 + 2x)(1 - y)(1 + 2y)(1 - x), \] where (x,y) is the unique solution in the open unit square (0,1)× (0,1) to the system of equations align* \ aligned &11+2x(1+2xp3)1p=11+2y(1+2yq3)1q,\\ &(1-x)(1-xp-1)1+2xp=(1-y)(1-yq-1)1+2yq. aligned . align* Consequently, for rational p, q∈ Q, the constants rp,q(Z3) are algebraic numbers which generally admit no radical expressions, since their often rather complicated minimal polynomials may have non-solvable Galois groups. Our formalism relies on a key observation: the existence of nontrivial critical extremizers. This approach can also be adapted to resolve a long-standing open problem -- determining all optimal (p,q)-hypercontractive constants for biased Bernoulli random variables, which are closely related to noise operators. Several noteworthy phenomena emerge from numerical simulations: the monotonicity of the hypercontractive constants in the parameters, and the appearance of intriguing limit shapes. These phenomena merit further investigation.