Hypercontractivity of Poisson Semigroups with Orthogonal Polynomial Eigenfunctions
Abstract
For any 1 < p < q < ∞, we investigate fixed-time hypercontractive bounds from Lp to Lq of Poisson semigroups associated with the Ornstein--Uhlenbeck, Laguerre and Jacobi operators. We prove that, in the Ornstein--Uhlenbeck and Laguerre cases, the Poisson semigroups fail to be Lp Lq bounded for any fixed t > 0. In contrast, for Jacobi operators with α, β -1/2, the associated Poisson semigroups are ultracontractive, namely bounded from L1 to L∞. More generally, we study Bernstein subordinations of these semigroups and show that fixed-time hypercontractivity is not stable under subordination. The analysis relies on quantitative Lq-estimates for the corresponding orthogonal polynomial eigenfunctions, together with a bilinear test with the exponential family.
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