A reverse Riesz estimate combined with a spectral gap implies a Poincaré inequality

Abstract

Working at the level of an Abel-ergodic sectorial operator A on a Banach space X and an unbounded operator ∂ defined on a subspace X in another Banach space Y, we show that a single reverse Riesz estimate \|Aαx\|X \|∂ x\|Y for some 0 < α< 1, combined with the condition 0 ∈ ρ(A0), where A0 is the part of A on the closure of the range of A, implies the Poincaré inequality \|x - P(x)\|X \|∂ x\|Y, where P is the Abel-ergodic projection onto the kernel of A. The condition 0 ∈ ρ(A0) is the natural abstract substitute for a spectral gap, and is sharp already in the Hilbertian case. We also obtain a companion divergence inequality. The arguments are remarkably short, yet the principle is genuinely unifying: it covers commutative and noncommutative situations on the same footing and can be used with arbitrary Banach spaces. As a consequence, we recover, and considerably extend, a recent theorem of Jiao, Luo, Zanin and Zhou [CMP2024] on (possibly noncommutative) Lp-spaces. We then illustrate the flexibility of the method across a wide spectrum of geometries, ranging from Riemannian manifolds, Lie groups, metric measure spaces, spin manifolds to genuinely noncommutative settings such as quantum groups, semigroups of Schur multipliers, q-Ornstein-Uhlenbeck semigroups and quantum tori, where we sometimes establish new inequalities and otherwise recover classical ones from a single principle.

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