Generalized Poincar\'e inequality for quantum Markov semigroups
Operator Algebras
2026-01-12 v1 Probability
Quantum Physics
Abstract
We prove a noncommutative -Poincar\'e inequality for trace-symmetric quantum Markov semigroups on tracial von Neumann algebras, assuming only the existence of a spectral gap. Extending semi-commutative results of Huang and Tropp, our argument uses Markov dilations to obtain chain-rule estimates for Dirichlet forms and employs amalgamated free products to define an appropriate noncommutative derivation. We further generalize the argument to non-tracial -finite von Neumann algebras under the weaker assumption of GNS-detailed balance, using Haagerup's reduction and Kosaki's interpolation theorem. As applications, we recover noncommutative Khintchine and sub-exponential concentration inequalities.
Cite
@article{arxiv.2601.06005,
title = {Generalized Poincar\'e inequality for quantum Markov semigroups},
author = {Marius Junge and Jia Wang},
journal= {arXiv preprint arXiv:2601.06005},
year = {2026}
}