Sharp endpoint $L_p$ estimates of quantum Schr\"{o}dinger groups

TL;DR

This paper develops sharp endpoint $L_p$ estimates for Schr"odinger groups on general measure spaces, introducing a new noncommutative BMO space and extending the theory to various quantum and algebraic models.

Contribution

It introduces a novel noncommutative BMO space and establishes Schr"odinger group estimates on arbitrary von Neumann algebras, broadening the scope of existing theory.

Findings

Established sharp endpoint $L_p$ estimates for Schr"odinger groups.

Introduced a new noncommutative high-cancellation BMO space.

Extended Schr"odinger group theory to quantum Euclidean spaces, matrix algebras, and group von Neumann algebras.

Abstract

In this article, we establish sharp endpoint $L_p$ estimates of Schr\"odinger groups on general measure spaces which may not be equipped with good metrics but admit submarkovian semigroups satisfying purely algebraic assumptions. One of the key ingredients of our proof is to introduce and investigate a new noncommutative high-cancellation BMO space by constructing an abstract form of P-metric codifying some sort of underlying metric and position. This provides the first form of Schr\"odinger group theory on arbitrary von Neumann algebras and can be applied to many models, including Schr\"odinger groups associated with non-negative self-adjoint operators satisfying purely Gaussian upper bounds on doubling metric spaces, standard Schr\"odinger groups on quantum Euclidean spaces, matrix algebras and group von Neumann algebras with finite dimensional cocycles.