Von Neumann Algebras in Double-Scaled SYK

TL;DR

This paper demonstrates that the double-scaled SYK model's algebra is a Type II$_1$ factor, revealing its modular structure and connecting it to gravitational and quantum gravity concepts like JT gravity and baby universes.

Contribution

It proves the algebraic structure of the double-scaled SYK model is a Type II$_1$ factor and analyzes its modular properties, linking to gravitational theories and spectral solutions.

Findings

The algebra is a Type II$_1$ factor.

The empty state is tracial, cyclic, and separating.

Analytic solutions for the energy spectrum are provided.

Abstract

It has been argued that a finite effective temperature emerges and characterizes the thermal property of double-scaled SYK model in the infinite temperature limit. Meanwhile, in the static patch of de Sitter, the maximally entangled state satisfies a KMS condition at infinite temperature, suggesting the Type II$_1$ nature of the observable algebra gravitationally dressed to the observer. In this work, we analyze the double-scaled algebra generated by chord operators in the double-scaled SYK model and demonstrate that it exhibits features reflecting both perspectives. Specifically, we prove that the algebra is a Type II$_1$ factor, and that the empty state with no chord satisfies the tracial property, in agreement with expectations from earlier work. We further show that this state is cyclic and separating for the double-scaled algebra, based on which we explore its modular structure. We then explore various physical limits of the theory, drawing connections to JT gravity, the Hilbert space of baby universes, and Brownian double-scaled SYK. We also present analytic solutions to the energy spectrum in both the zero- and one-particle sectors of the left/right chord Hamiltonian.