Quantum Symmetry and Geometry in Double-Scaled SYK
Abstract
The emergence of the quantum R-matrix in the double-scaled SYK model points to an underlying quantum group structure. In this work, we identify the quantum group Uq(su(1,1)) as a subalgebra of the chord algebra. Specifically, we construct the generators of Uq(s u(1,1)) from combinations of operators within the chord algebra and show that the one-particle chord Hilbert space decomposes into the positive discrete series representations of Uq(s u(1,1)). Using the coproduct structure of the quantum group, we build the multi-particle Hilbert space and establish its equivalence with previous results defined by the chord rules. In particular, we show that the quantum R-matrix acts as a swapping operator that reverses the ordering of open chords in each fusion channel while incorporating the corresponding q-weighted penalty factors. This action enables an explicit derivation of the chord Yang-Baxter relation. We further explore a realization of the quantum group generators on the quantum disk, and present a novel factorization formula for the bulk gravitational wavefunction in the presence of matter. We further discuss the relation between the Uq(s u(1,1)) structure uncovered here and the Uq(s l(2, R)) algebra previously studied from the boundary perspective. Finally, we study the gravitational wavefunction with matter in the Schwarzian regime.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.