Duality of orthogonal and symplectic random tensor models
Razvan G. Gurau
Ecole Polytechnique, France; Perimeter Institute for Theoretical Physics, Canada; Heidelberg University, GermanyHannes Keppler
Heidelberg University, Germany
Abstract
The groups and are related by an analytic continuation to negative values of , . This duality has been studied for vector models, and gauge theories, as well as some random matrix ensembles. We extend this duality to real random tensor models of arbitrary order with no symmetry under permutation of the indices and with quartic interactions. The to duality is shown to hold graph by graph to all orders in perturbation theory for the partition function, the free energy and the connected two-point function.
Cite this article
Razvan G. Gurau, Hannes Keppler, Duality of orthogonal and symplectic random tensor models. Ann. Inst. Henri Poincaré Comb. Phys. Interact. (2023), published online first
DOI 10.4171/AIHPD/177