Boundary theories of critical matchgate tensor networks

Key aspects of the AdS/CFT correspondence can be captured in terms of tensor network models on hyperbolic lattices. For tensors fulfilling the matchgate constraint, these have previously been shown to produce disordered boundary states whose site-averaged ground state properties match the translation-invariant critical Ising model. In this work, we substantially sharpen this relationship by deriving disordered local Hamiltonians generalizing the critical Ising model whose ground and low-energy excited states are accurately represented by the matchgate ansatz without any averaging. We show that these Hamiltonians exhibit multi-scale quasiperiodic symmetries captured by an analytical toy model based on layers of the hyperbolic lattice, breaking the conformal symmetries of the critical Ising model in a controlled manner. We provide a direct identification of correlation functions of ground and low-energy excited states between the disordered and translation-invariant models and give numerical evidence that the former approaches the latter in the large bond dimension limit. This establishes tensor networks on regular hyperbolic tilings as an effective tool for the study of conformal field theories. Furthermore, our numerical probes of the bulk parameters corresponding to boundary excited states constitute a first step towards a tensor network bulk-boundary dictionary between regular hyperbolic geometries and critical boundary states.

Automated summary

This work focuses on the use of tensor network models on hyperbolic lattices to capture key aspects of the AdS/CFT correspondence. By deriving disordered local Hamiltonians, the study establishes a deeper understanding of the relationship between tensor networks and conformal field theories. The research also explores the multi-scale quasiperiodic symmetries exhibited by these Hamiltonians and compares their correlation functions with translation-invariant models, finding convergence in the large bond dimension limit. Additionally, numerical probes of bulk parameters corresponding to boundary excited states pave the way for a tensor network bulk-boundary dictionary between regular hyperbolic geometries and critical boundary states.