Litcius/Paper detail

Autoregressive neural quantum states of Fermi Hubbard models

Eduardo Ibarra-García-Padilla, Hannah Lange, Roger G. Melko, Richard T. Scalettar, Juan Carrasquilla, Annabelle Bohrdt, Ehsan Khatami

2025Physical Review Research9 citationsDOIOpen Access PDF

Abstract

Neural quantum states (NQSs) have emerged as a powerful ansatz for variational quantum Monte Carlo studies of strongly correlated systems. Here, we apply recurrent neural networks (RNNs) and autoregressive transformer neural networks to the Fermi-Hubbard and the (non-Hermitian) Hatano-Nelson-Hubbard models in one and two dimensions. In both cases, we observe that the convergence of the RNN ansatz is challenged when increasing the interaction strength. We present a physically motivated and easy-to-implement strategy for improving the optimization, namely, by ramping of the model parameters. Furthermore, we investigate the advantages and disadvantages of the autoregressive sampling property of both network architectures. For the Hatano-Nelson-Hubbard model, we identify convergence issues that stem from the autoregressive sampling scheme in combination with the non-Hermitian nature of the model. Our findings provide insights into the challenges of the NQS approach and make the first step towards exploring strongly correlated electrons using this ansatz.

Topics & Concepts

AnsatzAutoregressive modelHubbard modelStatistical physicsQuantumQuantum Monte CarloPhysicsApplied mathematicsArtificial neural networkConvergence (economics)Monte Carlo methodComputer scienceMathematicsQuantum mechanicsArtificial intelligenceEconometricsStatisticsEconomicsSuperconductivityEconomic growthQuantum many-body systemsModel Reduction and Neural NetworksQuantum and electron transport phenomena