Neural Wave Functions for Superfluids

Understanding superfluidity remains a major goal of condensed matter physics. Here we tackle this challenge utilizing the recently developed Fermionic neural network (FermiNet) wave function Ansatz [D. Pfau et al., Phys. Rev. Res. 2, 033429 (2020).] for variational Monte Carlo calculations. We study...

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Veröffentlicht in:	arXiv.org 2024-06
Hauptverfasser:	Wan Tong Lou, Sutterud, Halvard, Cassella, Gino, Foulkes, W M C, Knolle, Johannes, Pfau, David, Spencer, James S
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Schlagworte:	Computer Science - Learning Condensed matter physics Extreme values Fermi gases Fluids Mathematical analysis Neural networks Physics - Computational Physics Physics - Quantum Gases Physics - Superconductivity Superfluidity Wave functions
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description	Understanding superfluidity remains a major goal of condensed matter physics. Here we tackle this challenge utilizing the recently developed Fermionic neural network (FermiNet) wave function Ansatz [D. Pfau et al., Phys. Rev. Res. 2, 033429 (2020).] for variational Monte Carlo calculations. We study the unitary Fermi gas, a system with strong, short-range, two-body interactions known to possess a superfluid ground state but difficult to describe quantitatively. We demonstrate key limitations of the FermiNet Ansatz in studying the unitary Fermi gas and propose a simple modification based on the idea of an antisymmetric geminal power singlet (AGPs) wave function. The new AGPs FermiNet outperforms the original FermiNet significantly in paired systems, giving results which are more accurate than fixed-node diffusion Monte Carlo and are consistent with experiment. We prove mathematically that the new Ansatz, which only differs from the original Ansatz by the method of antisymmetrization, is a strict generalization of the original FermiNet architecture, despite the use of fewer parameters. Our approach shares several advantages with the original FermiNet: the use of a neural network removes the need for an underlying basis set; and the flexibility of the network yields extremely accurate results within a variational quantum Monte Carlo framework that provides access to unbiased estimates of arbitrary ground-state expectation values. We discuss how the method can be extended to study other superfluids.
doi_str_mv	10.48550/arxiv.2305.06989
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subjects	Computer Science - Learning Condensed matter physics Extreme values Fermi gases Fluids Mathematical analysis Neural networks Physics - Computational Physics Physics - Quantum Gases Physics - Superconductivity Superfluidity Wave functions
title	Neural Wave Functions for Superfluids
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