Quantum-Enhanced Neural Exchange-Correlation Functionals
- URL: http://arxiv.org/abs/2404.14258v1
- Date: Mon, 22 Apr 2024 15:07:57 GMT
- Title: Quantum-Enhanced Neural Exchange-Correlation Functionals
- Authors: Igor O. Sokolov, Gert-Jan Both, Art D. Bochevarov, Pavel A. Dub, Daniel S. Levine, Christopher T. Brown, Shaheen Acheche, Panagiotis Kl. Barkoutsos, Vincent E. Elfving,
- Abstract summary: KohnSham Density Functional Theory (KS-DFT) provides the exact ground state energy and electron density of a molecule, contingent on the asyet unknown universal exchange-correlation (XC) functional.
Recent research has demonstrated that neural networks can efficiently learn to represent approximations to that functional, offering accurate generalizations to molecules not present during the training process.
With the latest advancements in quantum-enhanced machine learning (ML), evidence is growing that Quantum Neural Network (QNN) models may offer advantages in ML applications.
- Score: 0.193482901474023
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Kohn-Sham Density Functional Theory (KS-DFT) provides the exact ground state energy and electron density of a molecule, contingent on the as-yet-unknown universal exchange-correlation (XC) functional. Recent research has demonstrated that neural networks can efficiently learn to represent approximations to that functional, offering accurate generalizations to molecules not present during the training process. With the latest advancements in quantum-enhanced machine learning (ML), evidence is growing that Quantum Neural Network (QNN) models may offer advantages in ML applications. In this work, we explore the use of QNNs for representing XC functionals, enhancing and comparing them to classical ML techniques. We present QNNs based on differentiable quantum circuits (DQCs) as quantum (hybrid) models for XC in KS-DFT, implemented across various architectures. We assess their performance on 1D and 3D systems. To that end, we expand existing differentiable KS-DFT frameworks and propose strategies for efficient training of such functionals, highlighting the importance of fractional orbital occupation for accurate results. Our best QNN-based XC functional yields energy profiles of the H$_2$ and planar H$_4$ molecules that deviate by no more than 1 mHa from the reference DMRG and FCI/6-31G results, respectively. Moreover, they reach chemical precision on a system, H$_2$H$_2$, not present in the training dataset, using only a few variational parameters. This work lays the foundation for the integration of quantum models in KS-DFT, thereby opening new avenues for expressing XC functionals in a differentiable way and facilitating computations of various properties.
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