Analytic and machine learning approaches to composite quantum impurities
Material type:
TextPublication details: Institute of Science and Technology Austria 2022Online resources: | Item type | Current library | Call number | Status | Date due | Barcode | Item holds | |
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Book
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Library | Quiet Room (Browse shelf(Opens below)) | Available | AT-ISTA#002552 |
Thesis
Abstract
Acknowledgments
About the Author
List of Publications
Table of Contents
List of Figures
1 Introduction
2 Methods
3 Variational approach to spinful angulon
4 Neural-network quantum states approach to the polaron Hamiltonian
5 Characterizing phase transitions with convolutional neural networks
6 Conclusions
Bibliography
In this Thesis, I study composite quantum impurities with variational techniques, both inspired by machine learning as well as fully analytic. I supplement this with exploration of other applications of machine learning, in particular artificial neural networks, in many-body physics. In Chapters 3 and 4, I study quasiparticle systems with variational approach. I derive a Hamiltonian describing the angulon quasiparticle in the presence of a magnetic field. I apply analytic variational treatment to this Hamiltonian. Then, I introduce a variational approach for non-additive systems, based on artificial neural networks. I exemplify this approach on the example of the polaron quasiparticle (Fröhlich Hamiltonian). In Chapter 5, I continue using artificial neural networks, albeit in a different setting. I apply artificial neural networks to detect phases from snapshots of two types physical systems. Namely, I study Monte Carlo snapshots of multilayer classical spin models as well as molecular dynamics maps of colloidal systems. The main type of networks that I use here are convolutional neural networks, known for their applicability to image data.