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Autori principali: Matsumoto, Akira, Itou, Etsuko, Tanizaki, Yuya
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2501.18960
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author Matsumoto, Akira
Itou, Etsuko
Tanizaki, Yuya
author_facet Matsumoto, Akira
Itou, Etsuko
Tanizaki, Yuya
contents We compute the $θ$-dependent mass spectrum of the 2-flavor Schwingr model using the tensor network (DMRG) in the Hamiltonian formalism. The pion and the sigma meson are identified as stable particles of the model for nonzero $θ$ whereas the eta meson becomes unstable. The meson masses are obtained from the one-point functions, using the meson operators defined by diagonalizing the correlation matrix to deal with the operator mixing. We also compute the dispersion relation directly by measuring the energy and momentum of the excited states, where the mesons are distinguished by the isospin quantum number. We confirmed that the meson masses computed by these methods agree with each other and are consistent with the calculation by the bosonized model. Our methods are free from the sign problem and show a significant improvement in accuracy compared to the conventional Monte Carlo methods. Furthermore, at the critical point $θ= π$, the mesons become almost massless, and the one-point functions reproduce the expected CFT-like behavior.
format Preprint
id arxiv_https___arxiv_org_abs_2501_18960
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Computing theta-dependent mass spectrum of the 2-flavor Schwinger model in the Hamiltonian formalism
Matsumoto, Akira
Itou, Etsuko
Tanizaki, Yuya
High Energy Physics - Lattice
We compute the $θ$-dependent mass spectrum of the 2-flavor Schwingr model using the tensor network (DMRG) in the Hamiltonian formalism. The pion and the sigma meson are identified as stable particles of the model for nonzero $θ$ whereas the eta meson becomes unstable. The meson masses are obtained from the one-point functions, using the meson operators defined by diagonalizing the correlation matrix to deal with the operator mixing. We also compute the dispersion relation directly by measuring the energy and momentum of the excited states, where the mesons are distinguished by the isospin quantum number. We confirmed that the meson masses computed by these methods agree with each other and are consistent with the calculation by the bosonized model. Our methods are free from the sign problem and show a significant improvement in accuracy compared to the conventional Monte Carlo methods. Furthermore, at the critical point $θ= π$, the mesons become almost massless, and the one-point functions reproduce the expected CFT-like behavior.
title Computing theta-dependent mass spectrum of the 2-flavor Schwinger model in the Hamiltonian formalism
topic High Energy Physics - Lattice
url https://arxiv.org/abs/2501.18960