no code implementations • 16 Dec 2022 • Masanori Hanada, Junyu Liu, Enrico Rinaldi, Masaki Tezuka
To simulate bosons on a qubit- or qudit-based quantum computer, one has to regularize the theory by truncating infinite-dimensional local Hilbert spaces to finite dimensions.
no code implementations • 10 Nov 2022 • Junyu Liu, Han Zheng, Masanori Hanada, Kanav Setia, Dan Wu
Climate change is becoming one of the greatest challenges to the sustainable development of modern society.
no code implementations • 12 Nov 2020 • Alexander Buser, Hrant Gharibyan, Masanori Hanada, Masazumi Honda, Junyu Liu
We propose a new framework for simulating $\text{U}(k)$ Yang-Mills theory on a universal quantum computer.
High Energy Physics - Theory High Energy Physics - Lattice Quantum Physics
no code implementations • 12 Nov 2020 • Hrant Gharibyan, Masanori Hanada, Masazumi Honda, Junyu Liu
Furthermore, for certain states in the Berenstein-Maldacena-Nastase (BMN) matrix model, several supersymmetric quantum field theories dual to superstring/M-theory can be realized on a quantum device.
High Energy Physics - Theory High Energy Physics - Lattice Quantum Physics
no code implementations • 8 May 2020 • Hiromasa Watanabe, Georg Bergner, Norbert Bodendorfer, Shotaro Shiba Funai, Masanori Hanada, Enrico Rinaldi, Andreas Schäfer, Pavlos Vranas
We provide evidence for partial deconfinement -- the deconfinement of a SU($M$) subgroup of the SU($N$) gauge group -- by using lattice Monte Carlo simulations.
High Energy Physics - Theory High Energy Physics - Lattice High Energy Physics - Phenomenology
no code implementations • 9 Jan 2020 • Fabien Alet, Masanori Hanada, Antal Jevicki, Cheng Peng
We also consider the coupled gauged matrix model and vector model, and argue that the deconfinement is associated with the loss of the entanglement, similarly to the previous observation for the coupled SYK model.
High Energy Physics - Theory Strongly Correlated Electrons
no code implementations • 26 Aug 2018 • Masanori Hanada
This is an introductory article about Markov Chain Monte Carlo (MCMC) simulation for pedestrians.
High Energy Physics - Theory Statistical Mechanics High Energy Physics - Lattice