有向パーコレーションを含む無限粒子系の(量子ウォークの考え方を援用した)新しい量子化を提案する論文がアーカイブに出ましたのでお知らせします.
arXiv:2402.00280
A quantization of interacting particle systems
Authors: J. Akahori, N. Konno, R. Okamoto, I. Sato
https://t.co/ByP5lo0QB9
絶対数学シリーズの [第二作品] のアーカイブ情報をお知らせします.今回は,量子セルオートマトンに着目した論文です.
arXiv:2307.07106
Absolute zeta functions for zeta functions of quantum cellular automata
Authors: : J. Akahori, N. Konno, I. Sato
QIC (2023)
https://t.co/x9JhWdIC0h
絶対数学シリーズ最初の [第一作品] のアーカイブ情報などをお知らせします.量子ウォークとの接点を扱っています.
arXiv:2306.14625
On the relation between quantum walks and absolute zeta functions
Authors: Norio Konno
QSMF (in press)
https://t.co/PNCcMGHhM7
[2211.06167] Pranay Naredi, J. Bharathi Kannan, M. S. Santhanam: Tuning for Quantum Advantage in Directed Lackadaisical Quantum Walks https://t.co/PjUv4mMx8H https://t.co/tDaXqtqPwQ
[2211.08659] Fan Wang, Bin Cheng, Zi-Wei Cui et al.: Quantum Computing by Quantum Walk on Quantum Slide https://t.co/RGITqxTq5a https://t.co/3sBJlmizSO
[2211.07948] Ce Wang: The uniform measure for quantum walk on hypercube: a quantum Bernoulli noises approach https://t.co/bXqVolY8fE https://t.co/eI2FSkhY13
05C50 Online is a virtual seminar about graphs and matrices. Registration is open! Get to hear Gabriel Coutinho speak about some of his favourite open problems in quantum walks, happening on Nov. 18 at 10am Central.
Details + registration: https://t.co/8mm7hODqWL
Group lunch in Onna no Eki to welcome Prof. Rong Zhang from Nanjing University in China. She will be staying with Quantum Machines Unit for one year 🥳🥳 look forward to learn more about quantum walks from Prof.Zhang
In this paper we study a class of discrete quantum walks, known as bipartite walks. These include the well-known Grover's walks. Any discrete quantum walk is given by the powers of a unitary matrix $U$ indexed by arcs or edges of the [1/5 of https://t.co/371C8GMzyA]
This paper gives the quantum walks determined by graph zeta functions. The result enables us to obtain the characteristic polynomial of the transition matrix of the quantum walk, and it determines the behavior of the quantum walk. We [1/2 of https://t.co/9o2RShfad3]