Your search keyword '"Kaname Matsue"' showing total 7 results

1. Quaternionic quantum walks of Szegedy type and zeta functions of graphs

Author

Iwao Sato, Kaname Matsue, Norio Konno, and Hideo Mitsuhashi

Subjects

Nuclear and High Energy Physics, FOS: Physical sciences, General Physics and Astronomy, 0102 computer and information sciences, Computer Science::Computational Complexity, 01 natural sciences, Unitary state, Ihara zeta function, Theoretical Computer Science, Combinatorics, symbols.namesake, 0103 physical sciences, FOS: Mathematics, Quantum walk, 010306 general physics, Quaternion, Mathematical Physics, Eigenvalues and eigenvectors, Mathematics, Quantum Physics, Probability (math.PR), Stochastic matrix, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Graph, Riemann zeta function, Computational Theory and Mathematics, 010201 computation theory & mathematics, symbols, Mathematics::Differential Geometry, Quantum Physics (quant-ph), 60F05, 05C50, 15A15, 11R52, Mathematics - Probability

Abstract

We define a quaternionic extension of the Szegedy walk on a graph and study its right spectral properties. The condition for the transition matrix of the quaternionic Szegedy walk on a graph to be quaternionic unitary is given. In order to derive the spectral mapping theorem for the quaternionic Szegedy walk, we derive a quaternionic extension of the determinant expression of the second weighted zeta function of a graph. Our main results determine explicitly all the right eigenvalues of the quaternionic Szegedy walk by using complex right eigenvalues of the corresponding doubly weighted matrix. We also show the way to obtain eigenvectors corresponding to right eigenvalues derived from those of doubly weighted matrix., Comment: 24 pages. arXiv admin note: text overlap with arXiv:1505.00683

Published

2017

2. Quantum search on simplicial complexes

Author

Kaname Matsue, Osamu Ogurisu, and Etsuo Segawa

Subjects

Discrete mathematics, Simplicial manifold, Simplicial complexes, Abstract simplicial complex, FOS: Physical sciences, Mathematical Physics (math-ph), 01 natural sciences, h-vector, Simplicial homology, Atomic and Molecular Physics, and Optics, 010305 fluids & plasmas, Combinatorics, Simplicial complex, Quantum search, Mathematics::Category Theory, 0103 physical sciences, Simplicial set, Delta set, 010306 general physics, Unitary equivalence of quantum walks, Mathematical Physics, Mathematics, Simplicial approximation theorem, Quantum walks

Abstract

金沢大学理工学域 数物科学系 名誉教授, In this paper, we propose an extension of quantum searches on graphs driven by quantum walks to simplicial complexes. To this end, we define a new quantum walk on simplicial complex which is an alternative of preceding studies by authors. We show that the quantum search on the specific simplicial complex corresponding to the triangulation of n-dimensional unit square driven by this new simplicial quantum walk works well, namely, a marked simplex can be found with probability 1+o(1) 1+o(1) within a time O(N − − √ ) O(N), where N is the number of simplices with the dimension of marked simplex., Embargo Period 12 months

Published

2017

3. A Note on the Spectral Mapping Theorem of Quantum Walk Models

Author

Kaname Matsue, Osamu Ogurisu, and Etsuo Segawa

Subjects

Quantum Physics, Pure mathematics, Linear operators, FOS: Physical sciences, Mathematical Physics (math-ph), 01 natural sciences, Functional Analysis (math.FA), 010305 fluids & plasmas, Matrix decomposition, Mathematics - Functional Analysis, Mathematics - Spectral Theory, Linear map, Spectral mapping, Generalized eigenvector, 0103 physical sciences, FOS: Mathematics, Quantum walk, Quantum Physics (quant-ph), 010306 general physics, Spectral Theory (math.SP), Mathematical Physics, Eigenvalues and eigenvectors, Mathematics

Abstract

We discuss the description of eigenspace of a quantum walk model $U$ with an associating linear operator $T$ in abstract settings of quantum walk including the Szegedy walk on graphs. In particular, we provide the spectral mapping theorem of $U$ without the spectral decomposition of $T$. Arguments in this direction reveal the eigenspaces of $U$ characterized by the generalized kernels of linear operators given by $T$., Comment: 17 pages

Published

2017

4. Hierarchical structures of amorphous solids characterized by persistent homology

Author

Kaname Matsue, Emerson G. Escolar, Yasumasa Nishiura, Yasuaki Hiraoka, Akihiko Hirata, and Takenobu Nakamura

Subjects

Random graph, Diffraction, Multidisciplinary, Amorphous metal, Persistent homology, Materials science, FOS: Physical sciences, 02 engineering and technology, Condensed Matter - Soft Condensed Matter, 021001 nanoscience & nanotechnology, Space (mathematics), Condensed Matter::Disordered Systems and Neural Networks, 01 natural sciences, Amorphous solid, Chemical physics, Physical Sciences, 0103 physical sciences, Soft Condensed Matter (cond-mat.soft), Topological data analysis, Variety (universal algebra), 010306 general physics, 0210 nano-technology

Abstract

This article proposes a topological method that extracts hierarchical structures of various amorphous solids. The method is based on the persistence diagram (PD), a mathematical tool for capturing shapes of multiscale data. The input to the PDs is given by an atomic configuration and the output is expressed as 2D histograms. Then, specific distributions such as curves and islands in the PDs identify meaningful shape characteristics of the atomic configuration. Although the method can be applied to a wide variety of disordered systems, it is applied here to silica glass, the Lennard-Jones system, and Cu-Zr metallic glass as standard examples of continuous random network and random packing structures. In silica glass, the method classified the atomic rings as short-range and medium-range orders and unveiled hierarchical ring structures among them. These detailed geometric characterizations clarified a real space origin of the first sharp diffraction peak and also indicated that PDs contain information on elastic response. Even in the Lennard-Jones system and Cu-Zr metallic glass, the hierarchical structures in the atomic configurations were derived in a similar way using PDs, although the glass structures and properties substantially differ from silica glass. These results suggest that the PDs provide a unified method that extracts greater depth of geometric information in amorphous solids than conventional methods., Comment: 8 pages, 14 figures

Published

2016

5. Quantum walks on simplicial complexes

Author

Kaname Matsue, Osamu Ogurisu, and Etsuo Segawa

Subjects

FOS: Physical sciences, Type (model theory), 01 natural sciences, 010305 fluids & plasmas, Theoretical Computer Science, Mathematics - Geometric Topology, Quantum walk, Mathematics::Probability, 0103 physical sciences, FOS: Mathematics, Electrical and Electronic Engineering, 010306 general physics, Tethered and movable quantum walks, Mathematical Physics, Quantum computer, Physics, Discrete mathematics, Quantum Physics, Computer simulation, Simplicial complexes, Geometric Topology (math.GT), Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Extension (predicate logic), Electronic, Optical and Magnetic Materials, Modeling and Simulation, Signal Processing, Quantum algorithm, Quantum Physics (quant-ph)

Abstract

We construct a new type of quantum walks on simplicial complexes as a natural extension of the well-known Szegedy walk on graphs. One can numerically observe that our proposing quantum walks possess linear spreading and localization as in the case of the Grover walk on lattices. Moreover, our numerical simulation suggests that localization of our quantum walks reflects not only topological but also geometric structures. On the other hand, our proposing quantum walk contains an intrinsic problem concerning exhibition of non-trivial behavior, which is not seen in typical quantum walks such as Grover walks on graphs. © 2016 Springer Science+Business Media New York, Embargo Period 12 months

Published

2016

6. Geometric Frustration of Icosahedron in Metallic Glasses

Author

Akihiko Hirata, B. Klumov, Takeshi Fujita, A.R. Yavari, Kaname Matsue, Mingwei Chen, L. J. Kang, Motoko Kotani, Tohoku University, WPI AIMR, Sendai, Tohoku University [Sendai], Joint InstituteHigh Temperature, Russian Acad. Sci, Russian Academy of Sciences [Moscow] (RAS), Science et Ingénierie des Matériaux et Procédés (SIMaP), and Université Joseph Fourier - Grenoble 1 (UJF)-Centre National de la Recherche Scientifique (CNRS)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Institut de Chimie du CNRS (INC)-Institut National Polytechnique de Grenoble (INPG)

Subjects

Multidisciplinary, Amorphous metal, Condensed matter physics, Icosahedral symmetry, media_common.quotation_subject, Frustration, [CHIM.MATE]Chemical Sciences/Material chemistry, 02 engineering and technology, 021001 nanoscience & nanotechnology, 01 natural sciences, Crystallography, Electron diffraction, 0103 physical sciences, Symmetry (geometry), 010306 general physics, 0210 nano-technology, Supercooling, media_common

Abstract

Order, Order The structure of glassy materials, which are known to have short-range order but no long-range pattern, continues to be a puzzle. One current theory is that some glassy materials possess icosahedral ordering, a motif that cannot show translational periodicity. Hirata et al. (p. 376 , published online 11 July) obtained diffraction patterns from subnanometer volumes in a metallic glass, which show some, but not all, of the expected features of an icosahedron. Simulations suggest that the patterns arise from icosahedrons distorted to include features of the face-centered cubic structure. This observation is different from the predictions of molecular dynamics simulations and provides pivotal information in understanding the competition between the formation of the globally inexpensive long-range order and the locally inexpensive short-range order.

Published

2013

7. Resonant-tunneling in discrete-time quantum walk

Author

Osamu Ogurisu, Etsuo Segawa, Leo Matsuoka, and Kaname Matsue

Subjects

Physics, Quantum Physics, 010308 nuclear & particles physics, FOS: Physical sciences, Mathematical Physics (math-ph), Random walk, Condensed Matter::Mesoscopic Systems and Quantum Hall Effect, 01 natural sciences, Atomic and Molecular Physics, and Optics, Discrete time and continuous time, Transmission (telecommunications), Mathematics::Probability, Quantum mechanics, 0103 physical sciences, Line (geometry), Quantum walk, 010306 general physics, Quantum Physics (quant-ph), Quantum, Quantum tunnelling, Mathematical Physics

Abstract

We show that discrete-time quantum walks on the line, $\mathbb{Z}$, behave as "the quantum tunneling". In particular, quantum walkers can tunnel through a double-well with the transmission probability $1$ under a mild condition. This is a property of quantum walks which cannot be seen on classical random walks, and is different from both linear spreadings and localizations., Comment: 14 pages, 2 figures to appear in "Quantum Studies: Mathematics and Foundations"

Published

2017