Committee |
Date Time |
Place |
Paper Title / Authors |
Abstract |
Paper # |
CCS |
2022-03-27 13:25 |
Hokkaido |
RUSUTSU RESORT HOTEL & CONVENTION (Primary: On-site, Secondary: Online) |
A Synchronization Method and a Synchronizability Condition Based on Mean-field Coupling for Multiple Piecewise Affine Oscillators Shinpei Horie, Tatsuta Kai (Tokyo Univ. of Science) CCS2021-43 |
This study proposes a new synchronization method based on mean-field coupling, which is one of the global coupling metho... [more] |
CCS2021-43 pp.42-47 |
NLP, MICT, MBE, NC (Joint) [detail] |
2022-01-22 10:55 |
Online |
Online |
Optimization for global phase distribution control of weakly forced limit-cycle oscillators Yuzuru Kato, Hiroya Nakao (Tokyo tech) NLP2021-100 MICT2021-75 MBE2021-61 |
In this paper, we proposed a method for optimizing periodic input waveforms for phase distribution control of weakly for... [more] |
NLP2021-100 MICT2021-75 MBE2021-61 pp.125-128 |
NLP, MICT, MBE, NC (Joint) [detail] |
2022-01-23 09:50 |
Online |
Online |
Stabilization of injection locking under strong input via phase-amplitude reduction Shohei Takata, Yuzuru Kato, Hiroya Nakao (Tokyo Tech) NLP2021-121 MICT2021-96 MBE2021-82 |
Entrainment of limit-cycle oscillators by periodic inputs is a universal phenomenon observed in various fields of scienc... [more] |
NLP2021-121 MICT2021-96 MBE2021-82 pp.231-236 |
NLP, MICT, MBE, NC (Joint) [detail] |
2022-01-23 10:15 |
Online |
Online |
A simple method for estimating phase and amplitude functions of limit-cycle oscillators by polynomial regression from time series data Norihisa Namura, Hiroya Nakao (Tokyo Tech.) NLP2021-122 MICT2021-97 MBE2021-83 |
In the real world, there are various nonlinear rhythmic phenomena, many of which can be modeled mathematically as limit-... [more] |
NLP2021-122 MICT2021-97 MBE2021-83 pp.237-242 |
CCS |
2021-11-18 15:35 |
Osaka |
Osaka Univ. (Primary: On-site, Secondary: Online) |
A Synchronization Method and a Synchronizability Condition for Multiple Piecewise Affine Oscillators Tatsuya Kai (Tokyo Univ. of Science), Kaho Ohtsuki (Yokogawa Solution Service Corp.), Shingo Chiku (Mitsubishi Heavy Industries, Ltd.) CCS2021-21 |
This study derives synchronization methods and synchronability conditions for multiple piecewise affine oscillators. Esp... [more] |
CCS2021-21 pp.20-25 |
CAS, NLP |
2021-10-14 13:25 |
Online |
Online |
A simple method for estimating phase functions of limit cycles by polynomial regression from time series data Norihisa Namura, Hiroya Nakao (Tokyo Tech.) CAS2021-23 NLP2021-21 |
Many rhythmic phenomena in the real world are mathematically modeled as limit-cycle oscillators.
The phase reduction a... [more] |
CAS2021-23 NLP2021-21 pp.35-38 |
CCS |
2021-03-29 13:50 |
Online |
Online |
A Synchronization Method and Its Condition for Two Piecewise Affine Oscillators
-- An Extension to The Case Where Initial and Synchronized Velocities are Settable -- Kaho Ohtsuki, Tatsuya Kai, Shingo Chiku (Tokyo Univ. of Science) CCS2020-23 |
This study aims at developing a synchronization method and derive its condition for two piecewise affine oscillators. Th... [more] |
CCS2020-23 pp.13-18 |
CAS, ICTSSL |
2019-01-25 15:15 |
Tokyo |
Kikai-Shinko-Kaikan Bldg. |
Limit Cycle Control for a Class of Multi-modal and 2-dimensional Piecewise Nonlinear Systems Koshi Maehara, Tatsuya Kai (Tokyo Univ. of Science) CAS2018-136 ICTSSL2018-55 |
This study is devoted to design of state feedback controllers that generate desired circular limit cycles for a class of... [more] |
CAS2018-136 ICTSSL2018-55 pp.95-100 |
NLP, NC (Joint) |
2019-01-23 10:10 |
Hokkaido |
The Centennial Hall, Hokkaido Univ. |
A Design Method of Piecewise Nonlinear Oscillators with Circular Limit Cycles Tatsuya Kai, Koshi Maehara (Tokyo Univ. of Science) NLP2018-98 |
In this study, a design method of piecewise nonlinear oscillators that generate desired circular limit cycles is develop... [more] |
NLP2018-98 pp.11-16 |
NLP |
2017-03-15 09:55 |
Aomori |
Nebuta Museum Warasse |
Optimization of coupling matrices for stable mutual synchronization of nonlinear oscillators Nobuhiro Watanabe, Sho Shirasaka (Tokyo Tech), Yoji Kawamura (JAMSTEC), Hiroya Nakao (Tokyo Tech) NLP2016-120 |
Optimization of periodic injection signals for stable synchronization of a single oscillator has been studied recently, ... [more] |
NLP2016-120 pp.75-77 |
NLP |
2017-03-15 10:20 |
Aomori |
Nebuta Museum Warasse |
Synchronization analysis of strongly coupled oscillators by the generalized phase reduction method Wataru Kurebayashi (Aomori Univ.), Sho Shirasaka, Hiroya Nakao (Tokyo Tech.) NLP2016-121 |
Unlike the conventional phase reduction method limited to weakly perturbed oscillators,
the generalized phase reduction... [more] |
NLP2016-121 pp.79-80 |
NC, NLP, IPSJ-BIO [detail] |
2010-06-19 14:15 |
Okinawa |
Ryukyu-daigaku-gozyu-syunen-kinenn-kaikan |
Phase Reduction of Limit Cycle Oscillators Driven by Noise Kazuyuki Yoshimura (NTT Corp.) NLP2010-17 NC2010-17 |
We have developed a phase reduction theory for limit cycle oscillators subject to weak noise. We present the phase equat... [more] |
NLP2010-17 NC2010-17 pp.141-145 |
NLP |
2009-11-13 09:55 |
Kagoshima |
|
Synchronization of Uncoupled Oscillators by Gamma Impulses
-- From Phase Locking to Noise-induced Synchronization -- Shigefumi Hata, Hiroya Nakao (Kyoto Univ.) NLP2009-100 |
Uncoupled oscillators mutually synchronize when driven by common external impulses. Two major types of synchronization a... [more] |
NLP2009-100 pp.103-107 |
NLP |
2009-11-14 11:25 |
Kagoshima |
|
Numerical Analysis on Coupled Systems of Period-1 and Period-2 Limit Cycle Oscillators Yusuke Okada, Gouhei Tanaka, Takashi Kohno, Kazuyuki Aihara (Univ. of Tokyo) NLP2009-118 |
Coupled oscillators have been widely studied, for instance, as a mathematical model to investigate the mechanism of emer... [more] |
NLP2009-118 pp.203-208 |
NC, NLP |
2008-06-27 15:35 |
Okinawa |
University of the Ryukyus |
Estimation of Phase Resetting Curve Utilizing Robustness of Entrainment Atsuhiro Kikuchi, Noriko Miyazaki, Hisa-Aki Tanaka (UEC) NLP2008-16 |
Phase resetting curves (PRC) often provide useful informations
when synchronization or phase jitter is analyzed in coup... [more] |
NLP2008-16 pp.43-48 |