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All Technical Committee Conferences (Searched in: All Years)
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Search Results: Conference Papers |
Conference Papers (Available on Advance Programs) (Sort by: Date Descending) |
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Committee |
Date Time |
Place |
Paper Title / Authors |
Abstract |
Paper # |
NLP, MSS |
2023-03-16 11:40 |
Nagasaki |
(Primary: On-site, Secondary: Online) |
A Study on Properties of Koopman Eigenfunctions for a Planar Singularly-Perturbed Dynamical System Natsuki Katayama, Yoshihiko Susuki (Kyoto Univ.) MSS2022-85 NLP2022-130 |
The Koopman operator is a composition operator for nonlinear dynamical systems. The eigenfunctions of the Koopman operat... [more] |
MSS2022-85 NLP2022-130 pp.114-119 |
NLP |
2013-07-08 15:45 |
Okinawa |
Miyako Island Marine Terminal |
Relationship between the attracting and repelling dynamics of canards and the precision of numerical computation Takahiro Kodama, Shinji Doi (Kyoto Univ.) NLP2013-36 |
In the singularly perturbed system, there are characteristic nonlinear oscillations called canards. Canards are periodic... [more] |
NLP2013-36 pp.53-58 |
NLP |
2012-12-17 16:40 |
Fukui |
Fukui City Communication Plaza |
On numerical computation of canard solution in a singularly perturbed system Takahiro Kodama, Shinji Doi (Kyoto Univ.) NLP2012-96 |
In singularly perturbed systems such as the Bonhoeffer-van der Pol (BVP) neuronal model, there are characteristic phenom... [more] |
NLP2012-96 pp.45-50 |
NLP |
2012-07-05 15:20 |
Kagoshima |
Kagoshima Sangyou Hall |
On a slow phase-locked oscillation in globally coupled neuronal oscillators (II) Ryotaro Tsuneki, Shinji Doi (Kyoto Univ.) NLP2012-44 |
We examine the dynamics in a population of globally coupled neuronal oscillators using the three-dimensional Bonhoeffer-... [more] |
NLP2012-44 pp.35-39 |
NLP |
2012-07-05 15:45 |
Kagoshima |
Kagoshima Sangyou Hall |
A numerical study of canard solution in a singularly perturbed system Takahiro Kodama, Shinji Doi (Kyoto Univ.) NLP2012-45 |
In singularly perturbed systems, there are characteristic phenomena such as canards. Canards are periodic orbits which t... [more] |
NLP2012-45 pp.41-46 |
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