Dissemination List

口頭発表(抜粋)

2023年

  1. Y. Nakata, R. Omori, An epidemic model for reinfection dynamics with heterogeneous susceptibility, ICIAM 2023 (Mathematics of Epidemics: modelling, data analysis, and control), Waseda University, August 21-25, 2023
  2. Y. Nakata, R. Omori, An epidemic model for reinfection dynamics with heterogeneous susceptibility, The 4th International Conference on Dynamics of Differential Equations, in Memory of Jack K. Hale, Fields Institute, August 14-17, 2023
  3. Y. Nakata, Extinction of mosquito population with sterile mosquito release, The 8th CIJK Conference Mathematical analysis of population dynamics Sono Belle Jeju, June 27-July 1, 2023
  4. Y. Nakata, Period-two solutions for a class of distributed delay differential equations, 12th Colloquium on the Qualitative Theory of Differential Equations, Bolyai Institute, University of Szeged, June 19-23, 2023
  5. 中田行彦, ロジスティック型の遅延微分方程式の連立系について, 第12回福島応用数学研究集会,福島大学,2023年3月19日

2022年

  1. 中田行彦,多体系における伝達遅延現象を表す線形遅延微分方程式の解析,2022年度応用数学合同研究集会,龍谷大学,2022年12月16日
  2. 中田行彦,石渡哲哉,いくつかの遅延微分方程式の解の爆発について,日本応用数理学会2022年度年会OS「時間遅れと数理」,北海道大学,2022年09月10日

2021年

  1. 中田行彦,分布型の時間遅れをもつ微分方程式の周期解について,RIMS共同研究(公開型)「時間遅れ系と数理科学:理論と応用の新たな展開に向けて」,数理解析研究所及びオンライン, 2021年11月
  2. 中田行彦,感染症の数理モデルから現れる時間遅れをもつ微分方程式と解のダイナミクス7,日本数学会2020年度春季総合分科会,オンライン,2021年3月(分科会特別講演)
  3. 中田行彦,ある分布型の時間遅れを持つ微分方程式の周期解について,日本応用数理学会年会OS「時間遅れと数理」,オンライン,2021年9月
  4. 中田行彦,感染に伴う感受性変化が導く感染症の流行動態,2021年日本数理生物学会年会企画シンポジウム「マルチスケールダイナミクス」,オンライン,2021年9月
  5. 中田行彦,時間遅れをもつ微分方程式の対称的な周期解について,発展方程式若手セミナー特別セッション「時間遅れへの誘い」,オンライン,2021年8月
  6. Y. Nakata, On a blow-up phenomenon in scalar delay differential equations, BioMATEmatics, Online, 2021 August
  7. Y. Nakata, Periodic solution of a class of distributed delay differential equations, Encontro Nacional da SPM 2021, Online, 2021 July
  8. Y. Nakata, On a blow-up phenomenon in scalar delay differential equations, Czech-Japanese Seminar in Applied Mathematics 2021, Online, 2021 January

2020年

  1. 中田行彦,ある分布型の時間遅れをもつ微分方程式の爆発解について,2020年度応用数学合同研究集会,オンライン,2020年12月
  2. 中田行彦,階段形の非線形関数をもつ遅延微分方程式について, 日本応用数理学会年会OS「時間遅れと数理」,2020年9月
  3. 中田行彦,ステップ型の非線形性をもつ分布型の遅延微分方程式, 5
  4. 中田行彦,分布型の時間遅れをもつ微分方程式の対称的な周期解について,北陸応用数理研究会2020,石川県政記念しいのき迎賓館,2020年2月

2019年

  1. 中田行彦,分布型の時間遅れをもつ微分方程式の周期解について,日本数学会2019年度秋季総合分科会,金沢大学,2019年9月
  2. 中田行彦,免疫減衰をもつ感染症数理モデルにおける周期流行,日本応用数理学会年会OS「感染症の数理モデル」,2019年9月
  3. Y. Nakata, Period two solutions of distributed delay differential equations, Equadiff 2019, Leiden University, Leiden, 2019 July
  4. Y. Nakata, Period two solutions of distributed delay differential equations, 11th Colloquium on the Qualitative Theory of Differential Equations, University of Szeged, Szeged, 2019 June
  5. Y. Nakata, L. Yang, Stability analysis of an epidemic model with boosting of immunity, Fifth International Conference on Computational and Mathematical Population Dynamics (CMPD5), Bahia Mar Fort Lauderdale Beach, Florida, 2019 May

2018年

  1. Y. Nakata, Period two solutions of a class of a delay differential equations, RIMS 研究集会「常微分方程式の定性的理論および数理モデル研究への応用」2018年11月
  2. 中田行彦,ある遅延微分方程の陽的な周期解について, 日本数学会2018年度秋季総合分科会,岡山大学,2018年9月
  3. Y. Nakata, Periodic solutions of a delay differential equation, 12th AIMS International Conference Special Session ‘Delay Equations in Population Dynamics’, Taipei, 2018 July
  4. 中田行彦,メタポピュレーション型の感染症数理モデル, 情報流の数理,明治大学,2018年3月

2017年

  1. Y. Nakata, Infection and reinfection dynamics in a heterogeneous susceptible population, RIMS Workshop ‘Theory of Biomathematics and its Applications XIV - Modelling and Analysis for Structured Population Dynamics and its Applications’, RIMS, 2017 November

  2. 中田行彦,Delay equations for epidemic models 個体の再感染-時間遅れ, 日本数学会2017年度秋季総合分科会,山形大学,2017年9月

  3. Y. Nakata, Delay equations for epidemic models with waning immunity, SIAM Conference on Applications of Dynamical Systems, Snowbird, 2017 May.

2016年

  1. 中田行彦,Delay equations for epidmic models: instability due to waning immunity, RIMS共同研究「常微分方程式の定性的理論とその周辺」2016年11月

  2. 中田行彦,Delay equations for epidemic models: instability due to waning immunity, 数学と現象:Mathematics and Phenomena in Miyazaki, 宮崎大学,2016年11月

  3. Y. Nakata, Epidemic models with waning immunity, 70th Anniversary Conference of the Korean Mathematical Society, Seoul, 2016 October

  4. Y. Nakata, Delay equations for epidemic models, The 2016 (26th) annual meeting of the Japanese Society for Mathematical Biology, Award Lecture, 2016 September

  5. Y. Nakata, Stability of a logistic equation with multiple delays, The 22nd International Conference on Difference Equations and Applications Osaka, 2016 July.

2015年

  1. 中田行彦, 遅延方程式による感染症モデルの定式化:免疫減衰と再感染, 第 12回生物数学の理論とその応用, 京都大学数理解析研究所,2015年11月

  2. Y. Nakata, R. Omori, Delay equation formulation for an epidemic model with waning immunity: an application to mycoplasma pneumoniae, 4th IFAC Conference on Analysis and Control of Chaotic Systems, 2015 August

  3. Y. Nakata, On a transcendental equation from an endemic model, 10th Colloquium on the Qualitative Theory of Differential Equations, Bolyai Institute, University of Szeged, Szged, 2015 July 1-4

  4. Y. Nakata, Dynamics of a reinfection epidemic model and an application to a childhood disease, Short Thematic Program on Delay Differential Equations, The Fields Institute for Research in Mathematical Sciences, Toronto, 2015 May

2014年

  1. Y. Nakata, D.H. Knipl, G. Röst, Age-structured epidemic model with infection during transportation. Szeged Dynamics Days, Szeged, 2014 February, March

2013年

  1. 中田行彦,幹細胞の成熟過程を記述する微分方程式モデル,第23回日本数理生物学会大会,静岡,2013年9月

  2. Y. Nakata, I. Györi, G. Röst, On the logistic equation with two discrete delays, International Conference on Delay Differential and Difference Equations and Applications, Balatonfüred, 2013 July

  3. Y. Nakata, G. Röst, Global analysis for spread of an infectious disease via human transportation, Encounters Between Discrete and Continuous Mathematics Workshop on Dynamical Networks, Numerical Analysis and Ergodic Theory, Eötvös Loránd University, Institute of Mathematics, Budapest, 2013 May

2012年

  1. Y. Nakata, Compactness property for structured population models by Delay Equations, 6th European Congress of Mathematics, Krakow, 2012 July

  2. Y. Nakata, G. Röst, Global analysis for spread of an infectious disease via human transportation, BJMT Applied Mathematics Conference 2012, Széchenyi István Egyetem, Budapest, 2012 June

2011年

  1. T. Alarcón, O. Diekmann, Ph. Getto, Y. Nakata, An age structured model describing transitions between quiescent and proliferating cell populations, 3rd Swedish Meeting on Mathematics in Biology, Umea, 2011 December

  2. Ph. Getto, A. Marciniak-Czochra, Y. Nakata, M. dM. Vivanco, Global dynamics of two compartment models for cell production systems with regulatory mechanisms, Interdisciplinary Conference, Modeling in Life Sciences 2011, Szeged, 2011 November

  3. Y. Nakata, Ph. Getto, Analysis of a characteristic equation for a Delay Equation from cell population dynamics, 8th European Conference on Mathematical and Theoretical Biology: Annual Meeting of The Society for Mathematical Biology, Krakow, 2011 June, July

2010年

  1. Y. Nakata, Ph. Getto, A. Marciniak-Czochra and T. Alarcón, Stability analysis of multi-compartment models for cell production systems, The 3rd China-Japan Colloquium of Mathematical Biology, China, 2010 October

2009年

  1. Y. Nakata, Global asymptotic stability beyond 3/2 type stability for a logistic equation with piecewise constant arguments, Workshop on Delay Differential Equations: from theory to applications, UK, 2009 September

2008年

  1. Y. Nakata, Permanence for nonautonomous Lotka-Volterra cooperative systems with several deviating arguments, The 2nd China-Japan Mathematical Colloquim, Japan, 2008 August

  2. Y. Nakata, Contractivity and global asymptotic stability for nonautonomous Lotka-Volterra ystems with piecewise constant arguments. Mathematical Models in Engineering, Biology and Medicine. International Conference on Boundary Value Problems, Spain 2008 September