Entropy dissipative structure and mathematical analysis for complex fluids

2021 Fiscal Year Annual Research Report

• Project/Area Number: 18H01131
• Research Institution: Waseda University
• Principal Investigator: 川島 秀一 早稲田大学, 理工学術院, 教授(任期付) (70144631)
• Co-Investigator(Kenkyū-buntansha): 柴田 良弘 早稲田大学, 理工学術院, 教授 (50114088) ; 小川 卓克 東北大学, 理学研究科, 教授 (20224107)
• Project Period (FY): 2018-04-01 – 2022-03-31
• Keywords: 非線形偏微分方程式 / 双曲型平衡則系 / 複雑流体 / 消散構造 / 記憶型消散効果 / 減衰評価 / 非線形波 / 安定性

Outline of Annual Research Achievements

複雑流体に関わる様々な非線形偏微分方程式系を対象に、その数学的エントロピー、系に内在する非線形構造および消散構造に着目し、数理解析研究の新たな展望を開くことを目指して研究を行い、次のような成果を得た。
１．記憶項を持つ空間1次元対称双曲系を考察した。記憶核は指数減衰関数の特別な場合を扱い、記憶項は (1) 対称拡散型、(2) 対称消散型 の2通りを考察した。これらの系に対しその消散構造を明らかにし、解の減衰評価、時間無限大での解の漸近形を求めた。記憶項を持つ系の数学解析に貢献する研究成果である。
２．圧縮性 Navier-Stokes-Korteweg 方程式とは、Korteweg 型分散項を持つ圧縮性 Navier-Stokes 方程式である。この系に対し定数平衡解の近傍での初期値問題を考察し、$L^p$ 型 Besov 空間での時間大域解の存在と時間減衰評価を示した。Korteweg 型分散項が、圧縮性 Navier-Stokes 方程式の持つ減衰構造に及ぼす影響を明らかにする上で、貴重な研究成果である。
３．GENERIC と呼ばれる手法を適用し、複雑流体のモデリングを行い、そのモデルの数理解析を行った。特に、その空間1次元モデルが一般の双曲型平衡則系の形を取ること、数学的エントロピーを有し従って対称化可能であること、さらに安定性条件を満たすことを確認した。その結果として、時間大域解の存在と最良の時間減衰評価を示すことが出来た。複雑流体モデルの数理解析に新たな展望を拓く研究成果である。

Research Progress Status

令和3年度が最終年度であるため、記入しない。

Strategy for Future Research Activity

令和3年度が最終年度であるため、記入しない。

Research Products

• [Journal Article] Dissipative structure and asymptotic profiles for symmetric hyperbolic systems with memory (2021)
  • Author(s): Taniue Shogo、Kawashima Shuichi
  • Journal Title: Journal of Hyperbolic Differential Equations Volume: 18 Pages: 453～492
  • DOI: 10.1142/S0219891621500144
  • Peer Reviewed
• [Journal Article] The L energy methods and decay for the compressible Navier-Stokes equations with capillarity (2021)
  • Author(s): Kawashima Shuichi、Shibata Yoshihiro、Xu Jiang
  • Journal Title: Journal de Mathematiques Pures et Appliquees Volume: 154 Pages: 146～184
  • DOI: 10.1016/j.matpur.2021.08.009
  • Peer Reviewed / Int'l Joint Research
• [Journal Article] Thermodynamically consistent modeling for complex fluids and mathematical analysis (2021)
  • Author(s): Suzuki Yukihito、Ohnawa Masashi、Mori Naofumi、Kawashima Shuichi
  • Journal Title: Mathematical Models and Methods in Applied Sciences Volume: 31 Pages: 1919～1949
  • DOI: 10.1142/S0218202521500421
  • Peer Reviewed
• [Journal Article] Local Well-Posedness for Free Boundary Problem of Viscous Incompressible Magnetohydrodynamics (2021)
  • Author(s): Oishi Kenta、Shibata Yoshihiro
  • Journal Title: Mathematics Volume: 9 Pages: 461～461
  • DOI: 10.3390/math9050461
  • Peer Reviewed / Open Access
• [Journal Article] On the Evolution of Compressible and Incompressible Viscous Fluids with a Sharp Interface (2021)
  • Author(s): Kubo Takayuki、Shibata Yoshihiro
  • Journal Title: Mathematics Volume: 9 Pages: 621～621
  • DOI: 10.3390/math9060621
  • Peer Reviewed / Open Access
• [Journal Article] On local solutions to a free boundary problem for incompressible viscous magnetohydrodynamics in the $L_p$ approach (2021)
  • Author(s): Y. Shibata, W. Zajaczkowski
  • Journal Title: Dissertationes Mathematicae Volume: 566 Pages: 1～102
  • DOI: 10.4064/d.777-787-3-2021
  • Peer Reviewed / Int'l Joint Research
• [Journal Article] Singular limit for the magnetohydrodynamics of the damped wave type in the critical Fourier?Sobolev space (2021)
  • Author(s): Matsui Tatsuya、Nakasato Ryosuke、Ogawa Takayoshi
  • Journal Title: Journal of Differential Equations Volume: 271 Pages: 414～446
  • DOI: 10.1016/j.jde.2020.08.023
• [Journal Article] Global well-posedness for the incompressible Navier?Stokes equations in the critical Besov space under the Lagrangian coordinates (2021)
  • Author(s): Ogawa Takayoshi、Shimizu Senjo
  • Journal Title: Journal of Differential Equations Volume: 274 Pages: 613～651
  • DOI: 10.1016/j.jde.2020.10.023
  • Peer Reviewed
• [Journal Article] Well-posedness for the Cauchy problem of convectiondiffusion equations in the critical uniformly local Lebesgue spaces (2021)
  • Author(s): M. R. Haque, N. Ioku, T. Ogawa, R. Sato
  • Journal Title: Differential Integral Equations Volume: 34 Pages: 223～244
  • Peer Reviewed / Int'l Joint Research
• [Journal Article] Singular limit problem to the Keller-Segel system in critical spaces and related medical problems - An application of maximal regularity (2021)
  • Author(s): T. Ogawa
  • Journal Title: Springer Proc. Math. Stat. Volume: 346 Pages: 103～182
  • DOI: 10.1007/978-981-33-4822-6-4
  • Peer Reviewed
• [Journal Article] Inhomogeneous Dirichlet boundary value problem for nonlinear Schr?dinger equations in the upper half-space (2021)
  • Author(s): Hayashi Nakao、Kaikina Elena I.、Ogawa Takayoshi
  • Journal Title: Partial Differential Equations and Applications Volume: 2 Pages: －
  • DOI: 10.1007/s42985-021-00120-9
  • Peer Reviewed / Open Access / Int'l Joint Research
• [Journal Article] Maximal $$L^1$$-regularity of the heat equation and application to a free boundary problem of the Navier-Stokes equations near the half-space (2021)
  • Author(s): Ogawa Takayoshi、Shimizu Senjo
  • Journal Title: Journal of Elliptic and Parabolic Equations Volume: 7 Pages: 509～535
  • DOI: 10.1007/s41808-021-00133-w
  • Peer Reviewed
• [Journal Article] Ill-posedness for the Cauchy problem of the two-dimensional compressible Navier-Stokes equations for an ideal gas (2021)
  • Author(s): Iwabuchi Tsukasa、Ogawa Takayoshi
  • Journal Title: Journal of Elliptic and Parabolic Equations Volume: 7 Pages: 571～587
  • DOI: 10.1007/s41808-021-00136-7
• [Presentation] Global wellposedness for two phase problem of Navier-Stokes equations in ubbounded domains (2022)
  • Author(s): Y. Shibata
  • Organizer: East Asian Workshop on Partial Differential Equations in Fluid Dynamics
  • Int'l Joint Research / Invited
• [Presentation] New thought on Matsumura-Nishida theory in the maximal regularity framework (2021)
  • Author(s): Y. Shibata
  • Organizer: Fluid under Control/Summer School
  • Int'l Joint Research / Invited
• [Presentation] Matsumura and Nishida theorym in the maximal Lp-Lq regularity framework (2021)
  • Author(s): Y. Shibata
  • Organizer: International Workshop on Recent Advances in Nonlinear PDE
  • Int'l Joint Research / Invited
• [Presentation] R-solver, Maximal Regularity and Mathematical Fuid Dynamics (2021)
  • Author(s): Y. Shibata
  • Organizer: Necas Center 偏微分方程式セミナー（チェコアカデミィ）
  • Int'l Joint Research / Invited
• [Presentation] Global wellposedness for two phase problem of Navier-Stokes equations in ubbounded domains (2021)
  • Author(s): Y. Shibata
  • Organizer: Internatial Workshop on Multiphase Flows: Analysis, Modelling and Numerics
  • Int'l Joint Research / Invited
• [Presentation] End-point maximal regularity and free boundary problem of the Navier-Stokes equations (2021)
  • Author(s): T. Ogawa
  • Organizer: MSJ-KSM Joint Meeting 2021 (日本数学会-韓国数学会合同講演会 2021 年)
  • Int'l Joint Research / Invited
• [Presentation] Finite time blow-up and concentration phenomena of a solution to a drift-diffusion equation in higher demension (2021)
  • Author(s): 小川卓克
  • Organizer: 研究集会 「非線型の諸問題」
  • Invited
• [Presentation] Finite time blow-up and concentration phenomena of a solution to a drift-diffusion equation in higher demension (2021)
  • Author(s): 小川卓克
  • Organizer: RACMaS パターンダイナミクス数理セミナー
  • Invited
• [Presentation] Finite time blow-up and concentration phenomena of a solution to a drift-diffusion equation in higher demension (2021)
  • Author(s): 小川卓克
  • Organizer: 早稲田大学 応用解析研究会
  • Invited
• [Presentation] 「非線型発展方程式の臨界構造について」―流体方程式をめぐって― (2021)
  • Author(s): 小川卓克
  • Organizer: 東北大学 理学研究科同窓会 合同講演会 (オンデマンド方式)
  • Invited