流体方程式における特異摂動と安定性の数学解析

• Project/Area Number: 20K03698
• Research Category: Grant-in-Aid for Scientific Research (C)
• Allocation Type: Multi-year Fund
• Section: 一般
• Review Section: Basic Section 12020:Mathematical analysis-related
• Research Institution: Kyoto University
• Principal Investigator: 前川 泰則 京都大学, 理学研究科, 教授 (70507954)
• Project Period (FY): 2020-04-01 – 2025-03-31
• Project Status: Granted (Fiscal Year 2023)
• Budget Amount: ¥4,420,000 (Direct Cost: ¥3,400,000、Indirect Cost: ¥1,020,000); Fiscal Year 2022: ¥1,430,000 (Direct Cost: ¥1,100,000、Indirect Cost: ¥330,000); Fiscal Year 2021: ¥1,430,000 (Direct Cost: ¥1,100,000、Indirect Cost: ¥330,000); Fiscal Year 2020: ¥1,560,000 (Direct Cost: ¥1,200,000、Indirect Cost: ¥360,000)
• Keywords: 偏微分方程式 / ナヴィエ・ストークス方程式 / 境界層 / Navier-Stokes方程式 / 漸近解析 / 流体力学 / 解の漸近挙動 / 特異極限 / 安定性

Outline of Research at the Start

流体方程式に対する特異極限問題に関連した，次の研究を行う．I.粘性消滅極限における境界層の安定性：Navier-Stokes方程式の粘性消滅極限問題について，一般の凸非シアー型境界層の粘性消滅極限における安定性をGevrey指数3/2クラスの関数空間で実現することを目指す．II. 橋脚周りの流れの安定性：橋脚周りの川の流れのように一様背後流の中に長い柱状物体をおいた際に現れる接触点を伴うOseen流に関する自由境界問題の数学解析を行う．一様背後流が遅い場合の平衡状態の一意存在定理とその擾乱に対する安定性定理の確立を目指す．

Outline of Annual Research Achievements

昨年度に引き続き、Navier-Stokes方程式の境界層に関連した数学的研究を行った。流体と固体壁との相対速度が零となる粘着境界条件が満たされる場合には、境界付近において高いReynolds数を反映したPrandtl境界層が典型的に現れ、境界層に潜在する強い微分損失構造により、境界層近傍において解の定量的評価を確立することが難しくなる。境界層構造を記述するPrandtl方程式の改良版としてTriple deckモデルが知られている。このモデルの線形化問題の時間局所可解性について、凸shear型の境界層の周りにおいては、Gevreyの3/2クラスでの可解性が成り立つことを証明し、国際共著論文としてまとめて査読付き国際誌に受理された。さらに、Triple deckモデルの定常問題について研究を行い、特殊解であるクエット流のlocal rigidityを示すことに成功した。証明では、方程式の持つ自然なスケール臨界空間を足掛かりにするとともに、鉛直方向の一次増大項からくる困難を取り除く変換を導入するとともに、方程式に付随する非局所境界条件に由来する楕円型平滑化効果を見出したことが大きな鍵となっている。これまでのところTriple deckモデルの定常問題に関する数学的な結果はほとんど知られておらず、本研究が先駆的なものになると思われる。この研究成果は、共著論文として査読付国際誌への投稿を準備している。このほか、外力付きの定常問題の可解性を調べるために必要となる関数空間の設定についても考察を行った。

Current Status of Research Progress

2: Research has progressed on the whole more than it was originally planned.

Reason

固定壁近傍の流れにおいて現れる境界層と関係するTriple deckモデルの定常問題に進展があったため。

Strategy for Future Research Activity

境界層のTriple deckモデルの定常問題については、外力がある場合の可解性といった基本的な問題が未解決なので、研究を進めている。昨年度に得られたlocal rigidityの証明で得られた知見を活かせると思われる。また、Navier-Stokes方程式の初期値問題の解の非一意性を境界層の立場から研究することは意義深いと思われる。

Research Products

• [Int'l Joint Research] Universite Paris Cite(フランス)
• [Int'l Joint Research] University of California, Davis(米国)
• [Int'l Joint Research] IMJ-PRG(フランス)
• [Int'l Joint Research] パリ第7大学(フランス)
• [Int'l Joint Research] パリ第7大学(フランス)
• [Int'l Joint Research] クーラン研究所(米国)
• [Journal Article] Improved Well-Posedness for the Triple-Deck and Related Models via Concavity (2023)
  • Author(s): Gerard-Varet David、Iyer Sameer、Maekawa Yasunori
  • Journal Title: Journal of Mathematical Fluid Mechanics Volume: 25 Issue: 3
  • DOI: 10.1007/s00021-023-00809-4
  • Peer Reviewed / Int'l Joint Research
• [Journal Article] Existence of the stationary Navier-Stokes flow in <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" altimg="si1.svg"><mml:msup><mml:mrow><mml:mi mathvariant="double-struck">R</mml:mi></mml:mrow><mml:mrow><mml:mn>2</mml:mn></mml:mrow></mml:msup></mml:math> around a radial flow (2023)
  • Author(s): Maekawa Yasunori、Tsurumi Hiroyuki
  • Journal Title: Journal of Differential Equations Volume: 350 Pages: 202-227
  • DOI: 10.1016/j.jde.2022.12.043
  • Peer Reviewed
• [Journal Article] Rate of the Enhanced Dissipation for the Two-jet Kolmogorov Type Flow on the Unit Sphere (2022)
  • Author(s): Maekawa Yasunori、Miura Tatsu-Hiko
  • Journal Title: Journal of Mathematical Fluid Mechanics Volume: 24 Issue: 3
  • DOI: 10.1007/s00021-022-00718-y
  • Peer Reviewed / Open Access
• [Journal Article] Characterization of dissipative structures for first-order symmetric hyperbolic system with general relaxation (2021)
  • Author(s): Yasunori Maekawa and Yoshihiro Ueda
  • Journal Title: Mathematics Volume: 9 Issue: 7 Pages: 728-728
  • DOI: 10.3390/math9070728
  • Peer Reviewed / Open Access
• [Journal Article] Gevrey stability of Rayleigh boundary layer in the inviscid limit (2021)
  • Author(s): Maekawa Yasunori
  • Journal Title: Journal of Elliptic and Parabolic Equations Volume: 7 Issue: 2 Pages: 417-438
  • DOI: 10.1007/s41808-021-00128-7
  • Peer Reviewed
• [Journal Article] Note on smoothing estimates for Kolmogorov type equations (2021)
  • Author(s): Maekawa Yasunori
  • Journal Title: Partial Differential Equations and Applications Volume: 2 Issue: 6 Pages: 1-12
  • DOI: 10.1007/s42985-021-00135-2
  • Peer Reviewed
• [Journal Article] On stability of physically reasonable solutions to the two-dimensional Navier-Stokes equations (2021)
  • Author(s): Y. Maekawa
  • Journal Title: Journal of the Institute of Mathematics of Jussieu Volume: 20 Issue: 2 Pages: 517-568
  • DOI: 10.1017/s1474748019000240
  • Peer Reviewed
• [Journal Article] Estimates for the Navier-Stokes equations in the half-space for nonlocalized data (2020)
  • Author(s): Maekawa Yasunori、Miura Hideyuki、Prange Christophe
  • Journal Title: Analysis & PDE Volume: 13 Issue: 4 Pages: 945-1010
  • DOI: 10.2140/apde.2020.13.945
  • Peer Reviewed / Open Access / Int'l Joint Research
• [Presentation] Optimal rate of convergence to nondegenerate asymptotic profiles for fast diffusion (2024)
  • Author(s): 前川泰則
  • Organizer: Saga Workshop on Partial Differential Equations
  • Invited
• [Presentation] Optimal rate of convergence to nondegenerate asymptotic profiles for fast diffusion (2023)
  • Author(s): Y. Maekawa
  • Organizer: 国際研究集会``Harmonic Analysis and Nonlinear Partial Differential Equations"
  • Int'l Joint Research / Invited
• [Presentation] Optimal rate of convergence to nondegenerate asymptotic profiles for fast diffusion (2023)
  • Author(s): Y. Maekawa
  • Organizer: 国際研究集会``Recent Advances in Nonlinear PDEs and their Applications in Celebration of the 60th Anniversary of CUHK"
  • Int'l Joint Research / Invited
• [Presentation] Optimal rate of convergence to nondegenerate asymptotic profiles for fast diffusion (2023)
  • Author(s): Y. Maekawa
  • Organizer: 国際研究集会``Critical Phenomena in Nonlinear Partial Differential Equations, Harmonic Analysis, and Functional Inequalities"
  • Int'l Joint Research / Invited
• [Presentation] On the stability of the boundary layer in the inviscid limit for the Navier-Stokes flows (2023)
  • Author(s): Y. Maekawa
  • Organizer: 国際研究集会``NCTS-Kyoto Mathematics Symposium"
  • Int'l Joint Research / Invited
• [Presentation] On the solvability of the linearized Triple-Deck system (2023)
  • Author(s): Y. Maekawa
  • Organizer: Analysis of fluid dynamical PDEs
  • Int'l Joint Research / Invited
• [Presentation] On the solvability of the linearized Triple-Deck system (2022)
  • Author(s): Y. Maekawa
  • Organizer: The 8th Japan-China Workshop on Mathematical Topics
  • Int'l Joint Research / Invited
• [Presentation] Gevrey stability of Rayleigh boundary layer in the inviscid limit (2021)
  • Author(s): Yasunori Maekawa
  • Organizer: Fudan International Seminar on Analysis, PDEs, and Fluid mechanics
  • Int'l Joint Research / Invited
• [Presentation] Recent progress on the Prandtl boundary layer expansion for viscous incompressible flows (2021)
  • Author(s): Yasunori Maekawa
  • Organizer: Asia-Pacific Analysis and PDE Seminar
  • Int'l Joint Research / Invited
• [Presentation] Gevrey stability of Rayleigh boundary layer in the inviscid limit (2021)
  • Author(s): Yasunori Maekawa
  • Organizer: Colloquium talk at Institute of Natural Sciences/School of Math at SJTU
  • Invited
• [Presentation] Algebraic characterization on the dissipative structure of the first-order symmetric hyperbolic system with general relaxation (2021)
  • Author(s): Yasunori Maekawa
  • Organizer: International Workshop on Recent Advances in Nonlinear PDEs
  • Int'l Joint Research / Invited
• [Presentation] Rayleigh 境界層周りにおける Prandtl 境界層展開につ いて (2021)
  • Author(s): 前川泰則
  • Organizer: 北海道大学 偏微分方程式セミナー
  • Invited
• [Presentation] Stability of the Prandtl boundary layer in the inviscid limit (2021)
  • Author(s): Y. Maekawa
  • Organizer: Online Workshop for Nonlinear Partial Differential Equations (online)，Kobe University
  • Int'l Joint Research / Invited
• [Presentation] Prandtl boundary layer expansion in a Gevrey class around concave boundary layer (2020)
  • Author(s): Y. Maekawa
  • Organizer: International Workshop on Multiphase Flows (online), Waseda University
  • Int'l Joint Research / Invited
• [Presentation] Prandtl boundary layer expansion in a Gevrey class around concave boundary layer (2020)
  • Author(s): Y. Maekawa
  • Organizer: Vorticity, Rotation and Symmetry (V) - Global Results and Nonlocal Phenomena (online)，CIRM，Luminy
  • Int'l Joint Research / Invited
• [Funded Workshop] Mathematical Analysis of Viscous Incompressible Fluid (2021)