RIMS Kôkyûroku
No.1875
”ρˆ³k—¬‚̐”—‰πΝ
Mathematical Analysis of Incompressible Flow
RIMS Œ€‹†W‰ο•ρW
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2013/02/04`2013/02/06
•H“c@r–Ύ
Toshiaki Hishida
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–ځ@ŽŸ
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1. On the $\mathcal{R}$-Boundedness of Solution Operators for the weak Dirichlet-Neumann Problem (Mathematical Analysis of Incompressible Flow)---1
@@@@‘ˆξ“c‘εŠw—HŠwp‰@@@@ŽΔ“c —ǍO@(SHIBATA,Yoshihiro)
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2. Leray's problem on $D$-solutions to the stationary Navier-Stokes equations past an obstacle (Mathematical Analysis of Incompressible Flow)---19
@@@@Department of Engineering and Information Technology, Bern University of Applied Sciences / Department of Mathematics, Sogang University / ‘ˆξ“c‘εŠw—HŠwp‰@@@@Heck Horst / Kim Hyunseok / ¬‰’ ‰p—Y@(Heck,Horst / Kim,Hyunseok / KOZONO,Hideo)
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3. On large time behavior of solutions to the compressible Navier-Stokes equation around a time periodic parallel flow (Mathematical Analysis of Incompressible Flow)---29
@@@@‹γB‘εŠw”—ŠwŒ€‹†‰@@@@‰B‹ —Ǎs@(Kagei,Yoshiyuki)
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4. STOCHASTIC NONPARABOLIC DISSIPATIVE SYSTEMS MODELING THE FLOW OF LIQUID CRYSTALS : STRONG SOLUTION (Mathematical Analysis of Incompressible Flow)---41
@@@@DEPARTMENT OF MATHEMATICS, THE UNIVERSITY OF YORK / DEPARTMENT OF MATHEMATICS AND INFORMATION TECHNOLOGY, MONTANUNIVERSITAT LEOBEN / DEPARTMENT OF MATHEMATICS AND INFORMATION TECHNOLOGY, MONTANUNIVERSITAT LEOBEN@@@BRZEZNIAK,ZDZISLAW / HAUSENBLAS,ERIKA / RAZAFIMANDIMBY,PAUL
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5. Two-dimensional Stochastic Navier-Stokes Equations derived from a certain Variational Problem (Mathematical Analysis of Incompressible Flow)---73
@@@@“Œ‹ž‘εŠw”—‰ΘŠwŒ€‹†‰Θ@@@‰‘ŽR ‘@(Yokoyama,Satoshi)
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6. Global classical solvability of an interface problem on the motion of two fluids (Mathematical Analysis of Incompressible Flow)---84
@@@@Institute for Mechanical Engineering Problems, Russian Academy of Sciences@@@Denisova,Irina Vlad.
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7. An application of a pressure-stabilized characteristics finite element scheme to the linear stability analysis of flows past a circular cylinder (Mathematical Analysis of Incompressible Flow)---109
@@@@‘ˆξ“c‘εŠw‚“™Œ€‹†Š / ‘ˆξ“c‘εŠw—HŠwp‰@@@@–μ’Γ —TŽj / “c’[ ³‹v@(Notsu,Hirofumi / Tabata,Masahisa)
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8. GLOBAL STRONG SOLUTION WITH VACUUM TO THE 2D DENSITY-DEPENDENT NAVIER-STOKES SYSTEM (Mathematical Analysis of Incompressible Flow)---117
@@@@E‘εγ‘εŠwξ•ρ‰ΘŠwŒ€‹†‰Θ / @@@HUANG,XIANGDI / WANG,YUN
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9. ƒ}ƒ‹ƒ`ƒ“ƒQ[ƒ‹‚Μ˜g‘g‚έ‚Ι‚¨‚―‚鐳μ—p‘f‚Ζ‹Ι‘εμ—p‘f (”ρˆ³k—¬‚̐”—‰πΝ)---------------------------------------------------------135
@@@@“Œ‹ž‘εŠw‘εŠw‰@”—‰ΘŠwŒ€‹†‰Θ / “Œ‹ž‘εŠw‘εŠw‰@”—‰ΘŠwŒ€‹†‰Θ@@@“c’† m / Ž›ΰV —S‚@(Tanaka,Hitoshi / Terasawa,Yutaka)
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10. A MATHEMATICAL CLUE TO THE SEPARATION PHENOMENA ON THE TWO-DIMENSIONAL NAVIER-STOKES EQUATION (Mathematical Analysis of Incompressible Flow)---147
@@@@–kŠC“Ή‘εŠw—ŠwŒ€‹†‰@@@@•Δ“c „@(YONEDA,TSUYOSHI)
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11. The Stokes semigroup on spaces of bounded functions (Mathematical Analysis of Incompressible Flow)-----------------------------151
@@@@“Œ‹ž‘εŠw”—‰ΘŠwŒ€‹†‰Θ@@@ˆ’•” Œ’@(Abe,Ken)
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