RIMS Kôkyûroku
No.1985
—¬‘Μ‚Ζ‹C‘̂̐”Šw‰πΝ
Mathematical Analysis in Fluid and Gas Dynamics
RIMS Œ€‹†W‰ο•ρW
 @
2015/07/08`2015/07/10
¬—с@Fs
Takayuki Kobayashi
@
–ځ@ŽŸ
@
1. On stability of line solitons for the KP-II equation (Mathematical Analysis in Fluid and Gas Dynamics)----------------------------1
@@@@L“‡‘εŠw‘‡‰ΘŠwŒ€‹†‰Θ@@@…’¬ “O@(Mizumachi,Tetsu)
@
2. STABILITY OF TRANSITION FRONT SOLUTIONS IN CAHN-HILLIARD SYSTEMS (Mathematical Analysis in Fluid and Gas Dynamics)---------------20
@@@@DEPARTMENT OF MATHEMATICS, TEXAS A&M UNIVERSITY / DEPARTMENT OF MATHEMATICAL SCIENCES, ULSAN NATIONAL INSTITUTE OF SCIENCE AND TECHNOLOGY@@@Howard,Peter / Kwon,Bongsuk
@
3. ”ρˆκ—l‚Θ•Η–Κ‚©‚η‚Θ‚ιƒ}ƒCƒNƒƒ`ƒƒƒlƒ‹“ΰ‚Μ“d‹CZ“§—¬‚Μ‰πΝ (—¬‘Μ‚Ζ‹C‘̂̐”Šw‰πΝ)--------------------------------------------------41
@@@@–L“c’†‰›Œ€‹†Š@@@‹g“c LŒ°@(Yoshida,Hiroaki)
@
4. WEAK NORM INFLATION IN A FAMILY OF SOBOLEV SPACES FOR THE 2D EULER EQUATIONS (Mathematical Analysis in Fluid and Gas Dynamics)---54
@@@@DEPARTMENT OF MATHEMATICS, UNIVERSITY OF NOTRE DAME / “Œ‹žH‹Ζ‘εŠw—HŠwŒ€‹†‰Θ@@@Misiolek Gerard / •Δ“c „@(Misiolek,Gerard / Yoneda,Tsuyoshi)
@
5. Time-periodic problem for the compressible Navier-Stokes-Korteweg system on $\mathbb{R}^{3}$ (Mathematical Analysis in Fluid and Gas Dynamics)---60
@@@@‹γB‘εŠw”—ŠwŒ€‹†‰@@@@’Γ“c ˜aK@(Tsuda,Kazuyuki)
@
6. $\mathcal{R}$-BOUNDEDNESS OF SOLUTION OPERATOR FAMILIES FOR TWO-PHASE STOKES RESOLVENT PROBLEM AND ITS APPLICATION (Mathematical Analysis in Fluid and Gas Dynamics)---80
@@@@‘ˆξ“c‘εŠwŠξŠ²—HŠwŒ€‹†‰Θ@@@Φ“‘ •½˜a@(Saito,Hirokazu)
@
7. BOUNDARY LAYERS OF INVISCID COMPRESSIBLE NON-ISENTROPIC FLOW IN HALF SPACE (Mathematical Analysis in Fluid and Gas Dynamics)-----96
@@@@DEPARTMENT OF MATHEMATICS, CITY UNIVERSITY OF HONG KONG / DEPARTMENT OF MATHEMATICS, MOE-LSC AND SHL-MAC, SHANGHAI JIAO TONG UNIVERSITY / DEPARTMENT OF MATHEMATICS, SHANGHAI JIAO TONG UNIVERSITYEDEPARTMENT OF MATHEMATICS, CITY UNIVERSITY OF HONG KONG@@@Liu,Cheng-Jie / Wang,Ya-Guang / Yang,Tong
@
8. On the Cattabriga problem appearing in the two phase problem of the viscous fluid flows (Mathematical Analysis in Fluid and Gas Dynamics)---116
@@@@‘ˆξ“c‘εŠw—HŠwp‰@@@@ŽΔ“c —ǍO@(Shibata,Yoshihiro)
@
9. ”χΆ•¨‚̋ǍݑΗ¬Œ`¬‹@\‚ΙŠΦ‚·‚ιŒυ‘–«‚̐”—ƒ‚ƒfƒ‹ (—¬‘Μ‚Ζ‹C‘̂̐”Šw‰πΝ)-------------------------------------------------------138
@@@@L“‡‘εŠw‘εŠw‰@—ŠwŒ€‹†‰Θ@@@”ΡŠΤ M@(Iima,Makoto)
@
10. WELL-POSEDNESS OF THE COMPRESSIBLE NAVIER-STOKES-POISSON SYSTEM IN BESOV SPACES (Mathematical Analysis in Fluid and Gas Dynamics)---144
@@@@“Œ–k‘εŠw—ŠwŒ€‹†‰Θ / “Œ–k‘εŠw—ŠwŒ€‹†‰Θ @@@η“ͺ Έ / ¬μ ‘μŽ @(Chikami,Noboru / Ogawa,Takayoshi)
@
11. Global existence and optimal decay rates of solutions to the classical Timoshenko system in the framework of Besov spaces (Mathematical Analysis in Fluid and Gas Dynamics)---159
@@@@‹γB‘εŠw‘εŠw‰@”—Šw•{”—ŠwκU / Department of Mathematics, Nanjing University of Aeronautics and Astronautics / ‹γB‘εŠw”—Šw•{@@@X ’Ό•Ά / Xu Jiang / μ“‡ Gˆκ@(Mori,Naofumi / Xu,Jiang / Kawashima,Shuichi)
@
12. Existence of unbounded solutions to the isentropic $p$-system with a self-gravitational term (Mathematical Analysis in Fluid and Gas Dynamics)---180
@@@@‘εγ‘εŠwξ•ρ‰ΘŠwŒ€‹†‰Θ@@@ŽR–{ ‹gF@(Yamamoto,Yoshitaka)
@