|
Publication List - Takeshi Gotoda (10 entries)
Journal Paper
-
Takeshi Gotoda.
Energy conservation in the limit of filtered solutions for the 2D Euler equations,
Nonlinearity,
Oct. 2022.
Official location
-
Takeshi Gotoda.
Self-similar Motions and Related Relative Equilibria in the N-point Vortex System,
Journal of Dynamics and Differential Equations,
Dec. 2021.
Official location
-
Kota Ohno,
Yasuaki Kobayashi,
Masaaki Uesaka,
Takeshi Gotoda,
Mitsuhiro Denda,
Hideyuki Kosumi,
Mika Watanabe,
Ken Natsuga,
Masaharu Nagayama.
A computational model of the epidermis with the deformable dermis and its application to skin diseases,
Scientific Reports,
Vol. 11,
No. 1,
June 2021.
Official location
-
Mamoru Okamoto,
Takeshi Gotoda,
Masaharu Nagayama.
Global existence of a unique solution and a bimodal travelling wave solution for the 1D particle-reaction-diffusion system,
Journal of Physics Communications,
May 2021.
Official location
-
Takeshi Gotoda.
Convergence of filtered weak solutions to the 2D Euler equations with measure-valued vorticity,
Journal of Evolution Equations,
Vol. 20,
No. 4,
pp. 1485-1509,
Dec. 2020.
Official location
-
Mamoru Okamoto,
Takeshi Gotoda,
Masaharu Nagayama.
Existence and non-existence of asymmetrically rotating solutions to a mathematical model of self-propelled motion,
Japan Journal of Industrial and Applied Mathematics,
Vol. 37,
No. 3,
pp. 883-912,
Sept. 2020.
Official location
-
Takeshi Gotoda,
Takashi Sakajo.
Universality of the Anomalous Enstrophy Dissipation at the Collapse of Three Point Vortices on Euler--Poincaré Models,
SIAM Journal on Applied Mathematics,
Vol. 78,
No. 4,
pp. 2105-2128,
Jan. 2018.
Official location
-
Takeshi Gotoda.
Global solvability for two-dimensional filtered Euler equations with measure valued initial vorticity,
Differential and Integral Equations,
2018.
Official location
-
Takeshi Gotoda,
Takashi Sakajo.
Distributional Enstrophy Dissipation Via the Collapse of Three Point Vortices,
Journal of Nonlinear Science,
Vol. 26,
No. 5,
pp. 1525-1570,
Oct. 2016.
Official location
Book
[ Save as BibTeX ]
[ Paper, Presentations, Books, Others, Degrees: Save as CSV
]
[ Patents: Save as CSV
]
|