| 辻 英一(つじ ひでかず) | データ更新日:2023.11.22 |
助教 /
応用力学研究所
地球環境力学部門
| 1. | Keisuke Nakayama and Hidekazu Tsuji, Multiple solitary wave interactions, Physics of Fluids, 33, 8, 086602, 2021.08. |
| 2. | Keisuke Nakayama, Taro Kakinuma and Hidekazu Tsuji, Oblique reflection of large internal solitary waves in a two-layer fluid, European Journal of Mechanics - B/Fluids, 74, 81-91, 2019.03, The oblique reflection of an incident internal solitary wave is investigated using a fully-nonlinear and strongly-dispersive internal wave model. The 3rd order theoretical solution for an internal solitary wave in a two-layer system is used for the incident solitary wave. Two different incident wave amplitude cases are investigated, in which nine and eleven different incident angles are used for the small and large incident amplitude cases respectively. Under both amplitudes, at least for the cases investigated here, relatively smaller incident angles result in Mach reflection while relatively larger incident angles result in regular reflection. Under Mach-like reflection generation of a ‘stem’ is observed for a certain range of incident angles, in addition to the reflected wave. The stem is found to have, in a certain sense, the characteristics of an internal solitary wave, though the maximum stem wave amplitude is less than four times as large as the original incident internal solitary wave. The stem length is confirmed to increase faster for the larger incident wave amplitude. The maximum amplification factor for the small incident wave is the same as in previous studies. However, the maximum amplification factor for the large incident wave is less than that for the small wave. The results of these calculations are compared with those of the corresponding KP theory and it is found that a lower amplification factor may be a significant characteristic of internal solitary waves.. |
| 3. | 辻 英一, 格子ボルツマン法による KdV-Burgers 方程式の数値計算, 日本流体力学会, 265, (2pages), 2018.09, A numerical scheme using lattice Boltzmann method for KdV-Burgers equation is investigated. The formulation can be obtained using the Chapman-Enskog expansion.The local equilibrium function can be calculated by definitions of moments. The results of numerical calculations for various parameters are proposed and the efficiency of the scheme for solving nonlinear model equations is discussed.. |
| 4. | 辻 英一, Entropic Lattice Boltzmann Method による非線形波動方程式の数値解析, 京都大学数理解析研究所講究録, 2034-09 , 2017.07. |
| 5. | 辻 英一, 低散逸非線形波動方程式の格子ボルツマン法による数値解析, 日本流体力学会, 077, (2pages), 2016.09, A numerical scheme using lattice Boltzmann method for nonlinear wave equation with low Dissipation is investigated. The problem of low dissipation, including high Reynolds number flow, are important especially for theoretical study of fluid dynamics. Karlin et al. proposed the entropic method which improves the calculation for the Navier-Stoke equation. In this study the shock problem of Burgers equation is investigated and preferable character of the entropic method is found.. |
| 6. | 辻 英一, 格子ボルツマン法を用いた非線形波動方程式の数値解析, 京都大学数理解析研究所講究録, Vol.1989,78-84, 2016.04. |
| 7. | 辻 英一, 格子ボルツマン法を用いた非線形波動方程式の数値解析, 日本流体力学会, 076, (2pages), 2015.09, A numerical scheme using lattice Boltzmann method for nonlinear wave equation is investigated. |
| 8. | 中山 恵介, 柿沼太郎, 辻 英一, 及川正行, 振幅の違いを考慮したソリトン共鳴による大振幅ソリトンの解析 , 土木学会論文集B2, 68, 2, 1-5, 2012.10. |
| 9. | 辻 英一, 水波・内部波の非線形二次元相互作用, 京都大学数理解析研究所講究録, Vol.1800,14-24, 2012.07. |
| 10. | 中山 恵介, 柿沼 太郎, 辻 英一, 及川 正行, ソリトン共鳴により発生する大振幅ソリトンの解析, 土木学会論文集B2, 67, 2, I_6-I_10, 2011.10. |
| 11. | 辻英一,丸野健一,児玉裕治,Feng Bao-Feng , Benney-Luke 方程式の孤立波の二次元相互作用, 日本流体力学会年会2011講演論文集, 文書番号2B23 (7 pages), 2011.09, Soliton interactions of the Benney-Luke equation describing shallow water waves are investigated analytically and numerically. An approximate two soliton solution is derived by using a method which combines the Hirota bilinear method and a perturbation method. It is shown numerically that this approximate two soliton solution describes the behavior of two-dimensional soliton interaction of shallow water waves very well. It is shown that critical angles of transitions of soliton interactions are computed analytically from the approximate two soliton solution.. |
| 12. | 辻 英一,渡辺 慎介,丸林 賢次,田中 雅彦, 水面孤立波の二次元的伝播に関する実験, 九大応用力学研究所研究集会報告, 22AO-S8 , 2011.03. |
| 13. | Hidekazu Tsuji and Masayuki Oikawa , Two-dimensional interactions of solitons in a two-layer fluid of finite depth , Fluid Dynamics Research, 10.1088/0169-5983/42/6/065506, 42, 6, 065506, 2010.12. |
| 14. | 中山恵介,柿沼太郎,及川正行,辻 英一,丸谷靖幸, 内部ソリトン波の3次オーダ解による再現性の検討, 土木学会論文集B2, 66, 1, 001-005, 2010.10. |
| 15. | 山下 啓,柿沼太郎,中山恵介,及川正行,辻 英一,西川 学, 深水域や砕波点近傍における非線形内部波の挙動, 土木学会論文集B2, 66, 1, 026-030, 2010.10. |
| 16. | K Ueno, M Farzaneh, S Yamaguchi and H Tsuji , Numerical and experimental verification of a theoretical model of ripple formation in ice growth under supercooled water film flow, Fluid Dynamics Research, 10.1088/0169-5983/42/2/025508, 42, 2, 025508, 2010.09. |
| 17. | 辻英一,及川正行, 二層流体流の孤立波の非対称な二次元相互作用について, 日本流体力学会年会2010講演論文集, 文書番号246, 2010.09. |
| 18. | 辻英一,及川正行, Benjamin-Ono ソリトンの非対称な二次元相互作用, 九大応用力学研究所研究集会報告, 21ME-S7 , 2010.03. |
| 19. | 辻英一,及川正行,児玉祐治, KP方程式の二次元相互作用における漸近的パターンと対応するソリトン解, 日本流体力学会年会2009講演論文集, 22034, 2009.09. |
| 20. | Y Kodama, M Oikawa and H Tsuji , Soliton solutions of the KP equation with V-shape initial waves, Journal of Physics A: Mathematical and Theoretical, vol.42 312001(9pp), 2009.07, [URL]. |
| 21. | Biondini, G, Maruno K, Hidekazu TSUJI, Oikawa M, Soliton interactions of the kadomtsev-petviashvili equation and generation of large-amplitude water waves , Studies in Applied Mathematics, 122, 4, 377-394, 2009.05. |
| 22. | 及川正行,辻英一,児玉祐治, KPII方程式の(3142)型解とV字初期値に対する数値解, 九大応用力学研究所研究集会報告, 20ME-S7 , 2009.02. |
| 23. | 辻英一,及川正行,丸野健一, 長波長孤立波の二次元的相互作用とweb solution, 日本流体力学会年会2008講演論文集, 32033, 2008.09. |
| 24. | 丸野健一,Gino Biondini,辻英一,及川正行, KP方程式の多ソリトンの最大振幅とExtremeWaveの生成, 九大応用力学研究所研究集会報告, 19ME-S2, 2008.04. |
| 25. | 及川正行,辻英一, 有限深さの二層流体におけるソリトンの弱い二次元相互作用, 京都大学数理解析研究所研究集会報告集, Vol.1594,177-185, 2008.04. |
| 26. | Hidekazu TSUJI, Masayuki OIKAWA, Oblique interactions of solitons in an Extended Kadomtsev-Petviashvili Equation, Journal of the Physical Society of Japan, Vol.76 (2007) 084401, 2007.08. |
| 27. | 辻英一,及川正行, 地形の影響を受ける浅水孤立波の二次元相互作用, 九大応用力学研究所研究集会報告, 18SP1-4, 2007.07. |
| 28. | 辻英一,及川正行, 深さ依存性を考慮した二層流体中の孤立波の二次元相互作用の解析, 京都大学数理解析研究所研究集会報告集, 86-96, 2007.04. |
| 29. | M. Oikawa and H. Tsuji, Oblique interactions of weakly nonlinear long waves in dispersive systems, Fluid Dynamics Research, Vol. 38, pp. 868 - 898, 2006.12. |
| 30. | 辻英一,及川正行, 有限水深方程式のソリトン解の二次元相互作用, 日本流体力学会年会2006講演論文集, AM06-16-006, 2006.09. |
| 31. | H.Tsuji and M. Oikawa, Oblique Interaction of Solitary Waves in an Extended Kadomtsev- Petviashvili Equation, Proceedings of the XXXIII Summer School "Advanced Problems in Mechanics 2005", St.Petersburg, pp. 303 - 310, 2006.07. |
| 32. | 辻英一,丸野健一,A.V. Porubov,及川正行, 浅水領域における孤立波の二次元相互作用と振幅の増幅について, 九大応用力学研究所研究集会報告 , 17特1-2, pp. 88 - 96, 2006.06. |
| 33. | 辻英一,及川正行, ある非局所分散性を持つ系での孤立波の二次元相互作用について, 京大数理解析研究所講究録, No. 1483 pp. 24 - 34, 2006.04. |
| 34. | A.V. Porubov, H. Tsuji, I.V. Lavrenov and M. Oikawa, Formation of the rogue wave due to non-linear two-dimensional waves interaction, Wave Motion, 10.1016/j.wavemoti.2005.02.001, 42, 3, 202-210, Volume 42, Issue 3 , September 2005, p.202, 2005.09. |
| 35. | 辻英一,A.V. Porubov,及川正行, 非局所分散項を持つ2次元非線形浅水波方程式の解析, 日本流体力学会年会2005講演論文集, AM05-16-002, 2005.09. |
| 36. | 辻英一,及川正行,A.V.Porubov, KP方程式による孤立波相互作用とRogue Waveの関連について, 九大応用力学研究所研究集会報告, 16ME-S1 (2005) 210, 2005.06. |
| 37. | 丸野健一,辻英一,及川正行, 浅水波の振幅増大機構とKP方程式のある行列式解, 京大数理解析研究所講究録, Vol. 1430 pp. 81 – 95, 2005.05. |
| 38. | 丸野健一,辻英一,及川正行, 浅い水の波の振幅増大機構とKP方程式の解の関係, 九大応用力学研究所研究集会報告, No. 16ME-S1 pp. 225 – 231, 2005.04. |
| 39. | A.V. Porubov, I.V. Lavrenov and H. Tsuji, Formation of abnormally high localized waves due to nonlinear two- dimensional waves interaction, Proccedings of the International conference "Day on Diffraction'2004", p.184., 2004.11. |
| 40. | Hidekazu TSUJI, Masayuki OIKAWA, Two-dimensional Interaction of Solitary Waves in a Modified Kadomtsev-Petviashvili Equation, J. Phys. Soc. Jpn.,, 10.1143/JPSJ.73.3034, 73, 11, 3034-3043, Vol.73, No.11, p.3034-3043, 2004.11. |
| 41. | 辻英一,及川正行,A.V. Porubov, 弱非線形理論による浅水域でのrogue waveの解析, 日本流体力学会年会2004講演論文集, pp. 694 – 695, 2004.08. |
| 42. | 丸野健一,辻英一,及川正行, KP 方程式の多ソリトン解と振幅増大機構 : 行列式アプローチ, 日本流体力学会年会2004講演論文集, pp. 694 – 695, 2004.08. |
| 43. | 辻英一,及川正行, 臨界深さ近くを伝播する内部波ソリトンの二次元的相互作用, 京大数理解析研究所講究録, 1368 (2004) 213 - 220., 2004.06. |
| 44. | 辻英一,及川正行, 一層が無限に深い二層流体中の地形によって生成される内部波, 日本流体力学会年会2003講演論文集, pp. 280 - 281, 2003.07. |
| 45. | 辻英一,及川正行, Modified-KdVソリトンの二次元的相互作用, 日本流体力学会年会2002講演論文集, pp. 90 - 91, 2002.07. |
| 46. | 辻英一、及川正行, Modified KP 方程式のソリトン解の二次元的相互作用, 京大数理解析研究所講究録, 1271(2002)125-134, 2002.06. |
| 47. | 辻英一、及川正行, ソリトンの斜め相互作用について, 九大応用力学研究所研究集会報告, 13ME-S4 (2002) 128-133, 2002.04. |
| 48. | Hidekazu TSUJI, Masayuki OIKAWA, Oblique interaction of internal solitary waves in a two-layer fluid of infinite depth, Fluid Dynamics Research, 10.1016/S0169-5983(01)00026-0, 29, 4, 251-267, Vol.29(2001)251-267, 2001.12. |
| 49. | 舟久保佑子,大塚一路,渡辺慎介,辻英一,及川正行, 大振幅浅水孤立波の伝播・不安定及び反射, 日本流体力学会年会2001講演論文集, pp.359 - 360, 2001.07. |
| 50. | 舟久保佑子、皆川大輔、渡辺慎介、辻英一、及川正行, 大振幅浅水孤立波の伝播と不安定に関する実験, 京大数理解析研究所講究録, 1209(2001)211-222, 2001.05. |
| 51. | 辻英一,及川正行, Benjamin-Onoソリトンの二次元的相互作用, 日本流体力学会年会2000講演論文集, pp.491 - 492, 2000.07. |
| 52. | 辻英一、及川正行, Benjamin-Onoソリトンの二次元的不安定性, 九大応用力学研究所研究集会報告, 11ME-S2(2000)5-10, 2000.03. |
| 53. | 辻英一、及川正行, 非常に深い二層流体中を伝播する孤立波の二次元的相互作用, 京大数理解析研究所講究録, 1092(1999)189-198, 1999.04. |
| 54. | 辻英一、及川正行, 一層が非常に深い二層流体中の地形による長波の生成, 京大数理解析研究所講究録, 1030(1998)180-190, 1998.04. |
| 55. | 辻英一, 成層流体中の孤立波の伝播, 京大数理解析研究所講究録, 993(1997)161-171, 1997.05. |
| 56. | Hidekazu TSUJI, Manabu INADA and Masayuki OIKAWA, Long Waves Generated by Topography in Two-Layer Fluid with Infinite Depth --- Forced Benjamin-Ono Equation, Engineering Science Report Kyushu University (KYUSHU DAIGAKU SOGORIKOUGAKU KENKYUKA HOUKOKU), 19(1997)331-337, 1997.01. |
| 57. | Yoshimoto ONISHI.and Hidekazu TSUJI, Transient Behavior of a Vapor due to Evaporation amd Condensation between the Plane Condensed Phases, Proceedings of the 19th International Symposium on Rarefied Gas Dynamics, Oxford University Press, pp.284-290 (1995), 1995.01. |
| 58. | Hidekazu Tsuji and Yoshimoto Onishi, Temperature Jump in a Binary Gas Mixture with Imperfect Accommodation, Proceedings of the 19th International Symposium on Rarefied Gas Dynamics, Oxford University Press, pp.1107-1113 (1995), 1995.01. |
| 59. | Yoshimoto Onishi Takeshi Shoji and Hidekazu Tsuji, Interactions of Shock and Expansion Waves caused in a Vapor between the Two Plane Condensed Phases, Proceedings of the International Symposium on Aerospace and Fluid Science, Institute of Fluid Science, Tohoku University, pp.517-524 (1994), 1994.01. |
| 60. | Hidekazu TSUJI, Masayuki Oikawa, 2-Dimensional Interaction of Internal Solitary Waves in a 2-Layer Fluid, Journal of the Physical Society of Japan, 10.1143/JPSJ.62.3881, 62, 11, 3881-3892, Vol.62 No.11 3881-3892 1993, 1993.11. |
| 61. | 辻英一、及川正行, 二層流体中における内部孤立波の二次元的相互作用について, 京大数理解析研究所講究録, 830(1993)65-74, 1993.04. |
| 62. | 辻英一、及川正行, 二層流体におけるソリトンの相互作用, 京大数理解析研究所講究録, 782(1992)15-25, 1992.01. |
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