① A new geometric integration algorithm for the Staeckel system, ICIAM 2003<オーストラリア・シドニー>【学会発表】(2003.7)

② Accurate numerical integration algorithm for the Kepler motion, SIDE6.5<ドイツ・ミュンヘン> 【学会発表】(2005.7)

③ Conservative discretization of the gravitational three-body Problem<中国・紹興市> 【学会発表】(2010.1)

④ 重力3体問題の全保存型差分法 <東京大学，数値解析セミナー>【講演】(2011.5)

⑤ Totally Conservative Integrator for Integrable Hamiltonian Systems and its Generalization to Holonomic Constrained Systems, ICIAM 2015 <中国・北京市>【学会発表】(2015.8)

⑥ Discrete-time N-body Problem and its Equilibrium Solutions, Geometric Numerical Integration and its Applications, IMI-La Trobe Joint Conference<オーストラリア，メルボルン市> 【学会発表】(2016.12)

⑦ N-body solvers based on totally conservative Kepler solvers and their equilibria, SIDE13 <福岡市> 【学会発表】(2018.11)

① The discrete relativistic Toda molecule equation and a Pde approximation Algorithm, Numerical Algorithms, 27 (2001), 219

② A new discretization of the Kepler motion which conserves the Runge-Lenz vector, Physics Letters A 306 (2002), 127

③ New numerical integrator for the Stackel system conserving the same number of constants of motion as the degree of freedom, Journal of Physics A 39(2006), 9453

④ Accurate Orbital Integration of the General Three-body Problem Based on the d'Alembert-type Scheme, The Astronomical Journal 145 (2013), 63

⑤ Equilibrium Solutions of the Logarithmic Hamiltonian Leapfrog for the N-body Problem, The Astrophysical Journal, 857 (2018), 92

⑥ Totally Conservative Integration Method for the General Three-body Problemand Its Lagrangian Solutions, The Astrophysical Journal, 873 (2019), 4

⑦ Quasi-conservative Integration Method for Restricted Three-body Problem,The Astrophysical Journal,949 (2023), 111