[1]
|
T. A. Bodnar’, “One Approximate Solution of the Nekrasov Problem,” Journal of Applied Mechanics and Technical Physics, Vol. 48, No. 6, 2007, pp. 818-823.
doi:10.1007/s10808-007-0105-9
|
[2]
|
T. A. Bodnar’, “On Steady Periodic Waves on the Surface of a Fluid of Finite Depth,” Journal of Applied Mechanics and Technical Physics, Vol. 52, No. 3, 2011, pp. 378-384.
doi:10.1134/S0021894411030072
|
[3]
|
T. A. Bodnar’, “On Steady Waves on the Surface of a Finite-Depth Fluid,” Free Boundary Problems: Theory, Experiment, and Applications, 3rd All-Russian Conference with International Participation, Biisk, 28 June-3 July 2008, pp. 25-26.
|
[4]
|
A. I. Nekrasov, “Exact Theory of Steady Waves on the Surface of a Heavy Fluid,” Izd.Akad.Nauk SSSR, Moskow, 1951. (In Russian)
|
[5]
|
R. Courant and D. Hilbert, “Methods of Mathematical Physics,” Interscience, New York, 1953.
|
[6]
|
G. A. Chandler and I. G. Graham, “The Computation of Water Waves Modelled by Nekrasov’s Equation,” SIAM Journal on Numerical Analysis, Vol. 30, 1993, pp. 1041-1065. doi:10.1137/0730054
|
[7]
|
R. Courant, “Differential and Integral Calculus,” Interscience, New York,1936.
|
[8]
|
L. N. Sretenskii, “Theory of Fluid Wave Motion,” Nauka, Moscow, 1977. (In Russian)
|
[9]
|
T. A. Bodnar’, “Conservation Law of the Full Mechanical Energy and Stability of the Steady-State Waves on the Surface of a Fluid of Finite Depth,” In: IV All-Russian Conference with foreign participation on Free Boundary Problems: Theory, Experiment, and Applications, Biisk, 5-10 July 2011, pp. 18-19.
|