Basic Conservation Laws of the System of Equations of Two-Dimensional Shallow Water over an Uneven Bottom in the Lagrangian Variables

   Systems of equations of two-dimensional shallow water over an uneven bottom have been considered in both the Eulerian and Lagrangian variables. An intermediate system of equations has been introduced. Its solutions are simultaneously solutions of the system of equations of two-dimensional shallow water in the Eulerian variables and implicit solutions of the system of equations of two-dimensional shallow water in the Lagrangian variables. All basic hydrodynamic conservation laws of the intermediate system of equations have been found without using symmetries. A relationship has been obtained between the conservation laws of the intermediate system of equations and the system of equations of two-dimensional shallow water in the Lagrangian variables. The basic hydrodynamic conservation laws of the intermediate system of equations have been used to construct the basic conservation laws of the first order for the system of equations of two-dimensional shallow water in the Lagrangian variables.

1. Noether E. Invariante Variationsprobleme // Nachr. D. König. Gesellsch. D. Wissen. Zu Göttingen, Math.-Phys. Klasse. 1918. P. 235–257 (English translation: Transport Theory and Stat. Phys. 1971. V. 1. № 3. P. 186–207).

2. Olver P. J. Applications of Lie Groups to Differential Equations, 2nd ed., Springer, 1993, 513 pp.

3. Symmetries and Conservation Laws for Differential Equations of Mathematical Physics, Editors: A. M. Vinogradov and I. S. Krasil’shchik, American Mathematical Society, 1999, v. 182, 333 pp.

4. Bluman G. W., Cheviakov A. F., Anco S. C. Applications of Symmetry Methods to Partial Differential Equations, Springer. 2010. 398 pp.

5. Shmyglevski Yu. D., Analytical Study of Gas Dynamics and Fluid, Editorial URSS, Moscow, 1999, 232 pp. (in Russian).

6. Polyanin A. D., Zaitsev V. F. Handbook of Nonlinear Partial Differential Equations, 2nd ed., CRC Press, Boca Raton. 2012. 1840 p.

7. Aksenov A. V., Druzhkov K. P. Zakony sokhranenija, simmetrii i tochnye reshenija sistemy uravnenij melkoj vody nad nerovnym dnom [Conservation Laws, Symmetries, and Exact Solutions of the System of Equations of Shallow Water over an Irregular Bottom] // Vestnik Nacional’nogo issledovatel’skogo yadernogo universiteta MIFI, 2016, v. 5, 1, p. 38–46.

8. Aksenov A. V., Druzhkov K. P. Conservation laws and symmetries of the shallow water system above rough bottom // Journal of Physics: Conference Series. 2016. V. 722. P. 1–7.

9. Stoker J. J. Water Waves. The Mathematical Theory With Applications. Interscience Publishers, Inc., New York, 1957, 609 pp.

10. Courant R., Friedrichs K. O. Supersonic Flow and Shock Waves, Interscience Publ, New York, 1948, 464 pp.

11. Cherny G. G. Gas dynamics, Nauka, Moscow, 1988, 424 pp. (in Russian).