Информация о публикации

Просмотр записей

Инд. авторы:	Shokin Y.I., Cherny S.G., Esipov D.V., Lapin V.N., Lyutov A.E., Kuranakov D.S.
Заглавие:	Three-dimensional model of fracture propagation from the cavity caused by quasi-static load or viscous fluid pumping
Библ. ссылка:	Shokin Y.I., Cherny S.G., Esipov D.V., Lapin V.N., Lyutov A.E., Kuranakov D.S. Three-dimensional model of fracture propagation from the cavity caused by quasi-static load or viscous fluid pumping // Communications in Computer and Information Science. - 2015. - Vol.549. - P.143-157. - ISSN 1865-0929. - EISSN 1865-0937.
Внешние системы:	DOI: 10.1007/978-3-319-25058-8_15; РИНЦ: 26927996; SCOPUS: 2-s2.0-84951946204;
Реферат:	eng: An approach to the computer simulation of a tsunami run-up on the coast is presented, based on nested grids and the large-particle method. The computational algorithms are based on the classical equations of shallow-water theory. The main elements of the developed computational technology are described and the results are given of the verification and validation of numerical algorithms, as well as the mathematical model and of one- and two-dimensional test problems. The capabilities of the algorithms developed by the authors are demonstrated for the calculation of the defining parameters of the tsunami run-up on the coast in the vicinity of the town of Severo-Kurilsk (November 5, 1952).
Ключевые слова:	method of large particles; mathematical modeling; tsunami waves; run-up;
Издано:	2015
Физ. характеристика:	с.143-157
Цитирование:	1. N. Mori, T. Takahashi, and The 2011 Tohoku Earthquake Tsunami Joint Survey Group, “Nationwide post event survey and analysis of the 2011 Tohoku earthquake tsunami,” Coast. Eng. J. 54, 1–27 (2012). 2. H. Kawai, M. Sato, K. Kawaguchi, and K. Seki, “The 2011 off the Pacific coast of Tohoku earthquake tsunami observed by GPS buoys,” J. Jpn. Soc. Civil Eng., Ser. B2 67, 1291–1295 (2011). 3. G. Oger, M. Doring, B. Alessandrini, and P. Ferrant, “Two-dimensional SPH simulations of wedge water entries,” J. Comput. Phys. 213, 803–822 (2006). 4. O. M. Belotserkovskii and Yu. M. Davydov, Large Particle Method in Gasdynamics (Nauka, Moscow, 1982) [in Russian]. 5. M. de Leffe, D. le Touze, and B. Alessandrini, “SPH modeling of shallow-water coastal flows,” J. Hydraul. Res. 48 (extra iss.), 118–125 (2010). 6. V. S. Kosykh, L. B. Chubarov, V. K. Gusyakov, D. A. Kamaev, V. M. Grigor’eva, and S. A. Beisel, “Methods for calculating the maximum height of the tsunami waves in the protected areas of the Far East coast of the Russian Federation,” Inform. Sbornik: Rezult. Ispyt. Nov. Usovershenst. Tekhnol. Modelei Metodov Gidrometeorol. Prognozov, No. 40, 115–134 (2013). 7. V. K. Gusiakov, “Residual displacements on the surface of elastic half-space,” in Conditionally Correct Problems of Mathematical Physics in Interpretation of Geophysical Observations (Vychisl. Tsentr Sib. Otdel. RAN, Novosibirsk, 1978), pp. 23–51 [in Russian]. 8. R. W. MacCormack, “The effect of viscosity in hypervelocity impact cratering,” J. Spacecraft Rockets 40, 757–763, 2003. 9. A. D. Rychkov, S. A. Beisel, and L. B. Chubarov, “Computer Program: Module for calculation of runup of tsunami waves on a coast RunUp-LP,” State Registration Certificate of Computer Program No. 2013617980. 10. L. B. Chubarov, V. V. Babailov, and S. A. Beisel, “Program for calculating parameters of seismogenetic tsunami waves MGC,” State Registration Certificate of Computer Program No. 2011614598. 11. Long-Wave Runup Models, Ed. by H. Yeh, P. Liu, and C. E. Synolakis (World Scientific, Singapore, 1996). 12. C. E. Synolakis, “The runup of solitary waves,” J. Fluid Mech. 185, 523–545 (1987). 13. C. E. Synolakis, “Tsunami runup on steep slopes: how good linear theory really is,” Natural Hazards 4, 221–234 (1991). 14. Z. I. Fedotova, “Numerical method validation for modeling of long waves runup on a coast,” Vychisl. Tekhnol. 7(5), 58–76 (2002). 15. S. P. Bautin, S. L. Deryabin, A. F. Sommer, G. S. Khakimzyanov, and N. Yu. Shokina, “Use of analytic solutions in the statement of difference boundary conditions on a movable shore line,” Russ. J. Numer. Anal. Math. Model. 26, 353–377 (2011). 16. N. M. Borisova, A. V. Gusev, and V. V. Ostapenko, “Propagation of discontinuous waves along a dry bed,” Fluid Dynam. 41, 606–618 (2006). 17. Coastal and Hydraulics Laboratory. http://chl.erdc.usace.army.mil/chl.aspx?p=s&a=Projects;35/ 18. GEBCO General Bathymetric Chart of the Oceans. www.gebco.net/data-and-products/gridded-bathymetry-data/ 19. Index of /srtm/version2-1/SRTM3/Eurasia. http://dds.cr.usgs.gov/srtm/version2-1/SRTM3/Eurasia/ 20. C-MAP M-AN-C013.12 Kamchatka peninsula and Kuril islands. 21. E. F. Savarenskii, V. G. Tishchenko, A. E. Sviatlovskii, A. D. Dobrovolskii, and A. V. Zhivago, “Tsunami of November 4–5, 1952,” Bull. Soveta Seismol. AN SSSR, No. 4, 36–37 (1958).