References
- Maslov VP. Itogui Naúki i Téjniki [Propagation of shock waves in isoentropic non viscous gas]. Covremiennie Problemi Matemátiki. 1977;8:199. VINITI. Moscow, Russian.
- Bulatov VV, Dobrokhotov SYu, Vladimirov YuV, et al. Hugoniot and maslov chains for solitary vortex solutions to equations of shallow water, the Hill equation, and trajectories of a ‘Typhoon eye’. Proceedings of the International Conference. Asymptotic Methods in Mechanics, St. Petersburg; 1997.
- Dobrokhotov SYu. Hugoniot--Maslov chains for solitary vortices of the shallow water equations, I. Derivation of the chains for the case of variable Coriolis forces and reduction to the Hill equation. Russian J Math Phys. 1999;6(2):137–173.
- Dobrokhotov SYu, Semenov ES, Tirozzi B. Hugoniot--Maslov chains for singular vortical solutions to Quasilinear hyperbolic systems and Typhoon trajectory. J Math Sci. 2004;124(5):5209–5249.
- Dobrokhotov SYu, Tirozzi B. A perturbative theory of the evolution of the center of typhoons, zeta functions, topology and quantum physics. Develop Math. 2005;14:31–50.
- Maslov VP, Omelyanov GA. Conditions of Hugoniot type for infinitely narrow solutions of the simple wave equation. Sibirsk Mat Zh. 1983;24.787–795. Russian.
- Kulikovskii AG, Chugajnova AP. Classical and non-classical discontinuities in solutions of equations of non-linear elasticity theory. Russ Math Surv. 2008;63(2):283–350.
- Danilov VG, Omelyanov GA, Radkevich EV. Hugoniot-type conditions and weak solutions to the phase-field system. Euro J Appl Math. 1999;10:55–77.
- Alvarez AC, Valiño-Alonso B. Hugoniot--Maslov chain for nonlinear wave evolution with discontinuous depth. Fourth Italian--Latin American Conference on Applied and Industrial Mathematics, 2001, La Habana. Memorias IV Simposio de Matematica. La Habana: Artes Graficas; 2001. p. 426–434.
- Rodríguez-Bermúdez P, Valiño-Alonso B. Hugoniot--Maslov chains of a shock wave in conservation law with polynomial flow. Math Nachr. 2007;280:907–915.
- Danilov VG, Omelyanov GA, Radkevich EV. Asymptotic solution of a phase field system and the modified Stefan problem. Differe Uravneniya. 1995;31(3):483–491. Russian; Differ Equ 1995 ;31(3):446--454. English.
- Danilov VG, Omelyanov GA, Shelkovich VM. Weak asymptotics method and interaction of nonlinear waves (Asymptotic methods for wave and quantum problems). Amer Math Soc Transl. 2003;208(2):33–163.
- Danilov VG. Weak asymptotic solution of phase-field system in the case of confluence of free boundaries in Stefan problem with undercooling. Eur J Appl Math. 2007;18:537–569.
- Sahoo MR, Singh H. Weak asymptotic solution for a non-strictly hyperbolic system of conservation laws-II. Electron J Diff Equ. 2016;2016(94):1-14.
- Singh H, Sahoo MR, Singh OP. Weak asymptotic solution to non-strictly system of conservation laws. Electron J Diff Equ. 2015;2015(01):1–12.
- Ravindran R, Prasad P. A new theory of shock dynamics. Part I: analytic considerations. Appl Math Lett. 1990;3(2):77–81.
- Ravindran R, Prasad P. A new theory of shock dynamics. Part II: numerical solution. Appl Math Lett. 1990;3(3):107–109.
- Bernard S, Meril A. Rodríguez-Bermúdez, et al. Obtaining shock solutions via Maslov’s theory and Colombeau algebra for conservation laws with analytical coefficients, Novi Sad J Math. 2012;42:95–116.
- Dobrokhotov SYu. Hugoniot--Maslov chains for solitary vortices of the shallow water equations, II. The analysis of solutions of the truncated chain and an approximate description of possible trajectories of mesoscale vortices (typhoons). Russian J Math Phys. 1999;6(3):282–313.
- Colombeau JF. Elementary introduction to new generalized functions, Nort--Holland mathematics studies. Vol. 113. London: Wiely; 1985.
- Colombeau JF. Multiplication of distributions. Berlin: Springer Verlag; 1992.
- Oberguggenberger M. Multiplication of distributions and application to partial differential equations. Pitman research notes in mathematics. Vol. 259. London: Longman Essex; 1992.
- LeVeque RJ. Numerical methods for conservation laws. Basel: Birkäuser Verlag; 1994.
- Danilov VG, Maslov VP, Shelkovich VM. Algebras of the singularities of singular solutions to first-order quasi-linear strictly hyperbolic systems. Teoret Mat Fiz. 1998;114(1):3–55.
- Schwartz L. Sur l’impossibilité de la multiplication des distributions. C R Acad Sci Paris. 1954;239:847–848. French.
- Bernard S, Colombeau JF, Meril A. and Remaki. L, Conservation laws with discontinuous coefficients, J Math Anal Appl. 2001;258:63–86.
- Rosinger EE. Distributions and nonlinear partial differential equations. Lecture notes in mathematics. Vol. 684. Berlin: Springer; 1978.
- Rosinger EE. Nonlinear partial differential equations. North-Holland mathematics studies. An algebraic view of generalized solutions. Vol. 164. Amsterdam: North-Holland Publishing; 1990.
- Biagioni HA. A nonlinear theory of generalized functions. 2nd ed. Vol. 1421. Lecture notes in mathematics. Berlin: Springer-Verlag; 1990.