Seminar talk, 9 November 2022: Difference between revisions
No edit summary |
No edit summary |
||
| Line 4: | Line 4: | ||
| abstract = The problem of one-dimensional filtration of a suspension in a porous medium is considered. The process is described by a hyperbolic system of two first-order differential equations. This system is reduced by a change of variables to the symplectic equation of the Monge-Ampère type. It is noteworthy that this symplectic equation cannot be reduced to a linear wave equation by a symplectic transformation (the Lychagin-Rubtsov theorem works here), but it can be done by a contact transformation. This made it possible to find its exact general solution and exact solutions of the original system. The solution of the initial-boundary value problem and the Cauchy problem are constructed. | | abstract = The problem of one-dimensional filtration of a suspension in a porous medium is considered. The process is described by a hyperbolic system of two first-order differential equations. This system is reduced by a change of variables to the symplectic equation of the Monge-Ampère type. It is noteworthy that this symplectic equation cannot be reduced to a linear wave equation by a symplectic transformation (the Lychagin-Rubtsov theorem works here), but it can be done by a contact transformation. This made it possible to find its exact general solution and exact solutions of the original system. The solution of the initial-boundary value problem and the Cauchy problem are constructed. | ||
Joint work with Svetlana Mukhina | Joint work with Svetlana Mukhina. | ||
| video = | | video = | ||
| slides = | | slides = | ||
Revision as of 16:11, 1 October 2022
Speaker: Alexei Kushner
Title: On the integration of suspension filtration equations and thrombus formation
Abstract:
The problem of one-dimensional filtration of a suspension in a porous medium is considered. The process is described by a hyperbolic system of two first-order differential equations. This system is reduced by a change of variables to the symplectic equation of the Monge-Ampère type. It is noteworthy that this symplectic equation cannot be reduced to a linear wave equation by a symplectic transformation (the Lychagin-Rubtsov theorem works here), but it can be done by a contact transformation. This made it possible to find its exact general solution and exact solutions of the original system. The solution of the initial-boundary value problem and the Cauchy problem are constructed.
Joint work with Svetlana Mukhina.