Analysis Of The Initial Value Problem For Two Specific Non-Strictly Hyperbolic Systems
Speaker |
Abhishek Das,
TIFR-CAM
|
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When |
Nov 20, 2020
from 02:00 PM to 03:00 PM |
Where | zoom meet |
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Abstract:
In this talk, we are going to discuss the following problems:
1. At first we study the initial value problem for the zero-pressure gas dynamics system in non-conservative form. The techniques of adhesion approximation and modified adhesion approximation are used in the construction of weak asymptotic solution. Explicit formula for the weak asymptotic solution and generalized solution have been studied under plane-wave type initial data. The modified adhesion model is further studied when the initial data contains -measures. In our analysis we have used the vanishing viscosity method.
2. Secondly, we study the initial and initial-boundary value problems for a non-strictly hyperbolic system whose characteristic speed is not smooth and takes values in f1; 0; 1g. We give a construction of the explicit formula for the weak solution. The Lax formula has been used for the derivation of the formula for the velocity component. We have also studied the initial-boundary value problem with a weak formulation of the boundary condition.