Existence Of Global Solutions For One - Dimensional Bipolar Non - Isentropic Euler - Poisson Equation With Heat

Posted on:2015-09-08

Degree:Master

Type:Thesis

Country:China

Candidate:C F Li

Full Text:PDF

GTID:2270330431466803

Subject:Mathematics and Applied Mathematics

Abstract/Summary:

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In this paper, we study the one-dimensional bipolar non-isentropic Euler-Poisson equations. We can model various physical phenomena for this model. We simply introduced in the heating case. We show the existence global smooth solutions, when the difference of two particles’initial mass is zero, and the far field of two particles’initial temperatures is not the ambient device temperalure. We show the existence global smooth solutions, when the difference of two particles’ initial mass is zero, and the far field of the initial temperature is the ambient device temperature.

Keywords/Search Tags:

bipolar, nonlinear diffusion waves, smooth solution, Euler-Poisson equation

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