Rao, Srinivasa and Sachdev, PL and Ramaswamy, Mythily (2001) Analysis of the self-similar solutions of a generalized Burgers equation with nonlinear damping. In: Mathemafical Problems in Engineering, 7 (3). 253-282..
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Abstract
The object of investigation in this paper is a nonlinear ordinary differential equation obtained by means of self-similar reduction of the generalized Burgers equation $u_t+u^\beta u_x+\lambda u^\alpha=\delta u_{xx}$ with the nonlinear damping term $\lambda u^\alpha$. More exactly, the authors study the initial value problem $g"+2\eta g'+2\beta^{-1}g-2^{3/2}g^\beta g'-4\lambda g^\alpha=0$, $g(0)=\nu$, $g'(0)=0$ by using both numerical and analytical methods. Here $\alpha>0$, $\beta=(\alpha-1)/2>0$, $\lambda$, $\delta>0$ and $\nu >0$ are constants. Existence of positive bounded solutions with exponential and algebraic types of decay to zero at infinity is proved for special ranges of parameters.
| Item Type: | Journal Article |
|---|---|
| Publication: | Mathemafical Problems in Engineering |
| Publisher: | OPA (Ovemas Publishers Association) N.V. |
| Additional Information: | copyright of this article belongs to OPA (Ovemas Publishers Association) N.V. |
| Keywords: | Burgers equations;Initial value problem;Generalized burgers equation;Self similar solutions |
| Department/Centre: | Division of Physical & Mathematical Sciences > Mathematics |
| Date Deposited: | 15 Oct 2007 |
| Last Modified: | 19 Sep 2010 04:39 |
| URI: | http://eprints.iisc.ac.in/id/eprint/11872 |
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