Two-Parameters Bifurcation in Quasilinear Dierential-Algebraic Equations

Authors

  • Kamal H Yasir University of Thi- Qar The College of Education Sciences Pure
  • Abbas M Al_husenawe University of Thi- Qar The College of Education Sciences Pure

DOI:

https://doi.org/10.24297/jam.v12i1.573

Keywords:

Dierential Algebraic Equation, Quasilinear, Bifurcation.

Abstract

In this paper, bifurcation of solution of guasilinear dierential-algebraic equations (DAEs) is studied. Whereas basic principle that quasilinear DAE is eventually reducible to an ordinary dierential equation (ODEs) and that this reduction so we can apply the classical bifurcation theory of the (ODEs). The taylor expansion applied to the reduced DAEs to prove that is equivalent to an ODE which is a normal form under some non-degeneracy conditions theorems given in this work deal with the saddle node,transcritical and pitchfork bifurcation with two-parameters. Some illustrated examples are given to explain the idea of the paper.

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Author Biographies

  • Kamal H Yasir, University of Thi- Qar The College of Education Sciences Pure
    Department of mathematics
  • Abbas M Al_husenawe, University of Thi- Qar The College of Education Sciences Pure
    Department of mathematics

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Published

2016-02-24

Issue

Vol. 12 No. 1 (2016)

Section

Articles

License

Creative Commons License All articles published in Journal of Advances in Linguistics are licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

Two-Parameters Bifurcation in Quasilinear Dierential-Algebraic Equations. (2016). JOURNAL OF ADVANCES IN MATHEMATICS, 12(1), 5786-5796. https://doi.org/10.24297/jam.v12i1.573

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