GLOBAL DYNAMICS OF CLASSICAL SOLUTIONS TO A MODEL OF MIXING FLOW

Authors

  • Dr. KUN ZHAO

  • Dr. KUN ZHAO

Mixing Flow, Classical Solution, Large-Time Asymptotic Behavior

Abstract

We study the long-time dynamics of classical solutions to an initial-boundary value problem for modeling equations of a two-component mixture. Time asymptotically, it is shown that classical solutions converge exponentially to constant equilibrium states as time goes to infinity for large initial data, due to diffusion and boundary effects.

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How to Cite

GLOBAL DYNAMICS OF CLASSICAL SOLUTIONS TO A MODEL OF MIXING FLOW. (2012). Global Journal of Science Frontier Research, 12(F2), 23-42. https://www.journalofscience.org/index.php/GJSFR/article/view/100192

 

References

GLOBAL DYNAMICS OF CLASSICAL SOLUTIONS TO A MODEL OF MIXING FLOW

Published

2012-01-15

Issue

Vol. 12 No. F2 (2012): GJSFR-F Mathematics: Volume 12 Issue F2

Section

Articles

License

Copyright (c) 2012 Authors and Global Journals Private Limited

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

GLOBAL DYNAMICS OF CLASSICAL SOLUTIONS TO A MODEL OF MIXING FLOW. (2012). Global Journal of Science Frontier Research, 12(F2), 23-42. https://www.journalofscience.org/index.php/GJSFR/article/view/100192