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Hodge operator and asymmetric fluid in unbounded domains

  • Autores: Igor Kondrashuk, Eduardo A. Notte-Cuello, Mario A. Rojas
  • Localización: Integración: Temas de matemáticas, ISSN 0120-419X, Vol. 27, Nº. 1, 2009 (Ejemplar dedicado a: Revista Integración), págs. 1-13
  • Idioma: inglés
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  • Resumen
    • ABSTRACT  A system of equations modeling the stationary flow of an incompressible asymmetric fluid is studied for bounded domains of an arbitrary form. Based on the methods of Clifford analysis, we write the system of asymmetric fluid in the hypercomplex formulation and represent its solution in Clifford operator terms. We have significantly used Clifford algebra, and in particular the Hodge operator of the Clifford algebra to demonstrate the existence and uniqueness of the strong solution for arbitrary unbounded domains. 

  • Referencias bibliográficas
    • Citas [1] Durán M., Ortega-Torres E., Rojas-Medar M. Proyecciones 22 (2003), N◦ 1, 63-79.
    • [2] P. Cerejeiras and U. Kähler: Math. Meth. Appl.Sci., 23 (2000), 81-101.
    • [3] Kondrashuk I., Notte-Cuello E. A. and Rojas-Medar M. A.: Bol. Soc. Esp. Mat. Apl. 47 (2009), 99-106.
    • [4] G. Lukaszewicz. “On stationary flows of asymetric fluids”. Volume XII, Rend. Accad. Naz. Sci. detta dei XL, 106 (1988), 35-44.
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    • [6] W. A. Rodrigues Jr. and E. Capelas Oliveira: “The Many Faces of Maxwell, Dirac and Einstein Equations”. A Clifford Bundle Approach, Lecture...

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