Movement of Fluid Inside the Sphere

Authors

  • Ðœ.Ðœ. Abenov
  • Ðœ.B. Gabbassov
  • F.Y. Ismagulova

How to Cite

Abenov, М.М., Gabbassov, М.B., & Ismagulova, F. (2018). Movement of Fluid Inside the Sphere. International Journal of Engineering and Technology, 7(4.30), 42-44. https://doi.org/10.14419/ijet.v7i4.30.22002

Received date: November 28, 2018

Accepted date: November 28, 2018

Published date: November 30, 2018

DOI:

https://doi.org/10.14419/ijet.v7i4.30.22002

Keywords:

continuity equation, four-dimensional functions, generalized Cauchy - Riemann conditions.

Abstract

The paper presents an exact analytical solution of the stationary problem of an incompressible ideal fluid flow inside a sphere under the action of an external potential mass force.

References

  1. [1] Stoun M (1937), Application of the theory of Boolean rings to general topology., Trans.Amer.Math.Soc.,41.

    [2] Lоitzansky LG & Drofa M (2003), Fluid Mechanics.

    [3] Ladyzhenskaya OA & Fizmatgiz, M (1961), The Mathematical Theory of Viscous Incompressible Flow.

    [4] Temam R & Mir M (1981), Navier-Stokes Equations: Theory and Numerical Analysis.

    [5] Abenov MM & Almaty (2013), Ðекоторые Ð¿Ñ€Ð¸Ð»Ð¾Ð¶ÐµÐ½Ð¸Ñ spectral theory of bicomplex-variable functions, K2.

    [6] Abenov MM & Almaty (2017), About exact solutions for the continuity equation, K2.

Downloads

How to Cite

Abenov, М.М., Gabbassov, М.B., & Ismagulova, F. (2018). Movement of Fluid Inside the Sphere. International Journal of Engineering and Technology, 7(4.30), 42-44. https://doi.org/10.14419/ijet.v7i4.30.22002

Received date: November 28, 2018

Accepted date: November 28, 2018

Published date: November 30, 2018