Some Problems in the Stability of Flows of Viscoelastic Fluids.

Abstract

Three problems in the stability of viscoelastic flows have been theoretically investigated. The case of plane Couette flow has been solved by the classical energy method of Orr. For two-dimensional disturbances of any magnitude the presence of elasticity has been found to stabilize the flow. This result suggests that the viscous sublayer thickness must increase during the so-called Toms phenomenon. It has been found that the results are identical for three fluids, namely the second-order fluid and the Walters fluids A' and B', although the normal stress behavior of these fluids are quite different. This insensitivity to the constitutive equation has been shown to be a result of the two-dimensionality of the problem. Linear stability theory has been used to investigate the stability of two flows of the Oldroyd fluid, namely the plane Poiseuille flow and the circular Couette flow. For both flows the presence of elasticity has been found to destabilize the flow and to increase the critical wavenumber.

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Document Details

Document Type
Technical Report
Publication Date
May 17, 1972
Accession Number
ADA040716

Entities

People

  • Pijush Kanti Kundu

Organizations

  • Pennsylvania State University

Tags

Communities of Interest

  • Energy and Power Technologies

DTIC Thesaurus Topics

  • Boundary Layer
  • Computational Fluid Dynamics
  • Computational Science
  • Constitutive Equations
  • Couette Flow
  • Differential Equations
  • Elastic Properties
  • Equations Of Motion
  • Equations Of State
  • Fluid Dynamics
  • Fluid Mechanics
  • Mechanics
  • Physics Laboratories
  • Poiseuille Flow
  • Secondary Waves
  • Three Dimensional
  • Two Dimensional

Fields of Study

  • Mathematics

Readers

  • Fluid Dynamics.
  • Fluid Mechanics and Fluid Dynamics.