Some remarks on the limit of viscoelastic fluids as the relaxation time tends to zero

1. B. Coleman, W. Noll, Fondation of viscoelasticity, Rev. Mod. Phys., 33 (1961), 239–249.

   Google Scholar 

2. M.J. Crochet, A.R. Davies, K. Walters, Numerical simulation of non-newtonian flow, Elsevier, Amsterdam, 1984.

   Google Scholar 

3. H. Giesekus, A unified approach to a variety of constitutive models for polymer fluids based on the concept of configuration dependent molecular mobility, Rheol. Acta, 21 (1982), 366–375.

   Google Scholar 

4. D.D. Joseph, Hyperbolic phenomena in the flow of viscoelastic fluids, Proceedings of the Conference on Viscoelasticity and Rheology, Madison (1984), J. Nohel ed., Academic Press, to appear.

   Google Scholar 

5. D.D. Joseph, M. Renardy, J.C. Saut, Hyperbolicity and change of type in the flow of viscoelastic fluids, Arch. Rational Mech. Anal., 87 (1985), 213–251.

   Google Scholar 

6. D.D. Joseph, J.C. Saut, Change of type and loss of evolution in the flow of viscoelastic fluids, J. Non Newtonian Fluid Mech., to appear.

   Google Scholar 

7. S. Klainerman, A. Majda, Singular limits of quasilinear hyperbolic systems with large parameters and the incompressible limit of compressible fluids, Comm. Pure Appl. Math., XXXIV (1981), 481–524.

   Google Scholar 

8. J.L. Lions, Perturbations singulières dans les problèmes aux limites et en contrôle optimal, Lecture Notes in Mathematics n° 323, Springer-Verlag, 1973.

   Google Scholar 

9. J.C. Saut, A nonlinear singular perturbation problem in viscoelastic fluids, in preparation.

   Google Scholar 

10. R. Temam, Behaviour at time t = 0 of the solutions of semi-linear evolution equations, J. Diff. Eq., 43 (1982), 73–92.

    Google Scholar 

Download references