The articles in this volume, derived from a symposium held at the Newton Institute in Cambridge, examine a number of key questions that have engaged turbulence researchers for many years. Most involve mathematical analysis, but some describe numerical simulations and experimental results that focus on these questions. However, all are addressed to a wide cross-section of the turbulence community, namely mathematicians, engineers and scientists.
|Publisher:||Cambridge University Press|
|Product dimensions:||5.98(w) x 9.02(h) x 0.67(d)|
Table of ContentsIntroduction; 1. Motion and expansion of a viscous vortex ring: elliptical slowing down and diffusive expansion Yasuhide Fukumoto and H. K. Moffatt; 2. Stretching and compression of vorticity in the 3D Euler equations J. D. Gibbon, B. Galanti and R. M. Kerr; 3. Structure of a new family of vortices of stretched non-axisymmetric vortices Stéphane le Dizès; 4. Core dynamics of a coherent structure: a prototypical physical-space cascade mechanism? Dhoorjaty S. Pradeep and Fazle Hussain; 5. Fundamental instabilities in spatially-developing wing wakes and temporally-developing vortex pairs C. H. K. Williamson, T. Leweke and G. D. Miller; 6. Vortex lines and vortex triangles in superfluid helium Carlo F. Barenghi; 7. Evolution of localized packets of vorticity and scalar in turbulence A. Leonard; 8. Vortical structure and modelling of turbulence E. A. Novikov; 9. The issue of local isotropy of velocity and scalar turbulent fields Z. Warhaft; 10. Near-singular flow structure: dissipation and eduction J. C. Vassilicos; 11. Vortex stretching versus production of strain/dissipation Arkaday Tsinober; 12. Dynamics and statistics of vortical eddies in turbulence J. C. R. Hunt; 13. Stability of vortex structures in a rotating frame Claude Cambon; 14. LES and vortex topology in shear and rotating flows Marcel Lesieur, Pierre Comte and Olivier Métais; 15. Conditional mode elimination with asymptotic freedom for isotropic turbulence at large Reynolds numbers David McComb and Craig Johnston.