Convergent 3-D vortex method with grid-free stretching.
Publication
, Journal Article
Beale, JT
January 1, 1986
This document proves the convergence of a vortex method for three dimensional, incompressible, inviscid flow without boundaries. This version differs from an earlier one whose convergence was shown in another work in that the calculation does not depend explicitly on the arrangement of the vorticity elements in a Lagrangian frame. Thus, it could be used naturally in a more general context in which boundaries and viscosity are present. It is also shown that previous estimates for the velocity approximation can be improved by taking into account the fact that the integral kernel has an average value of zero. Implications for the design of the method are discussed. (A)
Duke Scholars
Publication Date
January 1, 1986
Related Subject Headings
- Numerical & Computational Mathematics
- 4903 Numerical and computational mathematics
- 4901 Applied mathematics
- 0802 Computation Theory and Mathematics
- 0103 Numerical and Computational Mathematics
- 0102 Applied Mathematics
Citation
APA
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MLA
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Beale, J. T. (1986). Convergent 3-D vortex method with grid-free stretching.
Beale, J. T. “Convergent 3-D vortex method with grid-free stretching.,” January 1, 1986.
Beale JT. Convergent 3-D vortex method with grid-free stretching. 1986 Jan 1;
Beale, J. T. Convergent 3-D vortex method with grid-free stretching. Jan. 1986.
Beale JT. Convergent 3-D vortex method with grid-free stretching. 1986 Jan 1;
Publication Date
January 1, 1986
Related Subject Headings
- Numerical & Computational Mathematics
- 4903 Numerical and computational mathematics
- 4901 Applied mathematics
- 0802 Computation Theory and Mathematics
- 0103 Numerical and Computational Mathematics
- 0102 Applied Mathematics