New Results in Small Dispersion KdV by an Extension of the Steepest Descent Method for Riemann-Hilbert Problems
Publication
, Journal Article
Deift, P; Venakides, S; Zhou, X
Published in: International Mathematics Research Notices
December 1, 1997
Duke Scholars
Published In
International Mathematics Research Notices
ISSN
1073-7928
Publication Date
December 1, 1997
Issue
6
Start / End Page
284 / 299
Related Subject Headings
- General Mathematics
- 4902 Mathematical physics
- 0101 Pure Mathematics
Citation
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Chicago
ICMJE
MLA
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Deift, P., Venakides, S., & Zhou, X. (1997). New Results in Small Dispersion KdV by an Extension of the Steepest Descent Method for Riemann-Hilbert Problems. International Mathematics Research Notices, (6), 284–299.
Deift, P., S. Venakides, and X. Zhou. “New Results in Small Dispersion KdV by an Extension of the Steepest Descent Method for Riemann-Hilbert Problems.” International Mathematics Research Notices, no. 6 (December 1, 1997): 284–99.
Deift P, Venakides S, Zhou X. New Results in Small Dispersion KdV by an Extension of the Steepest Descent Method for Riemann-Hilbert Problems. International Mathematics Research Notices. 1997 Dec 1;(6):284–99.
Deift, P., et al. “New Results in Small Dispersion KdV by an Extension of the Steepest Descent Method for Riemann-Hilbert Problems.” International Mathematics Research Notices, no. 6, Dec. 1997, pp. 284–99.
Deift P, Venakides S, Zhou X. New Results in Small Dispersion KdV by an Extension of the Steepest Descent Method for Riemann-Hilbert Problems. International Mathematics Research Notices. 1997 Dec 1;(6):284–299.
Published In
International Mathematics Research Notices
ISSN
1073-7928
Publication Date
December 1, 1997
Issue
6
Start / End Page
284 / 299
Related Subject Headings
- General Mathematics
- 4902 Mathematical physics
- 0101 Pure Mathematics