Scholars@Duke publication: The collisionless shock region for the long‐time behavior of solutions of the KdV equation

The collisionless shock region for the long‐time behavior of solutions of the KdV equation

Publication , Journal Article

Deift, P; Venakides, S; Zhou, X

Published in: Communications on Pure and Applied Mathematics

January 1, 1994

The authors further develop the nonlinear steepest descent method of [5] and [6] to give a full description of the collisionless shock region for solutions of the KdV equation with decaying initial data. © 1994 John Wiley & Sons, Inc. Copyright © 1994 Wiley Periodicals, Inc., A Wiley Company

Duke Scholars

Author Stephanos Venakides Mathematics

Author Xin Zhou Mathematics

Published In

Communications on Pure and Applied Mathematics

DOI

10.1002/cpa.3160470204

EISSN

1097-0312

ISSN

0010-3640

Publication Date

January 1, 1994

Volume

Issue

Start / End Page

199 / 206

Related Subject Headings

General Mathematics
0102 Applied Mathematics
0101 Pure Mathematics

Citation

APA

Chicago

ICMJE

MLA

NLM

Deift, P., Venakides, S., & Zhou, X. (1994). The collisionless shock region for the long‐time behavior of solutions of the KdV equation. Communications on Pure and Applied Mathematics, 47(2), 199–206. https://doi.org/10.1002/cpa.3160470204

Deift, P., S. Venakides, and X. Zhou. “The collisionless shock region for the long‐time behavior of solutions of the KdV equation.” Communications on Pure and Applied Mathematics 47, no. 2 (January 1, 1994): 199–206. https://doi.org/10.1002/cpa.3160470204.

Deift P, Venakides S, Zhou X. The collisionless shock region for the long‐time behavior of solutions of the KdV equation. Communications on Pure and Applied Mathematics. 1994 Jan 1;47(2):199–206.

Deift, P., et al. “The collisionless shock region for the long‐time behavior of solutions of the KdV equation.” Communications on Pure and Applied Mathematics, vol. 47, no. 2, Jan. 1994, pp. 199–206. Scopus, doi:10.1002/cpa.3160470204.

Deift P, Venakides S, Zhou X. The collisionless shock region for the long‐time behavior of solutions of the KdV equation. Communications on Pure and Applied Mathematics. 1994 Jan 1;47(2):199–206.

Published In

Communications on Pure and Applied Mathematics

DOI

10.1002/cpa.3160470204

EISSN

1097-0312

ISSN

0010-3640

Publication Date

January 1, 1994

Volume

Issue

Start / End Page

199 / 206

Related Subject Headings

General Mathematics
0102 Applied Mathematics
0101 Pure Mathematics