Scholars@Duke publication: Perturbation theory for infinite-dimensional integrable systems on the line. A case study

Perturbation theory for infinite-dimensional integrable systems on the line. A case study

Publication , Journal Article

Deift, P; Zhou, X

Published in: Acta Mathematica

January 1, 2002

Published version (DOI)

Duke Scholars

Author Xin Zhou Mathematics

Published In

Acta Mathematica

DOI

10.1007/BF02392683

ISSN

0001-5962

Publication Date

January 1, 2002

Volume

188

Issue

Start / End Page

163 / 262

Related Subject Headings

General Mathematics
4904 Pure mathematics
0101 Pure Mathematics

Citation

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Chicago

ICMJE

MLA

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Deift, P., & Zhou, X. (2002). Perturbation theory for infinite-dimensional integrable systems on the line. A case study. Acta Mathematica, 188(2), 163–262. https://doi.org/10.1007/BF02392683

Deift, P., and X. Zhou. “Perturbation theory for infinite-dimensional integrable systems on the line. A case study.” Acta Mathematica 188, no. 2 (January 1, 2002): 163–262. https://doi.org/10.1007/BF02392683.

Deift P, Zhou X. Perturbation theory for infinite-dimensional integrable systems on the line. A case study. Acta Mathematica. 2002 Jan 1;188(2):163–262.

Deift, P., and X. Zhou. “Perturbation theory for infinite-dimensional integrable systems on the line. A case study.” Acta Mathematica, vol. 188, no. 2, Jan. 2002, pp. 163–262. Scopus, doi:10.1007/BF02392683.

Deift P, Zhou X. Perturbation theory for infinite-dimensional integrable systems on the line. A case study. Acta Mathematica. 2002 Jan 1;188(2):163–262.

Published In

Acta Mathematica

DOI

10.1007/BF02392683

ISSN

0001-5962

Publication Date

January 1, 2002

Volume

188

Issue

Start / End Page

163 / 262

Related Subject Headings

General Mathematics
4904 Pure mathematics
0101 Pure Mathematics