Quasi-periodic solutions of the Boomeron equation

Ruud Martini; W. Wesselius

doi:10.1088/0305-4470/18/9/015

Quasi-periodic solutions of the Boomeron equation

Ruud Martini, W. Wesselius

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Abstract

The quasi-periodic solutions for the Boomeron equation are determined by means of function-theoretical methods related to Riemann surfaces and theta functions. Also determined are the so-called Boomerons as degenerations of the quasi-periodic solutions. Moreover it is indicated that there are no higher-order Boomeron equations than the second-order one.

Original language	Undefined
Pages (from-to)	1315
Journal	Journal of physics A: mathematical and general
Volume	18
Issue number	9
DOIs	https://doi.org/10.1088/0305-4470/18/9/015
Publication status	Published - 1985

Keywords

IR-60573

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10.1088/0305-4470/18/9/015

quasi-periodic

Cite this

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title = "Quasi-periodic solutions of the Boomeron equation",

abstract = "The quasi-periodic solutions for the Boomeron equation are determined by means of function-theoretical methods related to Riemann surfaces and theta functions. Also determined are the so-called Boomerons as degenerations of the quasi-periodic solutions. Moreover it is indicated that there are no higher-order Boomeron equations than the second-order one.",

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author = "Ruud Martini and W. Wesselius",

year = "1985",

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T1 - Quasi-periodic solutions of the Boomeron equation

AU - Martini, Ruud

AU - Wesselius, W.

PY - 1985

Y1 - 1985

N2 - The quasi-periodic solutions for the Boomeron equation are determined by means of function-theoretical methods related to Riemann surfaces and theta functions. Also determined are the so-called Boomerons as degenerations of the quasi-periodic solutions. Moreover it is indicated that there are no higher-order Boomeron equations than the second-order one.

AB - The quasi-periodic solutions for the Boomeron equation are determined by means of function-theoretical methods related to Riemann surfaces and theta functions. Also determined are the so-called Boomerons as degenerations of the quasi-periodic solutions. Moreover it is indicated that there are no higher-order Boomeron equations than the second-order one.

KW - IR-60573

U2 - 10.1088/0305-4470/18/9/015

DO - 10.1088/0305-4470/18/9/015

M3 - Article

SN - 0305-4470

VL - 18

SP - 1315

JO - Journal of physics A: mathematical and general

JF - Journal of physics A: mathematical and general

IS - 9

ER -