Generalized Primitive Potentials

V. E. Zakharov; D. V. Zakharov

doi:10.1134/S1064562420020258

Generalized Primitive Potentials

V. E. Zakharov, D. V. Zakharov

Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

Abstract: Recently, we introduced a new class of bounded potentials of the one-dimensional stationary Schrödinger operator on the real axis, and a corresponding family of solutions of the KdV hierarchy. These potentials, which we call primitive, are obtained as limits of rapidly decreasing reflectionless potentials, or multisoliton solutions of KdV. In this note, we introduce generalized primitive potentials, which are obtained as limits of all rapidly decreasing potentials of the Schrödinger operator. These potentials are constructed by solving a contour problem, and are determined by a pair of positive functions on a finite interval and a functional parameter on the real axis.

Original language	English
Pages (from-to)	117-121
Number of pages	5
Journal	Doklady Mathematics
Volume	101
Issue number	2
DOIs	https://doi.org/10.1134/S1064562420020258
State	Published - Mar 1 2020

Keywords

Schrödinger equation
integrable systems
primitive potentials

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10.1134/S1064562420020258

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title = "Generalized Primitive Potentials",

abstract = "Abstract: Recently, we introduced a new class of bounded potentials of the one-dimensional stationary Schr{\"o}dinger operator on the real axis, and a corresponding family of solutions of the KdV hierarchy. These potentials, which we call primitive, are obtained as limits of rapidly decreasing reflectionless potentials, or multisoliton solutions of KdV. In this note, we introduce generalized primitive potentials, which are obtained as limits of all rapidly decreasing potentials of the Schr{\"o}dinger operator. These potentials are constructed by solving a contour problem, and are determined by a pair of positive functions on a finite interval and a functional parameter on the real axis.",

keywords = "Schr{\"o}dinger equation, integrable systems, primitive potentials",

author = "Zakharov, {V. E.} and Zakharov, {D. V.}",

note = "Funding Information: V. Zakharov gratefully acknowledges the support of grant RScF 19-72-30028 and NSF grant DMS-1715323. D. Zakharov gratefully acknowledges the support of NSF grant DMS-1716822. Publisher Copyright: {\textcopyright} 2020, Pleiades Publishing, Ltd.",

year = "2020",

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doi = "10.1134/S1064562420020258",

language = "English",

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journal = "Doklady Mathematics",

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AU - Zakharov, V. E.

AU - Zakharov, D. V.

N1 - Funding Information: V. Zakharov gratefully acknowledges the support of grant RScF 19-72-30028 and NSF grant DMS-1715323. D. Zakharov gratefully acknowledges the support of NSF grant DMS-1716822. Publisher Copyright: © 2020, Pleiades Publishing, Ltd.

PY - 2020/3/1

Y1 - 2020/3/1

N2 - Abstract: Recently, we introduced a new class of bounded potentials of the one-dimensional stationary Schrödinger operator on the real axis, and a corresponding family of solutions of the KdV hierarchy. These potentials, which we call primitive, are obtained as limits of rapidly decreasing reflectionless potentials, or multisoliton solutions of KdV. In this note, we introduce generalized primitive potentials, which are obtained as limits of all rapidly decreasing potentials of the Schrödinger operator. These potentials are constructed by solving a contour problem, and are determined by a pair of positive functions on a finite interval and a functional parameter on the real axis.

AB - Abstract: Recently, we introduced a new class of bounded potentials of the one-dimensional stationary Schrödinger operator on the real axis, and a corresponding family of solutions of the KdV hierarchy. These potentials, which we call primitive, are obtained as limits of rapidly decreasing reflectionless potentials, or multisoliton solutions of KdV. In this note, we introduce generalized primitive potentials, which are obtained as limits of all rapidly decreasing potentials of the Schrödinger operator. These potentials are constructed by solving a contour problem, and are determined by a pair of positive functions on a finite interval and a functional parameter on the real axis.

KW - Schrödinger equation

KW - integrable systems

KW - primitive potentials

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DO - 10.1134/S1064562420020258

M3 - Article

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SN - 1064-5624

VL - 101

SP - 117

EP - 121

JO - Doklady Mathematics

JF - Doklady Mathematics

IS - 2

ER -

Generalized Primitive Potentials

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