A generic framework of adiabatic approximation for nonlinear evolutions

Institut for Matematiske Fag

A generic framework of adiabatic approximation for nonlinear evolutions

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Standard

A generic framework of adiabatic approximation for nonlinear evolutions. / Zhang, Jingxuan.

I: Letters in Mathematical Physics, Bind 112, Nr. 1, 31, 2022, s. 1-34.

Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › fagfællebedømt

Harvard

Zhang, J 2022, 'A generic framework of adiabatic approximation for nonlinear evolutions', Letters in Mathematical Physics, bind 112, nr. 1, 31, s. 1-34. https://doi.org/10.1007/s11005-022-01527-0

APA

Zhang, J. (2022). A generic framework of adiabatic approximation for nonlinear evolutions. Letters in Mathematical Physics, 112(1), 1-34. [31]. https://doi.org/10.1007/s11005-022-01527-0

Vancouver

Zhang J. A generic framework of adiabatic approximation for nonlinear evolutions. Letters in Mathematical Physics. 2022;112(1):1-34. 31. https://doi.org/10.1007/s11005-022-01527-0

Author

Zhang, Jingxuan. / A generic framework of adiabatic approximation for nonlinear evolutions. I: Letters in Mathematical Physics. 2022 ; Bind 112, Nr. 1. s. 1-34.

Bibtex

@article{6ec02fd2414b4656842fb2de51d0e17f,

title = "A generic framework of adiabatic approximation for nonlinear evolutions",

abstract = "In the study of evolution equations, the method of adiabatic approximation is an essential tool to reduce an infinite-dimensional dynamical system to a simpler, possibly finite-dimensional one. In this paper, we formulate a generic scheme of adiabatic approximation that is valid for an abstract nonlinear evolution under mild regularity assumptions. The key prerequisite for the scheme is the existence of what we call approximate solitons. These are some low energy but not necessarily stationary configurations. The approximate solitons are characterized by a number of parameters (possibly infinitely many) and have a manifold structure. The adiabatic scheme reduces the given abstract evolution equation to an effective equation on the manifold of approximate solitons. We give sufficient conditions for the approximate solitons so that the reduction scheme is valid up to a large time. The validity is determined by the energy property of the original evolution as well as the adiabaticity of the approximate solitons.",

author = "Jingxuan Zhang",

year = "2022",

doi = "10.1007/s11005-022-01527-0",

language = "English",

volume = "112",

pages = "1--34",

journal = "Letters in Mathematical Physics",

issn = "0377-9017",

publisher = "Springer",

number = "1",

}

RIS

TY - JOUR

T1 - A generic framework of adiabatic approximation for nonlinear evolutions

AU - Zhang, Jingxuan

PY - 2022

Y1 - 2022

N2 - In the study of evolution equations, the method of adiabatic approximation is an essential tool to reduce an infinite-dimensional dynamical system to a simpler, possibly finite-dimensional one. In this paper, we formulate a generic scheme of adiabatic approximation that is valid for an abstract nonlinear evolution under mild regularity assumptions. The key prerequisite for the scheme is the existence of what we call approximate solitons. These are some low energy but not necessarily stationary configurations. The approximate solitons are characterized by a number of parameters (possibly infinitely many) and have a manifold structure. The adiabatic scheme reduces the given abstract evolution equation to an effective equation on the manifold of approximate solitons. We give sufficient conditions for the approximate solitons so that the reduction scheme is valid up to a large time. The validity is determined by the energy property of the original evolution as well as the adiabaticity of the approximate solitons.

AB - In the study of evolution equations, the method of adiabatic approximation is an essential tool to reduce an infinite-dimensional dynamical system to a simpler, possibly finite-dimensional one. In this paper, we formulate a generic scheme of adiabatic approximation that is valid for an abstract nonlinear evolution under mild regularity assumptions. The key prerequisite for the scheme is the existence of what we call approximate solitons. These are some low energy but not necessarily stationary configurations. The approximate solitons are characterized by a number of parameters (possibly infinitely many) and have a manifold structure. The adiabatic scheme reduces the given abstract evolution equation to an effective equation on the manifold of approximate solitons. We give sufficient conditions for the approximate solitons so that the reduction scheme is valid up to a large time. The validity is determined by the energy property of the original evolution as well as the adiabaticity of the approximate solitons.

UR - https://doi.org/10.1007/s11005-022-01527-0

U2 - 10.1007/s11005-022-01527-0

DO - 10.1007/s11005-022-01527-0

M3 - Journal article

VL - 112

SP - 1

EP - 34

JO - Letters in Mathematical Physics

JF - Letters in Mathematical Physics

SN - 0377-9017

IS - 1

M1 - 31

ER -

ID: 304180180