NON-SIMPLE CONCENTRATIONS FOR NONLINEAR MAGNETIC SCHRÖDINGER EQUATIONS WITH CONSTANT ELECTRIC POTENTIALS

Liping Wang; Chunyi Zhao

doi:10.3934/dcds.2024038

NON-SIMPLE CONCENTRATIONS FOR NONLINEAR MAGNETIC SCHRÖDINGER EQUATIONS WITH CONSTANT ELECTRIC POTENTIALS

Liping Wang, Chunyi Zhao

School of Mathematical Sciences

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

Abstract

The paper investigates the influence of magnetic fields on the non-simple concentration phenomenon in the complex-valued nonlinear Schrödinger equations with a constant electric potential (iε∇ + A)²u + u − |u|^p−¹u = 0 in R^N. We demonstrate that a multi-peak solution always exists at a non-degenerate local maximum or minimum point of the Frobenius norm ∥B∥²_F, where B is the magnetic field generated from the magnetic potential A. Interestingly, the locations of peaks form a regular simplex near such a maximum point. It is also surprising that at such a minimum point, we can find a two-peak solution, which is distinct from the real-valued case. This is unexpected given that the non-existence of a multi-peak solution at a non-degenerate local minimum point of the electric potential has been proven in [24].

Original language	English
Pages (from-to)	2564-2597
Number of pages	34
Journal	Discrete and Continuous Dynamical Systems- Series A
Volume	44
Issue number	9
DOIs	https://doi.org/10.3934/dcds.2024038
State	Published - Sep 2024

Keywords

Magnetic Schrödinger equations
constant electric potentials
multi-peak solutions
non-simple concentrations

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10.3934/dcds.2024038

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title = "NON-SIMPLE CONCENTRATIONS FOR NONLINEAR MAGNETIC SCHR{\"O}DINGER EQUATIONS WITH CONSTANT ELECTRIC POTENTIALS",

abstract = "The paper investigates the influence of magnetic fields on the non-simple concentration phenomenon in the complex-valued nonlinear Schr{\"o}dinger equations with a constant electric potential (iε∇ + A)2u + u − |u|p−1u = 0 in RN. We demonstrate that a multi-peak solution always exists at a non-degenerate local maximum or minimum point of the Frobenius norm ∥B∥2F, where B is the magnetic field generated from the magnetic potential A. Interestingly, the locations of peaks form a regular simplex near such a maximum point. It is also surprising that at such a minimum point, we can find a two-peak solution, which is distinct from the real-valued case. This is unexpected given that the non-existence of a multi-peak solution at a non-degenerate local minimum point of the electric potential has been proven in [24].",

keywords = "Magnetic Schr{\"o}dinger equations, constant electric potentials, multi-peak solutions, non-simple concentrations",

author = "Liping Wang and Chunyi Zhao",

year = "2024",

month = sep,

doi = "10.3934/dcds.2024038",

language = "英语",

volume = "44",

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journal = "Discrete and Continuous Dynamical Systems- Series A",

issn = "1078-0947",

publisher = "American Institute of Mathematical Sciences",

number = "9",

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T1 - NON-SIMPLE CONCENTRATIONS FOR NONLINEAR MAGNETIC SCHRÖDINGER EQUATIONS WITH CONSTANT ELECTRIC POTENTIALS

AU - Wang, Liping

AU - Zhao, Chunyi

PY - 2024/9

Y1 - 2024/9

N2 - The paper investigates the influence of magnetic fields on the non-simple concentration phenomenon in the complex-valued nonlinear Schrödinger equations with a constant electric potential (iε∇ + A)2u + u − |u|p−1u = 0 in RN. We demonstrate that a multi-peak solution always exists at a non-degenerate local maximum or minimum point of the Frobenius norm ∥B∥2F, where B is the magnetic field generated from the magnetic potential A. Interestingly, the locations of peaks form a regular simplex near such a maximum point. It is also surprising that at such a minimum point, we can find a two-peak solution, which is distinct from the real-valued case. This is unexpected given that the non-existence of a multi-peak solution at a non-degenerate local minimum point of the electric potential has been proven in [24].

AB - The paper investigates the influence of magnetic fields on the non-simple concentration phenomenon in the complex-valued nonlinear Schrödinger equations with a constant electric potential (iε∇ + A)2u + u − |u|p−1u = 0 in RN. We demonstrate that a multi-peak solution always exists at a non-degenerate local maximum or minimum point of the Frobenius norm ∥B∥2F, where B is the magnetic field generated from the magnetic potential A. Interestingly, the locations of peaks form a regular simplex near such a maximum point. It is also surprising that at such a minimum point, we can find a two-peak solution, which is distinct from the real-valued case. This is unexpected given that the non-existence of a multi-peak solution at a non-degenerate local minimum point of the electric potential has been proven in [24].

KW - Magnetic Schrödinger equations

KW - constant electric potentials

KW - multi-peak solutions

KW - non-simple concentrations

UR - https://www.scopus.com/pages/publications/85196261854

U2 - 10.3934/dcds.2024038

DO - 10.3934/dcds.2024038

M3 - 文章

AN - SCOPUS:85196261854

SN - 1078-0947

VL - 44

SP - 2564

EP - 2597

JO - Discrete and Continuous Dynamical Systems- Series A

JF - Discrete and Continuous Dynamical Systems- Series A

IS - 9

ER -

NON-SIMPLE CONCENTRATIONS FOR NONLINEAR MAGNETIC SCHRÖDINGER EQUATIONS WITH CONSTANT ELECTRIC POTENTIALS

Abstract

Keywords

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