Internal layers for a quasi–linear singularly perturbed delay differential equation

Tao Feng; Ming Kang Ni

doi:10.11948/20190337

Internal layers for a quasi–linear singularly perturbed delay differential equation

Tao Feng, Ming Kang Ni

School of Mathematical Sciences

East China Normal University

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

2 Scopus citations

Abstract

The current paper is mainly concerned with the internal layers for a quasi–linear singularly perturbed differential equation with time delays. By using the method of boundary layer functions and the theory of contrast structures, the existence of a uniformly valid smooth solution is proved, and the asymptotic expansion is constructed. As an application, a concrete example is presented to demonstrate the effectiveness of our result.

Original language	English
Pages (from-to)	1666-1682
Number of pages	17
Journal	Journal of Applied Analysis and Computation
Volume	10
Issue number	4
DOIs	https://doi.org/10.11948/20190337
State	Published - Aug 2020

Keywords

Asymptotic expansion
Boundary layer functions
Contrast structures
Delay
Internal layers

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10.11948/20190337

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title = "Internal layers for a quasi–linear singularly perturbed delay differential equation",

abstract = "The current paper is mainly concerned with the internal layers for a quasi–linear singularly perturbed differential equation with time delays. By using the method of boundary layer functions and the theory of contrast structures, the existence of a uniformly valid smooth solution is proved, and the asymptotic expansion is constructed. As an application, a concrete example is presented to demonstrate the effectiveness of our result.",

keywords = "Asymptotic expansion, Boundary layer functions, Contrast structures, Delay, Internal layers",

author = "Tao Feng and Ni, \{Ming Kang\}",

year = "2020",

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doi = "10.11948/20190337",

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T1 - Internal layers for a quasi–linear singularly perturbed delay differential equation

AU - Feng, Tao

AU - Ni, Ming Kang

PY - 2020/8

Y1 - 2020/8

N2 - The current paper is mainly concerned with the internal layers for a quasi–linear singularly perturbed differential equation with time delays. By using the method of boundary layer functions and the theory of contrast structures, the existence of a uniformly valid smooth solution is proved, and the asymptotic expansion is constructed. As an application, a concrete example is presented to demonstrate the effectiveness of our result.

AB - The current paper is mainly concerned with the internal layers for a quasi–linear singularly perturbed differential equation with time delays. By using the method of boundary layer functions and the theory of contrast structures, the existence of a uniformly valid smooth solution is proved, and the asymptotic expansion is constructed. As an application, a concrete example is presented to demonstrate the effectiveness of our result.

KW - Asymptotic expansion

KW - Boundary layer functions

KW - Contrast structures

KW - Delay

KW - Internal layers

UR - https://www.scopus.com/pages/publications/85087390123

U2 - 10.11948/20190337

DO - 10.11948/20190337

M3 - 文章

AN - SCOPUS:85087390123

SN - 2156-907X

VL - 10

SP - 1666

EP - 1682

JO - Journal of Applied Analysis and Computation

JF - Journal of Applied Analysis and Computation

IS - 4

ER -

Internal layers for a quasi–linear singularly perturbed delay differential equation

Abstract

Keywords

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