Multizonal Boundary and Internal Layers in the Singularly Perturbed Problems for a Stationary Equation of Reaction–Advection–Diffusion Type with Weak and Discontinuous Nonlinearity

Q. Yang; Mingkang Ni

doi:10.1134/S0965542522120144

Multizonal Boundary and Internal Layers in the Singularly Perturbed Problems for a Stationary Equation of Reaction–Advection–Diffusion Type with Weak and Discontinuous Nonlinearity

Q. Yang^*
, Mingkang Ni^*

^*Corresponding author for this work

School of Mathematical Sciences

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

Abstract

Abstract: A singularly perturbed Dirichlet boundary value problem for a stationary equation of reaction–advection–diffusion type with multiple roots of the degenerate equation is studied. This is a new class of problems with discontinuous reactive and weak advective terms. The existence of a contrast structure solution is proved by using the method of asymptotic differential inequalities and matching asymptotic expansion. And we show that the multiple roots lead to the formation of multizonal boundary and internal layers in the neighborhood of the boundary and the discontinuity point, which is essentially quite different from the case of isolated roots.

Original language	English
Pages (from-to)	2123-2138
Number of pages	16
Journal	Computational Mathematics and Mathematical Physics
Volume	62
Issue number	12
DOIs	https://doi.org/10.1134/S0965542522120144
State	Published - Dec 2022

Keywords

asymptotic method
discontinuous dynamical system
multizonal boundary and internal layer
reaction–advection–diffusion equation

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10.1134/S0965542522120144

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title = "Multizonal Boundary and Internal Layers in the Singularly Perturbed Problems for a Stationary Equation of Reaction–Advection–Diffusion Type with Weak and Discontinuous Nonlinearity",

abstract = "Abstract: A singularly perturbed Dirichlet boundary value problem for a stationary equation of reaction–advection–diffusion type with multiple roots of the degenerate equation is studied. This is a new class of problems with discontinuous reactive and weak advective terms. The existence of a contrast structure solution is proved by using the method of asymptotic differential inequalities and matching asymptotic expansion. And we show that the multiple roots lead to the formation of multizonal boundary and internal layers in the neighborhood of the boundary and the discontinuity point, which is essentially quite different from the case of isolated roots.",

keywords = "asymptotic method, discontinuous dynamical system, multizonal boundary and internal layer, reaction–advection–diffusion equation",

author = "Q. Yang and Mingkang Ni",

note = "Publisher Copyright: {\textcopyright} 2022, Pleiades Publishing, Ltd.",

year = "2022",

month = dec,

doi = "10.1134/S0965542522120144",

language = "英语",

volume = "62",

pages = "2123--2138",

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Multizonal Boundary and Internal Layers in the Singularly Perturbed Problems for a Stationary Equation of Reaction–Advection–Diffusion Type with Weak and Discontinuous Nonlinearity. / Yang, Q.; Ni, Mingkang.
In: Computational Mathematics and Mathematical Physics, Vol. 62, No. 12, 12.2022, p. 2123-2138.

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

TY - JOUR

T1 - Multizonal Boundary and Internal Layers in the Singularly Perturbed Problems for a Stationary Equation of Reaction–Advection–Diffusion Type with Weak and Discontinuous Nonlinearity

AU - Yang, Q.

AU - Ni, Mingkang

PY - 2022/12

Y1 - 2022/12

N2 - Abstract: A singularly perturbed Dirichlet boundary value problem for a stationary equation of reaction–advection–diffusion type with multiple roots of the degenerate equation is studied. This is a new class of problems with discontinuous reactive and weak advective terms. The existence of a contrast structure solution is proved by using the method of asymptotic differential inequalities and matching asymptotic expansion. And we show that the multiple roots lead to the formation of multizonal boundary and internal layers in the neighborhood of the boundary and the discontinuity point, which is essentially quite different from the case of isolated roots.

AB - Abstract: A singularly perturbed Dirichlet boundary value problem for a stationary equation of reaction–advection–diffusion type with multiple roots of the degenerate equation is studied. This is a new class of problems with discontinuous reactive and weak advective terms. The existence of a contrast structure solution is proved by using the method of asymptotic differential inequalities and matching asymptotic expansion. And we show that the multiple roots lead to the formation of multizonal boundary and internal layers in the neighborhood of the boundary and the discontinuity point, which is essentially quite different from the case of isolated roots.

KW - asymptotic method

KW - discontinuous dynamical system

KW - multizonal boundary and internal layer

KW - reaction–advection–diffusion equation

UR - https://www.scopus.com/pages/publications/85146127855

U2 - 10.1134/S0965542522120144

DO - 10.1134/S0965542522120144

M3 - 文章

AN - SCOPUS:85146127855

SN - 0965-5425

VL - 62

SP - 2123

EP - 2138

JO - Computational Mathematics and Mathematical Physics

JF - Computational Mathematics and Mathematical Physics

IS - 12

ER -

Multizonal Boundary and Internal Layers in the Singularly Perturbed Problems for a Stationary Equation of Reaction–Advection–Diffusion Type with Weak and Discontinuous Nonlinearity

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