Modeling of steep layers in singularly perturbed diffusion–reaction equation via flexible fine-scale basis

We present a new stabilized method for the diffusion–reaction equation which develops sharp boundary and/or internal layers for the reaction-dominated case (i.e. singularly perturbed case). The method relies on an improved expression for the stabilization parameter that is derived via the fine-scale...

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Veröffentlicht in:	Computer methods in applied mechanics and engineering 2020-12, Vol.372 (C), p.113343, Article 113343
Hauptverfasser:	Masud, Arif, Anguiano, Marcelino, Harari, Isaac
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Sprache:	eng
Schlagworte:	Boundary layer stability Boundary layers Convergence Diffusion layers Diffusion-reaction equation Engineering Engineering, Multidisciplinary Euler-Lagrange equation Internal layers Mathematical models Mathematics Mathematics, Interdisciplinary Applications Maximum principle Mechanics Parameters Physical Sciences Quadrilaterals Reaction-diffusion equations Science & Technology Stability analysis Stabilized methods Technology VMS
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creator	Masud, Arif Anguiano, Marcelino Harari, Isaac
description	We present a new stabilized method for the diffusion–reaction equation which develops sharp boundary and/or internal layers for the reaction-dominated case (i.e. singularly perturbed case). The method relies on an improved expression for the stabilization parameter that is derived via the fine-scale variational formulation facilitated by the variational multiscale (VMS) framework. The proposed fine-scale basis consists of enrichment functions which may be nonzero at element edges. The derived stabilization parameter enjoys spatial variation over element interiors and along inter-element boundaries that helps model the rapid variation of the residual of the Euler–Lagrange equations over the domain. This feature also facilitates consistent stabilization across boundary and internal layers as well as capturing anisotropic refinement effects. The method is able to better satisfy the maximum principle as compared to other existing methods. We present a priori mathematical analysis of the stability and convergence of the method for the diffusion–reaction equation. Optimal convergence on meshes comprised of linear triangles and bilinear quadrilateral elements are presented for smooth problems, as well as for problems with steep boundary layers. Stability and accuracy features of the method for problems with discontinuous forcing function, internal layers, and boundary layers are shown and its performance on unstructured and distorted meshes comprised of quadrilateral and triangular elements is highlighted. •VMS stabilized method for singularly perturbed diffusion–reaction equation.•Fine-scale basis with multiple local functions that are nonzero at element edges.•Method eliminates oscillations, captures steep layers sharply, and adapts to directionality.•A priori mathematical analysis of the stability and convergence of the method.•Optimal convergence and stability shown on structured, stretched, and unstructured meshes.
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The method relies on an improved expression for the stabilization parameter that is derived via the fine-scale variational formulation facilitated by the variational multiscale (VMS) framework. The proposed fine-scale basis consists of enrichment functions which may be nonzero at element edges. The derived stabilization parameter enjoys spatial variation over element interiors and along inter-element boundaries that helps model the rapid variation of the residual of the Euler–Lagrange equations over the domain. This feature also facilitates consistent stabilization across boundary and internal layers as well as capturing anisotropic refinement effects. The method is able to better satisfy the maximum principle as compared to other existing methods. We present a priori mathematical analysis of the stability and convergence of the method for the diffusion–reaction equation. Optimal convergence on meshes comprised of linear triangles and bilinear quadrilateral elements are presented for smooth problems, as well as for problems with steep boundary layers. Stability and accuracy features of the method for problems with discontinuous forcing function, internal layers, and boundary layers are shown and its performance on unstructured and distorted meshes comprised of quadrilateral and triangular elements is highlighted. •VMS stabilized method for singularly perturbed diffusion–reaction equation.•Fine-scale basis with multiple local functions that are nonzero at element edges.•Method eliminates oscillations, captures steep layers sharply, and adapts to directionality.•A priori mathematical analysis of the stability and convergence of the method.•Optimal convergence and stability shown on structured, stretched, and unstructured meshes.</description><identifier>ISSN: 0045-7825</identifier><identifier>EISSN: 1879-2138</identifier><identifier>DOI: 10.1016/j.cma.2020.113343</identifier><language>eng</language><publisher>LAUSANNE: Elsevier B.V</publisher><subject>Boundary layer stability ; Boundary layers ; Convergence ; Diffusion layers ; Diffusion-reaction equation ; Engineering ; Engineering, Multidisciplinary ; Euler-Lagrange equation ; Internal layers ; Mathematical models ; Mathematics ; Mathematics, Interdisciplinary Applications ; Maximum principle ; Mechanics ; Parameters ; Physical Sciences ; Quadrilaterals ; Reaction-diffusion equations ; Science & Technology ; Stability analysis ; Stabilized methods ; Technology ; VMS</subject><ispartof>Computer methods in applied mechanics and engineering, 2020-12, Vol.372 (C), p.113343, Article 113343</ispartof><rights>2020 Elsevier B.V.</rights><rights>Copyright Elsevier BV Dec 1, 2020</rights><lds50>peer_reviewed</lds50><oa>free_for_read</oa><woscitedreferencessubscribed>true</woscitedreferencessubscribed><woscitedreferencescount>6</woscitedreferencescount><woscitedreferencesoriginalsourcerecordid>wos000592535600003</woscitedreferencesoriginalsourcerecordid><citedby>FETCH-LOGICAL-c395t-49f874dacc9867cfb34fc9879889e042939b8edb47e4a71841031955423e562f3</citedby><cites>FETCH-LOGICAL-c395t-49f874dacc9867cfb34fc9879889e042939b8edb47e4a71841031955423e562f3</cites><orcidid>0000-0002-6402-1981 ; 0000000264021981</orcidid></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><linktohtml>$$Uhttps://dx.doi.org/10.1016/j.cma.2020.113343$$EHTML$$P50$$Gelsevier$$H</linktohtml><link.rule.ids>230,315,782,786,887,3552,27931,27932,28255,46002</link.rule.ids><backlink>$$Uhttps://www.osti.gov/biblio/1681053$$D View this record in Osti.gov$$Hfree_for_read</backlink></links><search><creatorcontrib>Masud, Arif</creatorcontrib><creatorcontrib>Anguiano, Marcelino</creatorcontrib><creatorcontrib>Harari, Isaac</creatorcontrib><title>Modeling of steep layers in singularly perturbed diffusion–reaction equation via flexible fine-scale basis</title><title>Computer methods in applied mechanics and engineering</title><addtitle>COMPUT METHOD APPL M</addtitle><description>We present a new stabilized method for the diffusion–reaction equation which develops sharp boundary and/or internal layers for the reaction-dominated case (i.e. singularly perturbed case). The method relies on an improved expression for the stabilization parameter that is derived via the fine-scale variational formulation facilitated by the variational multiscale (VMS) framework. The proposed fine-scale basis consists of enrichment functions which may be nonzero at element edges. The derived stabilization parameter enjoys spatial variation over element interiors and along inter-element boundaries that helps model the rapid variation of the residual of the Euler–Lagrange equations over the domain. This feature also facilitates consistent stabilization across boundary and internal layers as well as capturing anisotropic refinement effects. The method is able to better satisfy the maximum principle as compared to other existing methods. We present a priori mathematical analysis of the stability and convergence of the method for the diffusion–reaction equation. 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subjects	Boundary layer stability Boundary layers Convergence Diffusion layers Diffusion-reaction equation Engineering Engineering, Multidisciplinary Euler-Lagrange equation Internal layers Mathematical models Mathematics Mathematics, Interdisciplinary Applications Maximum principle Mechanics Parameters Physical Sciences Quadrilaterals Reaction-diffusion equations Science & Technology Stability analysis Stabilized methods Technology VMS
title	Modeling of steep layers in singularly perturbed diffusion–reaction equation via flexible fine-scale basis
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