Global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous media

In this work we prove the existence of global weak solutions to a degenerate and strongly coupled parabolic system arising from the transport processes through partially saturated deformable porous materials. The hygro-thermal model is coupled with quasi-static evolution equations modeling elas...

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Main Author: Michal Benes
Format: Article
Language:English
Published: Texas State University 2020-06-01
Series:Electronic Journal of Differential Equations
Subjects:
Online Access:http://ejde.math.txstate.edu/Volumes/2020/63/abstr.html
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spelling doaj-2b96f178fd314f8b8c61683623dc175f2020-11-25T03:16:34ZengTexas State UniversityElectronic Journal of Differential Equations1072-66912020-06-01202063,126Global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous mediaMichal Benes0 Czech Technical Univ., Prague, Czech Republic In this work we prove the existence of global weak solutions to a degenerate and strongly coupled parabolic system arising from the transport processes through partially saturated deformable porous materials. The hygro-thermal model is coupled with quasi-static evolution equations modeling elastic and inelastic mechanical deformations. Physically relevant Newton boundary conditions are considered for water pressure and temperature of the porous system. The traction boundary condition is imposed on the deformable solid skeleton of the porous material. Degeneration occurs in both elliptic and parabolic part of the balance equation for mass of water. The coupling between water pressure, temperature, stress tensor and internal variables occurs in transport coefficients, constitutive functions and the decomposition of the total strain tensor into elastic and plastic parts due to mechanical effect and strain tensor due to thermal expansion.http://ejde.math.txstate.edu/Volumes/2020/63/abstr.htmlsecond-order parabolic systems, global solutionporous mediasmoothness and regularitycoupled transport processeselastic-inelastic solidsinternal variablestraction problemconstitutive equationscoercivityconvexity
collection DOAJ
language English
format Article
sources DOAJ
author Michal Benes
spellingShingle Michal Benes
Global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous media
Electronic Journal of Differential Equations
second-order parabolic systems, global solution
porous media
smoothness and regularity
coupled transport processes
elastic-inelastic solids
internal variables
traction problem
constitutive equations
coercivity
convexity
author_facet Michal Benes
author_sort Michal Benes
title Global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous media
title_short Global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous media
title_full Global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous media
title_fullStr Global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous media
title_full_unstemmed Global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous media
title_sort global weak solutions to degenerate coupled transport processes in partially saturated deformable elastic-inelastic porous media
publisher Texas State University
series Electronic Journal of Differential Equations
issn 1072-6691
publishDate 2020-06-01
description In this work we prove the existence of global weak solutions to a degenerate and strongly coupled parabolic system arising from the transport processes through partially saturated deformable porous materials. The hygro-thermal model is coupled with quasi-static evolution equations modeling elastic and inelastic mechanical deformations. Physically relevant Newton boundary conditions are considered for water pressure and temperature of the porous system. The traction boundary condition is imposed on the deformable solid skeleton of the porous material. Degeneration occurs in both elliptic and parabolic part of the balance equation for mass of water. The coupling between water pressure, temperature, stress tensor and internal variables occurs in transport coefficients, constitutive functions and the decomposition of the total strain tensor into elastic and plastic parts due to mechanical effect and strain tensor due to thermal expansion.
topic second-order parabolic systems, global solution
porous media
smoothness and regularity
coupled transport processes
elastic-inelastic solids
internal variables
traction problem
constitutive equations
coercivity
convexity
url http://ejde.math.txstate.edu/Volumes/2020/63/abstr.html
work_keys_str_mv AT michalbenes globalweaksolutionstodegeneratecoupledtransportprocessesinpartiallysaturateddeformableelasticinelasticporousmedia
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