2008
DOI: 10.2140/jomms.2008.3.507
|View full text |Cite
|
Sign up to set email alerts
|

A variational deduction of second gradient poroelasticity I: general theory

Abstract: Second gradient theories have to be used to capture how local micro heterogeneities macroscopically affect the behavior of a continuum. In this paper a configurational space for a solid matrix filled by an unknown amount of fluid is introduced. The Euler-Lagrange equations valid for second gradient poromechanics, generalizing those due to Biot, are deduced by means of a Lagrangian variational formulation. Starting from a generalized Clausius-Duhem inequality, valid in the framework of second gradient theories,… Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
1
1
1
1

Citation Types

0
90
0

Year Published

2011
2011
2017
2017

Publication Types

Select...
7

Relationship

1
6

Authors

Journals

citations
Cited by 85 publications
(91 citation statements)
references
References 26 publications
0
90
0
Order By: Relevance
“…Strain gradient models (see e.g. [2,65] for classical references and [66,67] for more recent results) are good candidates for this purpose, as shown in [68][69][70]. A review of results on the theoretical foundation of a variational approach for higher gradient theories is [71].…”
Section: Numerical Simulationsmentioning
confidence: 99%
“…Strain gradient models (see e.g. [2,65] for classical references and [66,67] for more recent results) are good candidates for this purpose, as shown in [68][69][70]. A review of results on the theoretical foundation of a variational approach for higher gradient theories is [71].…”
Section: Numerical Simulationsmentioning
confidence: 99%
“…Indeed, what is currently done in continuum poromechanics (see e.g. [13], [14], [20], [39]) is to assume that only the solid and fluid placements are independent kinematical fields, while porosity is usually indirectly calculated by means of so-called "saturation hypotesis" according to which porosity is obtained as the ratio between the "apparent" density of the fluid (which is indeed one of the unknowns of classical poromechanical models) and the "true" or "intrinsic" density (which is usually arbitrarily assigned and is not an unknown field of the problem). If this hypothesis is sensible in the case of saturated media, it constitutes a too strict constraint for partially saturated ones.…”
Section: Kinematics Of a Partially Saturated Porous Mediummentioning
confidence: 99%
“…A more general theory accounting for the presence of second gradient of the fluid placements φ w and φ a (i.e. of first gradient of the fluid densities) is needed to treat some kind of problems and can be obtained in the spirit of what done in [39].…”
Section: Governing Equations For Isotropic Microscopically Homogeneomentioning
confidence: 99%
See 1 more Smart Citation
“…(i) By taking as the starting point the "microscopic models" for interactions between the fluid flow and a deformable porous matrix [70][71][72][73] so as to obtain higher gradient fractal models.…”
Section: Extremum and Variational Principles In Fractal Bodiesmentioning
confidence: 99%