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, the existence of a macroscopic solid skeleton Lagrangian deformation energy, depending on the solid strain and the Lagrangian fluid mass density as well as on their Lagrangian gradients, is proven.
A variational deduction of second gradient poroelasticity part I: General theory / Sciarra, Giulio; Dell'Isola, Francesco; Ianiro, Nicoletta; Madeo, Angela. - In: JOURNAL OF MECHANICS OF MATERIALS AND STRUCTURES. - ISSN 1559-3959. - STAMPA. - 3:3(2008), pp. 507-526. [10.2140/jomms.2008.3.507]
A variational deduction of second gradient poroelasticity part I: General theory
SCIARRA, Giulio;DELL'ISOLA, Francesco;IANIRO, Nicoletta;MADEO, ANGELA
2008
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, the existence of a macroscopic solid skeleton Lagrangian deformation energy, depending on the solid strain and the Lagrangian fluid mass density as well as on their Lagrangian gradients, is proven.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
