A two-dimensional solid consisting of a linear elastic isotropic material is considered in this paper. The strain energy is expressed as a function of the strain and of the gradient of strain. The balance equations and the boundary conditions have been derived and numerically simulated for those classical problems for which an analytical solution is available in the literature. Numerical simulations have been developed with a commercial code and a perfect overlap between the results and the analytical solution has been found. The role of external edge double forces and external wedge forces has also been analyzed. We investigate a mesh-size independency of second gradient numerical solutions with respect to the classical first gradient one....
Second-gradient theories represent a frequently used subset of theories of continua with microstruct...
In the present contribution the concept of isogeometric analysis is extended towards the numerical s...
The dissertation studies the majority of the most relevant and widespread physico-mathematical model...
A two-dimensional solid consisting of a linear elastic isotropic material is considered in this pape...
AbstractA multi-cell homogenization procedure with four geometrically different groups of cell eleme...
AbstractThe different forms of second order elasticity operators, in Mindlin’s strain-gradient elast...
In the present paper, a two-dimensional solid consisting of a linear elastic isotropic material, for...
We present a compact, linearized theory for the quasi-static deformation of elastic materials whose ...
This dissertation is devoted to two families of generalized continuum theories: the first and second...
In this paper, it is proven an existence and uniqueness theorem for weak solutions of the equilibriu...
The fundamental equations for Form II of Mindlin's second strain gradient elasticity theory for isot...
International audienceWe consider in this paper analytical solutions for some remarkable cases and f...
A second-gradient elastic material has been identified as the equivalent homogeneous material of an ...
AbstractThis paper is the sequel of a companion Part I paper devoted to the constitutive equations a...
In elasticity, microstructure-related deviations may be modeled by strain gradient elasticity. For s...
Second-gradient theories represent a frequently used subset of theories of continua with microstruct...
In the present contribution the concept of isogeometric analysis is extended towards the numerical s...
The dissertation studies the majority of the most relevant and widespread physico-mathematical model...
A two-dimensional solid consisting of a linear elastic isotropic material is considered in this pape...
AbstractA multi-cell homogenization procedure with four geometrically different groups of cell eleme...
AbstractThe different forms of second order elasticity operators, in Mindlin’s strain-gradient elast...
In the present paper, a two-dimensional solid consisting of a linear elastic isotropic material, for...
We present a compact, linearized theory for the quasi-static deformation of elastic materials whose ...
This dissertation is devoted to two families of generalized continuum theories: the first and second...
In this paper, it is proven an existence and uniqueness theorem for weak solutions of the equilibriu...
The fundamental equations for Form II of Mindlin's second strain gradient elasticity theory for isot...
International audienceWe consider in this paper analytical solutions for some remarkable cases and f...
A second-gradient elastic material has been identified as the equivalent homogeneous material of an ...
AbstractThis paper is the sequel of a companion Part I paper devoted to the constitutive equations a...
In elasticity, microstructure-related deviations may be modeled by strain gradient elasticity. For s...
Second-gradient theories represent a frequently used subset of theories of continua with microstruct...
In the present contribution the concept of isogeometric analysis is extended towards the numerical s...
The dissertation studies the majority of the most relevant and widespread physico-mathematical model...