Our starting point is a parameterized family of functionals (a 'theory') for which we are interested in approximating the global minima of the energy when one of these parameters goes to zero. The goal is to develop a set of increasingly accurate asymptotic variational models allowing one to deal with the cases when this parameter is 'small' but finite. Since Gamma-convergence may be non-uniform within the 'theory', we pose a problem of finding a uniform approximation. To achieve this goal we propose a method based on rectifying the singular points in the parameter space by using a blow-up argument and then asymptotically matching the approximations around such points with the regular approximation away from them. We illustrate the main ide...
A novel general framework for the study of Γ -convergence of functionals defined over pairs of measu...
In addition to the various uses it was introduced for, the theory of -convergence o.ers a rather nat...
We consider a class of nonconvex functionals of the gradient in one dimension, which we regularize w...
Our starting point is a parameterized family of functionals (a 'theory') for which we are interested...
These notes have been motivated by the interests of the author in variational problems depending on ...
This paper is an extended version of the lecture delivered at the Summer School on Differential Equa...
1. Γ-convergence: the general framework. 2. Limits of sequences of Riemannian metrics. 3. Γ-converge...
AbstractWe describe a new uniform asymptotic expansion for the incomplete gamma function Γ(a,z) vali...
This book addresses new questions related to the asymptotic description of converging energies from ...
In this paper we consider a one-dimensional chain of atoms which interact with their nearest and nex...
We analyze the asymptotic behavior of a variational model for damaged elastic materials. This model ...
We consider the approximation of the total variation of a function by the family of nonlocal and non...
International audienceA $\Gamma$-convergence analysis is used to perform a 3D-2D dimension reduction...
In this paper, a behavior of certain modified Perona−Malik functionals is considered as the paramete...
We studied a nonlocal model for phase transition of Allen-Cahn type. At first, we used Direct Method...
A novel general framework for the study of Γ -convergence of functionals defined over pairs of measu...
In addition to the various uses it was introduced for, the theory of -convergence o.ers a rather nat...
We consider a class of nonconvex functionals of the gradient in one dimension, which we regularize w...
Our starting point is a parameterized family of functionals (a 'theory') for which we are interested...
These notes have been motivated by the interests of the author in variational problems depending on ...
This paper is an extended version of the lecture delivered at the Summer School on Differential Equa...
1. Γ-convergence: the general framework. 2. Limits of sequences of Riemannian metrics. 3. Γ-converge...
AbstractWe describe a new uniform asymptotic expansion for the incomplete gamma function Γ(a,z) vali...
This book addresses new questions related to the asymptotic description of converging energies from ...
In this paper we consider a one-dimensional chain of atoms which interact with their nearest and nex...
We analyze the asymptotic behavior of a variational model for damaged elastic materials. This model ...
We consider the approximation of the total variation of a function by the family of nonlocal and non...
International audienceA $\Gamma$-convergence analysis is used to perform a 3D-2D dimension reduction...
In this paper, a behavior of certain modified Perona−Malik functionals is considered as the paramete...
We studied a nonlocal model for phase transition of Allen-Cahn type. At first, we used Direct Method...
A novel general framework for the study of Γ -convergence of functionals defined over pairs of measu...
In addition to the various uses it was introduced for, the theory of -convergence o.ers a rather nat...
We consider a class of nonconvex functionals of the gradient in one dimension, which we regularize w...