In this paper we study the following quantitative isoperimetric inequality in the plane: $\lambda_0^2(\Omega) \leq C \delta(\Omega)$ where $\delta$ is the isoperimetric deficit and $\lambda_0$ is the barycentric asymmetry. Our aim is to generalize some results obtained by B. Fuglede in \cite{Fu93Geometriae}. For that purpose, we consider the shape optimization problem: minimize the ratio $\delta(\Omega)/\lambda_0^2(\Omega)$ in the class of compact connected sets and in the class of convex sets
AbstractWe find the largest ϵ (approximately 1.71579) for which any simple closed path α in the univ...
AbstractThe isoperimetric problem with respect to the product-type density e−|x|22dxdy on the Euclid...
We prove a sharp isoperimetric inequality in the Grushin plane and compute the corresponding isoperi...
In this paper we study the following quantitative isoperimetric inequality in the plane: $\lambda_0^...
International audienceIn this paper we study the quantitative isoperimetric inequality in the plane....
We present some recent stability results concerning the isoperimetric inequality and other related g...
The Isoperimetric Inequality has many different proofs using methods from diverse mathematical field...
We provide a full quantitative version of the Gaussian isoperimetric inequality: the difference betw...
We prove some results in the context of isoperimetric inequalities with quantitative terms. In the $...
We show that among all the convex bounded domain in R^2 having an assigned asymmetry index related t...
For simplicity, we restrict attention to subregions of the plane. Let Ω ⊆ R2 be the closure of a bou...
We introduce a new variational method for the study of isoperimetric inequalities with quantitative ...
International audienceConsider an open domain D on the plane, whose isoperimetric deficit is smaller...
We establish the validity of a quantitative isoperimetric inequality in higher codimension. To be pr...
We compute the exact value of the least “relative perimeter” of a shape $S$, with a given area, cont...
AbstractWe find the largest ϵ (approximately 1.71579) for which any simple closed path α in the univ...
AbstractThe isoperimetric problem with respect to the product-type density e−|x|22dxdy on the Euclid...
We prove a sharp isoperimetric inequality in the Grushin plane and compute the corresponding isoperi...
In this paper we study the following quantitative isoperimetric inequality in the plane: $\lambda_0^...
International audienceIn this paper we study the quantitative isoperimetric inequality in the plane....
We present some recent stability results concerning the isoperimetric inequality and other related g...
The Isoperimetric Inequality has many different proofs using methods from diverse mathematical field...
We provide a full quantitative version of the Gaussian isoperimetric inequality: the difference betw...
We prove some results in the context of isoperimetric inequalities with quantitative terms. In the $...
We show that among all the convex bounded domain in R^2 having an assigned asymmetry index related t...
For simplicity, we restrict attention to subregions of the plane. Let Ω ⊆ R2 be the closure of a bou...
We introduce a new variational method for the study of isoperimetric inequalities with quantitative ...
International audienceConsider an open domain D on the plane, whose isoperimetric deficit is smaller...
We establish the validity of a quantitative isoperimetric inequality in higher codimension. To be pr...
We compute the exact value of the least “relative perimeter” of a shape $S$, with a given area, cont...
AbstractWe find the largest ϵ (approximately 1.71579) for which any simple closed path α in the univ...
AbstractThe isoperimetric problem with respect to the product-type density e−|x|22dxdy on the Euclid...
We prove a sharp isoperimetric inequality in the Grushin plane and compute the corresponding isoperi...