International audienceWe consider adaptations of the Mumford-Shah functional to graphs. These are based on discretizations of nonlocal approximations to the Mumford-Shah functional. Motivated by applications in machine learning we study the random geometric graphs associated to random samples of a measure. We establish the conditions on the graph constructions under which the minimizers of graph Mumford-Shah functionals converge to a minimizer of a continuum Mumford-Shah functional. Furthermore we explicitly identify the limiting functional. Moreover we describe an efficient algorithm for computing the approximate minimizers of the graph Mumford-Shah functional
In this paper we exhibit a family of stationary solutions of the Mumford-Shah functional in R^3 , ar...
In this paper, we present a method for the numerical minimization of the Mumford–Shah functional tha...
ABSTRACT. – Using a calibration method, we prove that, if w is a function which satisfies all Euler ...
International audienceWe consider adaptations of the Mumford-Shah functional to graphs. These are ba...
We study the pointwise convergence and the Gamma-convergence of a family of nonlocal functionals def...
We approximate, in the sense of Gamma-convergence, the Mumford-Shah functional by means of a sequenc...
Given a sample from a probability measure with support on a submanifold in Euclidean space one can c...
Given a sample from a probability measure with support on a submanifold in Euclidean space one can c...
International audienceWe show the Gamma-convergence of a family of discrete functionals to the Mumfo...
We propose a new Γ-convergent discrete approximation of the Mumford–Shah functional. The discrete fu...
This paper is concerned with power-weighted weight functionals associated with a minimal graph spann...
In this thesis we consider the one dimensional version of the functional introduced by D. Mumford an...
The Mumford-Shah functional, introduced to study image segmentation problems, is approximated in th...
We study topological and geometric functionals of l∞-random geometric graphs on the high-dimensional...
In this paper we address sampling and approximation of functions on combinatorial graphs. We develop...
In this paper we exhibit a family of stationary solutions of the Mumford-Shah functional in R^3 , ar...
In this paper, we present a method for the numerical minimization of the Mumford–Shah functional tha...
ABSTRACT. – Using a calibration method, we prove that, if w is a function which satisfies all Euler ...
International audienceWe consider adaptations of the Mumford-Shah functional to graphs. These are ba...
We study the pointwise convergence and the Gamma-convergence of a family of nonlocal functionals def...
We approximate, in the sense of Gamma-convergence, the Mumford-Shah functional by means of a sequenc...
Given a sample from a probability measure with support on a submanifold in Euclidean space one can c...
Given a sample from a probability measure with support on a submanifold in Euclidean space one can c...
International audienceWe show the Gamma-convergence of a family of discrete functionals to the Mumfo...
We propose a new Γ-convergent discrete approximation of the Mumford–Shah functional. The discrete fu...
This paper is concerned with power-weighted weight functionals associated with a minimal graph spann...
In this thesis we consider the one dimensional version of the functional introduced by D. Mumford an...
The Mumford-Shah functional, introduced to study image segmentation problems, is approximated in th...
We study topological and geometric functionals of l∞-random geometric graphs on the high-dimensional...
In this paper we address sampling and approximation of functions on combinatorial graphs. We develop...
In this paper we exhibit a family of stationary solutions of the Mumford-Shah functional in R^3 , ar...
In this paper, we present a method for the numerical minimization of the Mumford–Shah functional tha...
ABSTRACT. – Using a calibration method, we prove that, if w is a function which satisfies all Euler ...