International audienceThe aim of this paper is to study an optimal opening in the sense of minimize the relationship perimeter over area. We analyze theoretical properties of this opening by means of classical results from variational calculus. Firstly, we explore the optimal radius as attribute in morphological attribute filtering for grey scale images. Secondly, an application of this optimal opening that yields a decomposition into meaningful parts in the case of binary image is explored. We provide different examples of 2D, 3D images and mesh-points datasets
International audienceThis paper proposes new adaptive structuring elements in the framework of math...
Thesis (S.M.)--Massachusetts Institute of Technology, Computation for Design and Optimization Progra...
The design of optimal morphological filters, in the binary or gray scale domain, involves a computat...
The filter that removes from a binary image its con-nected components with area smaller than a param...
Classical adaptive mathematical morphology is based on operators which locally adapt the structuring...
The Cheeger problem consists in minimizing the ratio "perimeter over volume" among subsets of a give...
We show that the maximal Cheeger set of a Jordan domain Ω without necks is the union of all balls of...
Path openings are morphological operators that are used to preserve long, thin, and curved structure...
Multiscale methods which provide a decomposition of an image based on scale have many uses in image ...
Morphological attribute openings and closings and related operators are generalizations of the area ...
We propose efficiency of representation as a criterion for evaluating shape models, then apply this ...
The detection of thin and oriented features in an image leads to a large field of applications speci...
Abstract-We use a statistical framework for finding boundaries and for partitioning scenes into homo...
Researchers in many fields often need to quantify the similarity between images using metrics that m...
In this paper we consider the generalization of the Cheeger problem which comes by considering the r...
International audienceThis paper proposes new adaptive structuring elements in the framework of math...
Thesis (S.M.)--Massachusetts Institute of Technology, Computation for Design and Optimization Progra...
The design of optimal morphological filters, in the binary or gray scale domain, involves a computat...
The filter that removes from a binary image its con-nected components with area smaller than a param...
Classical adaptive mathematical morphology is based on operators which locally adapt the structuring...
The Cheeger problem consists in minimizing the ratio "perimeter over volume" among subsets of a give...
We show that the maximal Cheeger set of a Jordan domain Ω without necks is the union of all balls of...
Path openings are morphological operators that are used to preserve long, thin, and curved structure...
Multiscale methods which provide a decomposition of an image based on scale have many uses in image ...
Morphological attribute openings and closings and related operators are generalizations of the area ...
We propose efficiency of representation as a criterion for evaluating shape models, then apply this ...
The detection of thin and oriented features in an image leads to a large field of applications speci...
Abstract-We use a statistical framework for finding boundaries and for partitioning scenes into homo...
Researchers in many fields often need to quantify the similarity between images using metrics that m...
In this paper we consider the generalization of the Cheeger problem which comes by considering the r...
International audienceThis paper proposes new adaptive structuring elements in the framework of math...
Thesis (S.M.)--Massachusetts Institute of Technology, Computation for Design and Optimization Progra...
The design of optimal morphological filters, in the binary or gray scale domain, involves a computat...