International audienceGeometric algorithms are widely used in many scientific fields like computer vision, computer graphics. To guarantee the correctness of these algorithms, it's important to apply formal method to them.We propose an approach to proving the correctness of geometric algorithms. The main contribution of the paper is that a set of proof decomposition rules is proposed which can help improve the automation of the proof of geometric algorithms. We choose TLA+2, a structural specification and proof language, as our experiment environment. The case study on a classical convex hull algorithm shows the usability of the method
AbstractThe algorithms of computational geometry are designed for a machine model with exact real ar...
Wu’s Method for proving geometric theorems is well known. We investigate the underlying algorithms i...
In this article, we propose an analysis of the computational constraints that are imposed on the des...
International audienceGeometric algorithms are widely used in many scientific fields like computer v...
In these notes, which were originally written as lecture notes for Advanced School on Algorithmic Fo...
Transforming a geometric algorithm into an effective computer program is a difficult task. This tran...
International audienceWe study the development of formally proved algorithms for computational geome...
Computational geometry emerged from the field of algorithms design and anal ysis in the late 1970s....
The computer--aided solution to algorithmic problems is becoming more and more important in various ...
Reliable implementation of geometric algorithms is a notoriously difficult task. Algorithms are usua...
International audienceConstraint Logic Programming can be advantageously used to deal with quadratic...
Correct implementation of published geometric algorithms is surprisingly difficult. Geometric algori...
This paper presents a semi-automated methodology for generating geometric proof problems of the kind...
International audienceThe algorithms of computational geometry are designed for a machine model with...
Transforming a geometric algorithm into an effective computer pro-gram is a difficult task. This tra...
AbstractThe algorithms of computational geometry are designed for a machine model with exact real ar...
Wu’s Method for proving geometric theorems is well known. We investigate the underlying algorithms i...
In this article, we propose an analysis of the computational constraints that are imposed on the des...
International audienceGeometric algorithms are widely used in many scientific fields like computer v...
In these notes, which were originally written as lecture notes for Advanced School on Algorithmic Fo...
Transforming a geometric algorithm into an effective computer program is a difficult task. This tran...
International audienceWe study the development of formally proved algorithms for computational geome...
Computational geometry emerged from the field of algorithms design and anal ysis in the late 1970s....
The computer--aided solution to algorithmic problems is becoming more and more important in various ...
Reliable implementation of geometric algorithms is a notoriously difficult task. Algorithms are usua...
International audienceConstraint Logic Programming can be advantageously used to deal with quadratic...
Correct implementation of published geometric algorithms is surprisingly difficult. Geometric algori...
This paper presents a semi-automated methodology for generating geometric proof problems of the kind...
International audienceThe algorithms of computational geometry are designed for a machine model with...
Transforming a geometric algorithm into an effective computer pro-gram is a difficult task. This tra...
AbstractThe algorithms of computational geometry are designed for a machine model with exact real ar...
Wu’s Method for proving geometric theorems is well known. We investigate the underlying algorithms i...
In this article, we propose an analysis of the computational constraints that are imposed on the des...