This archive contains source code, data and examples for the implementation of robust geometric predicates and the corresponding benchmarks, described in "Fast Floating-Point Filters for Robust Predicates". Instructions for building and running the benchmarks can be found in the README.md file
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
The algorithms of computational geometry are designed for a machine model with exact real arithmetic...
International audienceThe study of robustness problems for computational geometry algorithms is a to...
This archive contains source code and data for the implementation of robust geometric predicates and...
Geometric predicates are at the core of many algorithms, such as the construction of Delaunay triang...
Abstract Exact computer arithmetic has a variety of uses, including the robust implementation of geo...
Fast C implementations of four geometric predicates, the 2D and 3D orientation and incircle tests, a...
Abstract. Floating-point arithmetic provides a fast but inexact way of computing geometric predicate...
International audienceFloating-point arithmetic provides a fast but inexact way of computing geometr...
International audienceFloating-point arithmetic provides a fast but inexact way of computing geometr...
Geometric predicates are used in many GIS algorithms, such as the construction of Delaunay Triangula...
International audienceWe present a general purpose code analyzer and generator for filtered predicate...
This is a preliminary version of a chapter that will appear in the {\em Handbook on Computational Ge...
The algorithms of computational geometry are designed for a machine model with exact real arithmetic...
AbstractThe algorithms of computational geometry are designed for a machine model with exact real ar...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
The algorithms of computational geometry are designed for a machine model with exact real arithmetic...
International audienceThe study of robustness problems for computational geometry algorithms is a to...
This archive contains source code and data for the implementation of robust geometric predicates and...
Geometric predicates are at the core of many algorithms, such as the construction of Delaunay triang...
Abstract Exact computer arithmetic has a variety of uses, including the robust implementation of geo...
Fast C implementations of four geometric predicates, the 2D and 3D orientation and incircle tests, a...
Abstract. Floating-point arithmetic provides a fast but inexact way of computing geometric predicate...
International audienceFloating-point arithmetic provides a fast but inexact way of computing geometr...
International audienceFloating-point arithmetic provides a fast but inexact way of computing geometr...
Geometric predicates are used in many GIS algorithms, such as the construction of Delaunay Triangula...
International audienceWe present a general purpose code analyzer and generator for filtered predicate...
This is a preliminary version of a chapter that will appear in the {\em Handbook on Computational Ge...
The algorithms of computational geometry are designed for a machine model with exact real arithmetic...
AbstractThe algorithms of computational geometry are designed for a machine model with exact real ar...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
The algorithms of computational geometry are designed for a machine model with exact real arithmetic...
International audienceThe study of robustness problems for computational geometry algorithms is a to...
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