Add to ORKGIn this paper we talk about a new efficient numerical approach to deal with inaccuracy when implementing geometric algorithms. Using various floating-point filters together with arbitrary precision packages, we develop an easy-to-use expression compiler called EXPCOMP. EXPCOMP supports all common operations +, −, ·, /, √. Applying a new semi-static filter, EXPCOMP combines the speed of static filters with the power of dynamic filters. The filter stages deal with all kinds of floating-point exceptions, including underflow. The resulting programs show a very good runtime behaviour
The technical report describes floating precision problems in geometric calculations. First, practic...
International audienceWe present a general purpose code analyzer and generator for filtered predicate...
Studying floating point arithmetic, authors have shown that the implemented operations (addition, su...
Geometric predicates are at the core of many algorithms, such as the construction of Delaunay triang...
International audienceFloating-point arithmetic provides a fast but inexact way of computing geometr...
Reliable implementation of geometric algorithms is a notoriously difficult task. Algorithms are usua...
Algorithms in Computational Geometry and Computer Aid-ed Design are often developed for the Real RAM...
Algorithms in Computational Geometry and Computer Aided Design are often developed for the Real RAM ...
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...
International audienceFloating-point arithmetic provides a fast but inexact way of computing geometr...
Abstract. Floating-point arithmetic provides a fast but inexact way of computing geometric predicate...
AbstractExact computation is assumed in most algorithms in computational geometry. In practice, impl...
Geometric predicates are used in many GIS algorithms, such as the construction of Delaunay Triangula...
We discuss floating-point filters as a means of restricting the precision needed for arithmetic oper...
The technical report describes floating precision problems in geometric calculations. First, practic...
International audienceWe present a general purpose code analyzer and generator for filtered predicate...
Studying floating point arithmetic, authors have shown that the implemented operations (addition, su...
Geometric predicates are at the core of many algorithms, such as the construction of Delaunay triang...
International audienceFloating-point arithmetic provides a fast but inexact way of computing geometr...
Reliable implementation of geometric algorithms is a notoriously difficult task. Algorithms are usua...
Algorithms in Computational Geometry and Computer Aid-ed Design are often developed for the Real RAM...
Algorithms in Computational Geometry and Computer Aided Design are often developed for the Real RAM ...
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...
International audienceFloating-point arithmetic provides a fast but inexact way of computing geometr...
Abstract. Floating-point arithmetic provides a fast but inexact way of computing geometric predicate...
AbstractExact computation is assumed in most algorithms in computational geometry. In practice, impl...
Geometric predicates are used in many GIS algorithms, such as the construction of Delaunay Triangula...
We discuss floating-point filters as a means of restricting the precision needed for arithmetic oper...
The technical report describes floating precision problems in geometric calculations. First, practic...
International audienceWe present a general purpose code analyzer and generator for filtered predicate...
Studying floating point arithmetic, authors have shown that the implemented operations (addition, su...