Nonrobustness is a well-known problem in many areas of computational science. Until now, robustness techniques and the construction of robust algorithms have been the province of experts in this field of research. We describe a new C/C++ library (Core) for robust numeric and geometric computation based on the principles of Exact Geometric Computation (EGC). Through our library, for the first time, any programmer can write robust and efficient algorithms. The Core Library is based on a novel numerical core that is powerful enough to support EGC for algebraic problems. This is coupled with a simple delivery mechanism which transparently extends conventional C/C++ programs into robust codes. We are currently addressing efficiency issues in our...
Reliable implementation of geometric algorithms is a notoriously difficult task. Algorithms are usua...
AbstractMost problems in computational geometry are algebraic. A general approach to address nonrobu...
Abstract. We summarize recent progress and on-going developments for exact geometric and algebraic c...
Nonrobustness is a well-known problem in many areas of computational science. Until now, robustness ...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
AbstractExact computation is assumed in most algorithms in computational geometry. In practice, impl...
AbstractComputational geometry has produced an impressive wealth of efficient algorithms. The robust...
This paper attempts to present an expository summary on the numerical non-robustness issues in geome...
This is a preliminary version of a chapter that will appear in the {\em Handbook on Computational Ge...
Geometric computation software tends to be fragile and fails occasionally. This robustness problem i...
Robustness issues due to imprecise arithmetic used in place of exact real number computation are a n...
AbstractWe present a generic C++ design to perform exact geometric computations efficiently using la...
International audienceThere is a growing interest in numeric-algebraic techniques in the computer al...
Geometric predicates are used in many GIS algorithms, such as the construction of Delaunay Triangula...
Abstract Exact computer arithmetic has a variety of uses, including the robust implementation of geo...
Reliable implementation of geometric algorithms is a notoriously difficult task. Algorithms are usua...
AbstractMost problems in computational geometry are algebraic. A general approach to address nonrobu...
Abstract. We summarize recent progress and on-going developments for exact geometric and algebraic c...
Nonrobustness is a well-known problem in many areas of computational science. Until now, robustness ...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
AbstractExact computation is assumed in most algorithms in computational geometry. In practice, impl...
AbstractComputational geometry has produced an impressive wealth of efficient algorithms. The robust...
This paper attempts to present an expository summary on the numerical non-robustness issues in geome...
This is a preliminary version of a chapter that will appear in the {\em Handbook on Computational Ge...
Geometric computation software tends to be fragile and fails occasionally. This robustness problem i...
Robustness issues due to imprecise arithmetic used in place of exact real number computation are a n...
AbstractWe present a generic C++ design to perform exact geometric computations efficiently using la...
International audienceThere is a growing interest in numeric-algebraic techniques in the computer al...
Geometric predicates are used in many GIS algorithms, such as the construction of Delaunay Triangula...
Abstract Exact computer arithmetic has a variety of uses, including the robust implementation of geo...
Reliable implementation of geometric algorithms is a notoriously difficult task. Algorithms are usua...
AbstractMost problems in computational geometry are algebraic. A general approach to address nonrobu...
Abstract. We summarize recent progress and on-going developments for exact geometric and algebraic c...