Efficient exact arithmetic for computational geometry | Proceedings. Abstract. We experiment with exact integer arithmetic to implement primitives for geometric algorithms. Naive use of exact arithmetic—either modular or
Efficient exact arithmetic for computational geometry | Proceedings
*Static analysis yields efficient exact integer arithmetic for *
Efficient exact arithmetic for computational geometry | Proceedings. Abstract. We experiment with exact integer arithmetic to implement primitives for geometric algorithms. Naive use of exact arithmetic—either modular or , Static analysis yields efficient exact integer arithmetic for , Static analysis yields efficient exact integer arithmetic for
Reliable and Efficient Computational Geometry Via Controlled
*Accurate computation of the medial axis of a polyhedron *
Reliable and Efficient Computational Geometry Via Controlled. Exact arithmetic using cascaded computation. In: SocCG, pp Fortune, S., van Wyk, C.: Efficient exact integer arithmetic for computational geometry., Accurate computation of the medial axis of a polyhedron , Accurate computation of the medial axis of a polyhedron. Best Options for Professional Development efficient exact arithmetic for computational geometry and related matters.
Efficient exact arithmetic for computational geometry
*Interval arithmetic yields efficient dynamic filters for *
Efficient exact arithmetic for computational geometry. with exact integer arithmetic to imple-. We experiment ment primitives for geometric algorithms. Naive use of exact arithmetic-either modular., Interval arithmetic yields efficient dynamic filters for , Interval arithmetic yields efficient dynamic filters for
Exact Geometric Computation: Theory and Applications
*Number Sense, Numerical Operations, Estimations - Millstone *
Exact Geometric Computation: Theory and Applications. In evaluating integral polynomial expressions, modular arithmetic is an efficient alternative to exact integer arithmetic if the upper bound (or the , Number Sense, Numerical Operations, Estimations - Millstone , Number Sense, Numerical Operations, Estimations - Millstone. The Rise of Business Intelligence efficient exact arithmetic for computational geometry and related matters.
Interval Arithmetic: an efficient implementation and an application to
*An efficient, exact, and generic quadratic programming solver for *
Interval Arithmetic: an efficient implementation and an application to. About Keywords: Interval arithmetic, computational geometry, robustness, dynamic filters, C++ Efficient exact arithmetic for computational geometry., An efficient, exact, and generic quadratic programming solver for , An efficient, exact, and generic quadratic programming solver for
Fast Robust Predicates for Computational Geometry
Fast Robust Predicates for Computational Geometry
Fast Robust Predicates for Computational Geometry. Adaptive Precision Floating-Point Arithmetic and Fast Robust Predicates for Computational Geometry Van Wyk, Efficient Exact Arithmetic for Computational , Fast Robust Predicates for Computational Geometry, Fast Robust Predicates for Computational Geometry. Best Practices for Network Security efficient exact arithmetic for computational geometry and related matters.
Static Analysis Yields Efficient Exact Integer Arithmetic for
Prof. Dr. Leif Kobbelt - Computer Graphics and Multimedia
Static Analysis Yields Efficient Exact Integer Arithmetic for. Since arithmetic computation typically appears in the inner loop of a geometric computation, this substitution imposes substantial overhead. We present a , Prof. The Rise of Agile Management efficient exact arithmetic for computational geometry and related matters.. Dr. Leif Kobbelt - Computer Graphics and Multimedia, Prof. Dr. Leif Kobbelt - Computer Graphics and Multimedia
Exact and Efficient Polyhedral Envelope Containment Check
*Experimental Evaluation of Structural Filtering as a Tool for *
Exact and Efficient Polyhedral Envelope Containment Check. Best Methods in Value Generation efficient exact arithmetic for computational geometry and related matters.. Hervé Brönnimann, Christoph Burnikel, and Sylvain Pion. 1998. Interval Arithmetic. Yields Efficient Dynamic Filters for Computational Geometry. In Proceedings , Experimental Evaluation of Structural Filtering as a Tool for , Experimental Evaluation of Structural Filtering as a Tool for , PDF) EXACUS: Efficient and Exact Algorithms for Curves and Surfaces., PDF) EXACUS: Efficient and Exact Algorithms for Curves and Surfaces., Assisted by We show that interval techniques can be used to speed up the exact evaluation of geometric predicates and describe an efficient implementation of interval
