Suchergebnisse - ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness

Certification of a Numerical Result: Use of Interval Arithmetic and Multiple Precision

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: NSV-3: Third International Workshop on Numerical Software Verification. ; https://inria.hal.science/inria-00544798 ; NSV-3: Third International Workshop on Numerical Software Verification., Fainekos, Georgios and Goubault, Eric and Putot, Sylvie, Jul 2010, Edinburgh, United Kingdom

Schlagwörter: iterative refinement, interval arithmetic, multiple precision, error bound, ACM: D.: Software/D.2: SOFTWARE ENGINEERING/D.2.4: Software/Program Verification/D.2.4.8: Validation, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Geographisches Schlagwort: Edinburgh, United Kingdom

Verfügbarkeit: https://inria.hal.science/inria-00544798
https://inria.hal.science/inria-00544798v1/document
https://inria.hal.science/inria-00544798v1/file/Nguyen-Revol-v2.pdf

Certification of a Numerical Result: Use of Interval Arithmetic and Multiple Precision

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: NSV-3: Third International Workshop on Numerical Software Verification. ; https://inria.hal.science/inria-00544798 ; NSV-3: Third International Workshop on Numerical Software Verification., Fainekos, Georgios and Goubault, Eric and Putot, Sylvie, Jul 2010, Edinburgh, United Kingdom

Schlagwörter: iterative refinement, interval arithmetic, multiple precision, error bound, ACM: D.: Software/D.2: SOFTWARE ENGINEERING/D.2.4: Software/Program Verification/D.2.4.8: Validation, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Geographisches Schlagwort: Edinburgh, United Kingdom

Verfügbarkeit: https://inria.hal.science/inria-00544798
https://inria.hal.science/inria-00544798v1/document
https://inria.hal.science/inria-00544798v1/file/Nguyen-Revol-v2.pdf

Certification of a Numerical Result: Use of Interval Arithmetic and Multiple Precision

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: NSV-3: Third International Workshop on Numerical Software Verification. ; https://inria.hal.science/inria-00544798 ; NSV-3: Third International Workshop on Numerical Software Verification., Fainekos, Georgios and Goubault, Eric and Putot, Sylvie, Jul 2010, Edinburgh, United Kingdom

Schlagwörter: iterative refinement, interval arithmetic, multiple precision, error bound, ACM: D.: Software/D.2: SOFTWARE ENGINEERING/D.2.4: Software/Program Verification/D.2.4.8: Validation, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Geographisches Schlagwort: Edinburgh, United Kingdom

Verfügbarkeit: https://inria.hal.science/inria-00544798
https://inria.hal.science/inria-00544798v1/document
https://inria.hal.science/inria-00544798v1/file/Nguyen-Revol-v2.pdf

Certification of a Numerical Result: Use of Interval Arithmetic and Multiple Precision

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: NSV-3: Third International Workshop on Numerical Software Verification. ; https://hal.inria.fr/inria-00544798 ; NSV-3: Third International Workshop on Numerical Software Verification., Fainekos, Georgios and Goubault, Eric and Putot, Sylvie, Jul 2010, Edinburgh, United Kingdom

Schlagwörter: iterative refinement, interval arithmetic, multiple precision, error bound, ACM: D.: Software/D.2: SOFTWARE ENGINEERING/D.2.4: Software/Program Verification/D.2.4.8: Validation, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Geographisches Schlagwort: Edinburgh, United Kingdom

Relation: inria-00544798; https://hal.inria.fr/inria-00544798; https://hal.inria.fr/inria-00544798/document; https://hal.inria.fr/inria-00544798/file/Nguyen-Revol-v2.pdf

Verfügbarkeit: https://hal.inria.fr/inria-00544798
https://hal.inria.fr/inria-00544798/document
https://hal.inria.fr/inria-00544798/file/Nguyen-Revol-v2.pdf

Certification of a Numerical Result: Use of Interval Arithmetic and Multiple Precision

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: NSV-3: Third International Workshop on Numerical Software Verification. ; https://inria.hal.science/inria-00544798 ; NSV-3: Third International Workshop on Numerical Software Verification., Fainekos, Georgios and Goubault, Eric and Putot, Sylvie, Jul 2010, Edinburgh, United Kingdom

Schlagwörter: iterative refinement, interval arithmetic, multiple precision, error bound, ACM: D.: Software/D.2: SOFTWARE ENGINEERING/D.2.4: Software/Program Verification/D.2.4.8: Validation, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Geographisches Schlagwort: Edinburgh, United Kingdom

Verfügbarkeit: https://inria.hal.science/inria-00544798
https://inria.hal.science/inria-00544798v1/document
https://inria.hal.science/inria-00544798v1/file/Nguyen-Revol-v2.pdf

Solving and Certifying the Solution of a Linear System

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: ISSN: 1385-3139.

Schlagwörter: linear systems, interval arithmetic, error bound, iterative refinement, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.4: Linear systems (direct and iterative methods), ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.3: Error analysis, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Verfügbarkeit: https://inria.hal.science/inria-00546856
https://inria.hal.science/inria-00546856v1/document
https://inria.hal.science/inria-00546856v1/file/Nguyen-Revol.pdf

Solving and Certifying the Solution of a Linear System

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: ISSN: 1385-3139.

Schlagwörter: linear systems, interval arithmetic, error bound, iterative refinement, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.4: Linear systems (direct and iterative methods), ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.3: Error analysis, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Verfügbarkeit: https://inria.hal.science/inria-00546856
https://inria.hal.science/inria-00546856v1/document
https://inria.hal.science/inria-00546856v1/file/Nguyen-Revol.pdf

Solving and Certifying the Solution of a Linear System

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: ISSN: 1385-3139.

Schlagwörter: linear systems, interval arithmetic, error bound, iterative refinement, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.4: Linear systems (direct and iterative methods), ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.3: Error analysis, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Verfügbarkeit: https://inria.hal.science/inria-00546856
https://inria.hal.science/inria-00546856v1/document
https://inria.hal.science/inria-00546856v1/file/Nguyen-Revol.pdf

Solving and Certifying the Solution of a Linear System

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: ISSN: 1385-3139.

Schlagwörter: linear systems, interval arithmetic, error bound, iterative refinement, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.4: Linear systems (direct and iterative methods), ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.3: Error analysis, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Relation: inria-00546856; https://hal.inria.fr/inria-00546856; https://hal.inria.fr/inria-00546856/document; https://hal.inria.fr/inria-00546856/file/Nguyen-Revol.pdf

Verfügbarkeit: https://hal.inria.fr/inria-00546856
https://hal.inria.fr/inria-00546856/document
https://hal.inria.fr/inria-00546856/file/Nguyen-Revol.pdf

Solving and Certifying the Solution of a Linear System

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: ISSN: 1385-3139.

Schlagwörter: linear systems, interval arithmetic, error bound, iterative refinement, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.4: Linear systems (direct and iterative methods), ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra/G.1.3.3: Error analysis, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Verfügbarkeit: https://inria.hal.science/inria-00546856
https://inria.hal.science/inria-00546856v1/document
https://inria.hal.science/inria-00546856v1/file/Nguyen-Revol.pdf

Towards resilient parallel linear Krylov solvers: recover-restart strategies

Autoren: Agullo, Emmanuel Giraud, Luc Guermouche, Abdou et al.

Weitere Verfasser: Agullo, Emmanuel Giraud, Luc Guermouche, Abdou et al.

Quelle: https://inria.hal.science/hal-00843992 ; [Research Report] RR-8324, INRIA. 2013, pp.36.

Schlagwörter: Resilience, linear Krylov solvers, linear and least-square interpolation, monotonic convergence, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.4: Parallel and vector implementations, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [MATH.MATH-NA]Mathematics [math]/Numerical Analysis [math.NA], [INFO.INFO-DC]Computer Science [cs]/Distributed, Parallel, and Cluster Computing [cs.DC]

Verfügbarkeit: https://inria.hal.science/hal-00843992
https://inria.hal.science/hal-00843992/document
https://inria.hal.science/hal-00843992/file/RR-8324.pdf

Towards resilient parallel linear Krylov solvers: recover-restart strategies

Autoren: Agullo, Emmanuel Giraud, Luc Guermouche, Abdou et al.

Weitere Verfasser: Agullo, Emmanuel Giraud, Luc Guermouche, Abdou et al.

Quelle: https://hal.inria.fr/hal-00843992 ; [Research Report] RR-8324, INRIA. 2013, pp.36.

Schlagwörter: monotonic convergence, Resilience, linear Krylov solvers, linear and least-square interpolation, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.4: Parallel and vector implementations, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [MATH.MATH-NA]Mathematics [math]/Numerical Analysis [math.NA], [INFO.INFO-DC]Computer Science [cs]/Distributed, Parallel, and Cluster Computing [cs.DC]

Relation: Report N°: RR-8324; hal-00843992; https://hal.inria.fr/hal-00843992; https://hal.inria.fr/hal-00843992/document; https://hal.inria.fr/hal-00843992/file/RR-8324.pdf

Verfügbarkeit: https://hal.inria.fr/hal-00843992
https://hal.inria.fr/hal-00843992/document
https://hal.inria.fr/hal-00843992/file/RR-8324.pdf

Robust and Efficient Delaunay triangulations of points on or close to a sphere

Autoren: Caroli, Manuel Machado Manhães de Castro, Pedro Loriot, Sebastien et al.

Weitere Verfasser: Caroli, Manuel Machado Manhães de Castro, Pedro Loriot, Sebastien et al.

Quelle: https://inria.hal.science/inria-00405478 ; [Research Report] RR-7004, INRIA. 2009.

Schlagwörter: Computational Geometry, Delaunay Triangulation, Voronoi Diagram, Sphere, Space of Circles, Exact Geometric Computing, CGAL, ACM: D.: Software/D.2: SOFTWARE ENGINEERING/D.2.13: Reusable Software/D.2.13.1: Reusable libraries, ACM: F.: Theory of Computation/F.2: ANALYSIS OF ALGORITHMS AND PROBLEM COMPLEXITY/F.2.2: Nonnumerical Algorithms and Problems/F.2.2.2: Geometrical problems and computations, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: I.: Computing Methodologies/I.3: COMPUTER GRAPHICS/I.3.5: Computational Geometry and Object Modeling/I.3.5.3: Geometric algorithms, languages, and systems, [INFO.INFO-CG]Computer Science [cs]/Computational Geometry [cs.CG]

Verfügbarkeit: https://inria.hal.science/inria-00405478
https://inria.hal.science/inria-00405478v4/document
https://inria.hal.science/inria-00405478v4/file/RR-7004.pdf

Robust and Efficient Delaunay triangulations of points on or close to a sphere

Autoren: Caroli, Manuel Machado Manhães de Castro, Pedro Loriot, Sebastien et al.

Weitere Verfasser: Caroli, Manuel Machado Manhães de Castro, Pedro Loriot, Sebastien et al.

Quelle: https://inria.hal.science/inria-00405478 ; [Research Report] RR-7004, INRIA. 2009.

Schlagwörter: Computational Geometry, Delaunay Triangulation, Voronoi Diagram, Sphere, Space of Circles, Exact Geometric Computing, CGAL, ACM: D.: Software/D.2: SOFTWARE ENGINEERING/D.2.13: Reusable Software/D.2.13.1: Reusable libraries, ACM: F.: Theory of Computation/F.2: ANALYSIS OF ALGORITHMS AND PROBLEM COMPLEXITY/F.2.2: Nonnumerical Algorithms and Problems/F.2.2.2: Geometrical problems and computations, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: I.: Computing Methodologies/I.3: COMPUTER GRAPHICS/I.3.5: Computational Geometry and Object Modeling/I.3.5.3: Geometric algorithms, languages, and systems, [INFO.INFO-CG]Computer Science [cs]/Computational Geometry [cs.CG]

Verfügbarkeit: https://inria.hal.science/inria-00405478
https://inria.hal.science/inria-00405478v4/document
https://inria.hal.science/inria-00405478v4/file/RR-7004.pdf

Robust and Efficient Delaunay triangulations of points on or close to a sphere

Autoren: Caroli, Manuel Machado Manhães De Castro, Pedro Loriot, Sebastien et al.

Weitere Verfasser: Caroli, Manuel Machado Manhães De Castro, Pedro Loriot, Sebastien et al.

Quelle: https://hal.inria.fr/inria-00405478 ; [Research Report] RR-7004, INRIA. 2009.

Schlagwörter: Computational Geometry, Delaunay Triangulation, Voronoi Diagram, Sphere, Space of Circles, Exact Geometric Computing, CGAL, ACM: D.: Software/D.2: SOFTWARE ENGINEERING/D.2.13: Reusable Software/D.2.13.1: Reusable libraries, ACM: F.: Theory of Computation/F.2: ANALYSIS OF ALGORITHMS AND PROBLEM COMPLEXITY/F.2.2: Nonnumerical Algorithms and Problems/F.2.2.2: Geometrical problems and computations, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: I.: Computing Methodologies/I.3: COMPUTER GRAPHICS/I.3.5: Computational Geometry and Object Modeling/I.3.5.3: Geometric algorithms, languages, and systems, [INFO.INFO-CG]Computer Science [cs]/Computational Geometry [cs.CG]

Relation: Report N°: RR-7004; inria-00405478; https://hal.inria.fr/inria-00405478; https://hal.inria.fr/inria-00405478v4/document; https://hal.inria.fr/inria-00405478v4/file/RR-7004.pdf

Verfügbarkeit: https://hal.inria.fr/inria-00405478
https://hal.inria.fr/inria-00405478v4/document
https://hal.inria.fr/inria-00405478v4/file/RR-7004.pdf

Compensated Horner algorithm in K times the working precision

Autoren: Langlois, Philippe Louvet, Nicolas Electronique, Informatique, Automatique et Systèmes (ELIAUS) et al.

Weitere Verfasser: Langlois, Philippe Louvet, Nicolas Electronique, Informatique, Automatique et Systèmes (ELIAUS) et al.

Quelle: https://inria.hal.science/inria-00267077 ; [Research Report] 2008.

Schlagwörter: Accurate polynomial evaluation, compensated algorithms, error-free transformations, floating point arithmetic, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Verfügbarkeit: https://inria.hal.science/inria-00267077
https://inria.hal.science/inria-00267077v1/document
https://inria.hal.science/inria-00267077v1/file/LaLo07.pdf

Compensated Horner algorithm in K times the working precision

Autoren: Langlois, Philippe Louvet, Nicolas Electronique, Informatique, Automatique et Systèmes (ELIAUS) et al.

Weitere Verfasser: Langlois, Philippe Louvet, Nicolas Electronique, Informatique, Automatique et Systèmes (ELIAUS) et al.

Quelle: https://inria.hal.science/inria-00267077 ; [Research Report] 2008.

Schlagwörter: Accurate polynomial evaluation, compensated algorithms, error-free transformations, floating point arithmetic, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Verfügbarkeit: https://inria.hal.science/inria-00267077
https://inria.hal.science/inria-00267077v1/document
https://inria.hal.science/inria-00267077v1/file/LaLo07.pdf

Compensated Horner algorithm in K times the working precision

Autoren: Langlois, Philippe Louvet, Nicolas Electronique, Informatique, Automatique et Systèmes (ELIAUS) et al.

Weitere Verfasser: Langlois, Philippe Louvet, Nicolas Electronique, Informatique, Automatique et Systèmes (ELIAUS) et al.

Quelle: https://inria.hal.science/inria-00267077 ; [Research Report] 2008.

Schlagwörter: Accurate polynomial evaluation, compensated algorithms, error-free transformations, floating point arithmetic, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Verfügbarkeit: https://inria.hal.science/inria-00267077
https://inria.hal.science/inria-00267077v1/document
https://inria.hal.science/inria-00267077v1/file/LaLo07.pdf

Compensated Horner algorithm in K times the working precision

Autoren: Langlois, Philippe Louvet, Nicolas Electronique, Informatique, Automatique et Systèmes (ELIAUS) et al.

Weitere Verfasser: Langlois, Philippe Louvet, Nicolas Electronique, Informatique, Automatique et Systèmes (ELIAUS) et al.

Quelle: https://hal.inria.fr/inria-00267077 ; [Research Report] 2008.

Schlagwörter: Accurate polynomial evaluation, compensated algorithms, error-free transformations, floating point arithmetic, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Relation: inria-00267077; https://hal.inria.fr/inria-00267077; https://hal.inria.fr/inria-00267077/document; https://hal.inria.fr/inria-00267077/file/LaLo07.pdf

Verfügbarkeit: https://hal.inria.fr/inria-00267077
https://hal.inria.fr/inria-00267077/document
https://hal.inria.fr/inria-00267077/file/LaLo07.pdf

Accuracy issues in linear algebra using interval arithmetic

Autoren: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Weitere Verfasser: Nguyen, Hong Diep Revol, Nathalie Computer arithmetic (ARENAIRE) et al.

Quelle: SCAN 2010: 14th GAMM-IMACS International Symposium on Scientific Computing, Computer Arithmetic and Validated Numerics ; https://inria.hal.science/inria-00544805 ; SCAN 2010: 14th GAMM-IMACS International Symposium on Scientific Computing, Computer Arithmetic and Validated Numerics, Revol, Nathalie and de Dinechin, Florent and Jeannerod, Claude-Pierre and Lefèvre, Vincent and Louvet, Nicolas and Morin, Sèverine and Nguyen, Hong Diep, Sep 2010, Lyon, France

Schlagwörter: iterative refinement, accuracy, certification, interval matrix multiplication, computing precision, efficiency, ACM: G.: Mathematics of Computing/G.4: MATHEMATICAL SOFTWARE/G.4.6: Reliability and robustness, ACM: G.: Mathematics of Computing/G.1: NUMERICAL ANALYSIS/G.1.3: Numerical Linear Algebra, [INFO.INFO-AO]Computer Science [cs]/Computer Arithmetic

Geographisches Schlagwort: Lyon, France

Verfügbarkeit: https://inria.hal.science/inria-00544805