TY - BOOK
AU - Wang,Dongming
ED - SpringerLink (Online service)
TI - Automated Deduction in Geometry: International Workshop on Automated Deduction in Geometry Toulouse, France, September 27–29, 1996 Selected Papers
T2 - Lecture Notes in Computer Science, Lecture Notes in Artificial Intelligence,
SN - 9783540697176
AV - QA75.5-76.95
U1 - 004.0151 23
PY - 1997///
CY - Berlin, Heidelberg
PB - Springer Berlin Heidelberg
KW - Computer science
KW - Programming languages (Electronic computers)
KW - Computers
KW - Mathematical logic
KW - Artificial intelligence
KW - Computer graphics
KW - Algorithms
KW - Computer Science
KW - Theory of Computation
KW - Programming Languages, Compilers, Interpreters
KW - Artificial Intelligence (incl. Robotics)
KW - Mathematical Logic and Formal Languages
KW - Computer Graphics
N1 - Automated geometric reasoning: Dixon resultants, Gröbner bases, and characteristic sets -- Extended Dixon's resultant and its applications -- Computational geometry problems in REDLOG -- Probabilistic verification of elementary geometry statements -- Computational synthetic geometry with Clifford algebra -- Clifford algebraic calculus for geometric reasoning -- Area in Grassmann geometry -- Automated production of readable proofs for theorems in non-Euclidean geometries -- Points on algebraic curves and the parametrization problem -- Flat central configurations of four planet motions -- Integration of reasoning and algebraic calculus in geometry
N2 - This book constitutes the thoroughly refereed and revised post-workshop proceedings of the International Workshop on Automated Deduction in Geometry, held in Toulouse, France, in September 1996. The revised extended papers accepted for inclusion in the volume were selected on the basis of double reviewing. Among the topics covered are automated geometric reasoning and the deduction applied to Dixon resultants, Gröbner bases, characteristic sets, computational geometry, algebraic geometry, and planet motion; furthermore the system REDLOG is demonstrated and the verification of geometric statements as well as the automated production of proof in Euclidean Geometry are present
UR - http://dx.doi.org/10.1007/BFb0022715
ER -