Integrating Symbolic Mathematical Computation and Artificial Intelligence
Second International Conference, AISMC-2, Cambridge, United Kingdom, August 3-5, 1994. Selected Papers
Published on 10. August 1995
Book
Paperback/Softback
XI, 281 pages
978-3-540-60156-2 (ISBN)
Description
This volume contains thoroughly revised full versions of the best papers presented at the Second International Conference on Artificial Intelligence and Sympolic Mathematical Computation, held in Cambridge, UK in August 1994.
The 19 papers included give clear evidence that now, after a quite long period when AI and mathematics appeared to have arranged an amicable separation, these fields are growing together again as an area of fruitful interdisciplinary activities. This book explores the interaction between mathematical computation and clears the ground for future concentration on topics that can further unify the field.
The 19 papers included give clear evidence that now, after a quite long period when AI and mathematics appeared to have arranged an amicable separation, these fields are growing together again as an area of fruitful interdisciplinary activities. This book explores the interaction between mathematical computation and clears the ground for future concentration on topics that can further unify the field.
More details
Series
Edition
1995 ed.
Language
English
Place of publication
Berlin
Germany
Publishing group
Springer Berlin
Target group
Professional and scholarly
Research
Illustrations
XI, 281 p.
Dimensions
Height: 235 mm
Width: 155 mm
Thickness: 16 mm
Weight
446 gr
ISBN-13
978-3-540-60156-2 (9783540601562)
DOI
10.1007/3-540-60156-2
Schweitzer Classification
Content
Interactive theorem proving and computer algebra.- A practical algorithm for geometric theorem proving.- Combining theorem proving and symbolic mathematical computing.- Tools for solving problems in the scope of algebraic programming.- Planning a proof of the intermediate value theorem.- A general technique for automatically optimizing programs through the use of proof plans.- Datalog and TwoGroups and C++.- Linear logic and real closed fields: A way to handle situations dynamically.- A proof environment for arithmetic with the omega rule.- Using commutativity properties for controlling coercions.- Theories = signatures + propositions used as types.- The ideal structure of Gröbner base computations.- Modeling cooperating agents scenarios by deductive planning methods and logical fiberings.- Propagation of mathematical constraints in subdefinite models.- Combining computer algebra and rule based reasoning.- Algebraic specification of empirical inductive learning methods based on rough sets and matroid theory.- Subsymbolic processing using adaptive algorithms.- An interpretation of the propositional Boolean algebra as a k-algebra. Effective calculus.- Subdefinite computations and symbolic transformations in the uniCalc solver.