|
|
|
|
|
|||||||
|
|
|
|
|
|||||||
|
|
ISGI 2005 International
Symposium on
|
|
Important Dates
Abstract submission deadline March 7, 2005
Notification of acceptance April 4, 2005
Paper for publication July 15, 2005
Printed Proceedings Sept, 1, 2005
Symposium Sept. 14-16, 2005
Contact Symposium Chair |
|||||||
|
|
||||||||||
|
The Symposium Scope |
|
|||||||||
|
Generalization
as one of the basic principles of scientific work is also a basic tool
for understanding our environment in all its appearances, influences and
dynamic behavior.
The interdisciplinary treatment of the topic also includes the proliferation of best practice in the special types of generalization methods and techniques in the various sciences.
The term information is to be treated in its widest sense, i.e. form a semiotic structural point of view (syntax, semantics, and pragmatics), requirements of generalization in its theoretical basis, its complex application scenarios, its use in decision making, as well as its role in information society.
Contributions are solicited not only from the mathematical fields of numerical analysis, statistics, algebra etc. but from all fields of science and could cover aspects in § Geometry, Potential, Force § Emergence of Order § Cognition, Patterns § Change and its dynamics including macroscopic effects § Characteristics of Generalization in the natural sciences, humanities, technical sciences, anthropological aspects §
Time, time structure and its
relevance to Action Structures § Behavior Representation, Complex Social Systems § Singularities (of action space) § Black and white views as a generalization principle, Contrast §
Symbolization, Categorization,
Abstraction, §
Ontology, Multiple Representations,
§ Information Mining § Dimensionality reduction, Clustering § Trend analysis
and application, Periodicity, § Uncertainty propagation in Generalization §
Continuous vs. Step-by-step
generalization § Algebraic Properties of Generalization Transforms (recursiveness, inverse properties, invariants etc.) § Generalization of dynamic 3+ - dimensional phenomena : e.g. of Movement Patterns § Context |
|