This content is not included in
your SAE MOBILUS subscription, or you are not logged in.
The Compatibility of Methods of Modeling Systems of Continuous Interaction Processes
Annotation ability available
Sector:
Language:
English
Abstract
Large-scale physical system development endeavors which employ advanced systems methods require close technical/scientific interaction among a diverse group of mathematical modeling practitioners. A number of highly rigorous, highly rigid methods are available for the “book-keeping” necessary for valid mathematical modeling of systems of power exchanging “continuous” physical processes. Each method is attractive for one or more specialized physical scenarios, but none has become universally accepted because all are awkward in one or more important circumstances. In this paper, a means of incorporating all these representations (including ad hoc representations) into a single system representation is presented.
Authors
Citation
Blackwell, C., "The Compatibility of Methods of Modeling Systems of Continuous Interaction Processes," SAE Technical Paper 981726, 1998, https://doi.org/10.4271/981726.Also In
References
- Trent, H. 1955 Isomorphisms between oriented linear graphs and lumped physical systems J. Acoust. Soc. Am. 500 527
- Kron, G. 1959 Tensors for circuits Dover Publications New York
- Paynter, H. 1961 Analysis and design of engineering systems M. I. T. Press Cambridge, Massachusetts, USA
- Brewer, J. 1974 Control systems analysis, design, and simulation Prentice-Hall, Inc. Englewood Cliffs, New Jersey, USA
- Shearer, J. Murphy A. Richardson H. 1971 Introduction to system dynamics Addison-Wesley Publishing Company Reading, Massachusetts
- Karnopp, D. Rosenberg R. 1975 System dynamics: a unified approach John Wiley and Sons New York
- Woods, R. Lawrence K. 1997 Modeling and simulation of dynamic systems Prentice-Hall, Inc. Englewood Cliffs, New Jersey, USA
- Keonig, H. Blackwell W. 1961 Electromechanical system theory McGraw-Hill Book Company New York
- Blackwell, C. C. 1986 On generating state space equations of a linear constant coefficient system J. Opt. Thy. and Applic 49 1 65 79