Journal article
Derivation of the Brayton–Moser equations from a topological mixed potential function
Journal of the Franklin Institute, v 310(4), pp 259-269
1980
Abstract
A topological mixed potential function, P
*
T, is defined and shown to be an exact differential. From P
*
T, the Brayton-Moser equations are obtained from topological relationships of the network and the constitutive relationships of the elements. A relationship between P
*
T and Brayton-Moser's mixed potential function, Q, is developed.
Metrics
Details
- Title
- Derivation of the Brayton–Moser equations from a topological mixed potential function
- Creators
- F.M. Massimo - Drexel UniversityH.G. Kwatny - Drexel UniversityL.Y. Bahar - Drexel UniversityDrexel Univ., Philadelphia, PA
- Publication Details
- Journal of the Franklin Institute, v 310(4), pp 259-269
- Publisher
- Elsevier
- Resource Type
- Journal article
- Language
- English
- Academic Unit
- [Retired Faculty]; Mechanical Engineering and Mechanics
- Web of Science ID
- WOS:A1980KX29800006
- Scopus ID
- 2-s2.0-85008537395
- Other Identifier
- 991019174729104721
InCites Highlights
Data related to this publication, from InCites Benchmarking & Analytics tool:
- Web of Science research areas
- Automation & Control Systems
- Engineering, Electrical & Electronic
- Engineering, Multidisciplinary
- Mathematics, Interdisciplinary Applications