Field optimization using the calculus of stationary points

Field optimization using the calculus of stationary points

The calculus of stationary points or indirect optimization is noted for rapid speed. It's speed is realized in an analytical representation of the Hessian and a polynomial fit of both the objective function and the constraints. Constraints are treated as active using Lagrangian multipliers. Bec...

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Veröffentlicht in:IEEE transactions on magnetics 1999-05, Vol.35 (3), p.1718-1721
1. Verfasser: Davey, K.R.
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Applied classical electromagnetism
Calculus
Constraint optimization
Electromagnetism
electron and ion optics
Exact sciences and technology
Finite element methods
Fundamental areas of phenomenology (including applications)
Fuzzy logic
Inverse problems
Lagrangian functions
Magnetic levitation
Magnetostatics
magnetic shielding, magnetic induction, boundary-value problems
Mathematical analysis
Multipliers
Neural networks
Optimization
Physics
Polynomials
Reflection
Representations
Wells
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Beschreibung
Zusammenfassung:The calculus of stationary points or indirect optimization is noted for rapid speed. It's speed is realized in an analytical representation of the Hessian and a polynomial fit of both the objective function and the constraints. Constraints are treated as active using Lagrangian multipliers. Because the algorithm's speed is so rapid, the problem can be repeated multiple times with random starting guesses to circumvent the possibility of encountering local wells. Both an analytic and an actual field problem are considered by way of providing examples of the technique.
ISSN:0018-9464
1941-0069
DOI:10.1109/20.767359