Global and superlinear convergence of a class of variable metric methods
- 1 January 1981
- book chapter
- Published by Springer Nature
- p. 178-205
- https://doi.org/10.1007/bfb0120928
Abstract
No abstract availableKeywords
This publication has 15 references indexed in Scilit:
- Practical convergence conditions for the Davidon-Fletcher-Powell methodMathematical Programming, 1975
- On the Local and Superlinear Convergence of Quasi-Newton MethodsIMA Journal of Applied Mathematics, 1973
- Variable metric algorithms: Necessary and sufficient conditions for identical behavior of nonquadratic functionsJournal of Optimization Theory and Applications, 1972
- Unified approach to quadratically convergent algorithms for function minimizationJournal of Optimization Theory and Applications, 1970
- The Convergence of a Class of Double-rank Minimization Algorithms 1. General ConsiderationsIMA Journal of Applied Mathematics, 1970
- A new approach to variable metric algorithmsThe Computer Journal, 1970
- A Family of Variable-Metric Methods Derived by Variational MeansMathematics of Computation, 1970
- Quasi-Newton Methods and their Application to Function MinimisationMathematics of Computation, 1967
- A Rapidly Convergent Descent Method for MinimizationThe Computer Journal, 1963
- VARIABLE METRIC METHOD FOR MINIMIZATIONPublished by Office of Scientific and Technical Information (OSTI) ,1959