论文信息 - An Explicit Quasi-Newton Update for Sparse Optimization Calculations

An Explicit Quasi-Newton Update for Sparse Optimization Calculations

A new quasi-Newton updating formula for sparse optimization calculations is presented. It makes combined use of a simple strategy for fixing symmetry and a Schubert correction to the upper triangle of a permuted Hessian approximation. Interesting properties of this new update are that it is closed form and that it does not satisfy the secant condition at every iteration of the calculations. Some numerical results are given that show that this update compares favorably with the sparse PSB update and appears to have a superlinear rate of convergence.

Angelo Lucia

[1] Lenhart K. Schubert. Modification of a quasi-Newton method for nonlinear equations with a sparse Jacobian , 1970 .

[2] R. Schnabel,et al. Least Change Secant Updates for Quasi-Newton Methods , 1978 .

[3] P. Toint. On sparse and symmetric matrix updating subject to a linear equation , 1977 .

[4] D. Shanno. On variable-metric methods for sparse Hessians , 1980 .

[5] M. D. Hebden,et al. An algorithm for minimization using exact second derivatives , 1973 .

[6] J. J. Moré,et al. A Characterization of Superlinear Convergence and its Application to Quasi-Newton Methods , 1973 .

[7] G. G. Stokes. "J." , 1890, The New Yale Book of Quotations.

[8] P. Toint. Some numerical results using a sparse matrix updating formula in unconstrained optimization , 1978 .