论文信息 - Least-Change Sparse Secant Update Methods with Inaccurate Secant Conditions

Least-Change Sparse Secant Update Methods with Inaccurate Secant Conditions

We investigate the role of the secant or quasi-Newton condition in the sparse Broyden or Schubert update method for solving systems of nonlinear equations whose Jacobians are either sparse, or can be approximated acceptably by conveniently sparse matrices. We develop a theory on perturbations to the secant equation that will still allow a proof of local q-linear convergence. To illustrate the theory, we show how to generalize the standard secant condition to the case when the function difference is contaminated by noise.

Homer F. Walker | John E. Dennis | H. Walker | J. Dennis

[1] H. Walker,et al. Inaccuracy in quasi-Newton methods: Local improvement theorems , 1984 .

[2] H. Walker,et al. Convergence Theorems for Least-Change Secant Update Methods, , 1981 .

[3] John E. Dennis,et al. Numerical methods for unconstrained optimization and nonlinear equations , 1983, Prentice Hall series in computational mathematics.

[4] Jorge J. Moré,et al. User Guide for Minpack-1 , 1980 .

[5] C. G. Broyden,et al. The convergence of an algorithm for solving sparse nonlinear systems , 1971 .

[6] C. G. Broyden. A Class of Methods for Solving Nonlinear Simultaneous Equations , 1965 .

[7] E. Marwil,et al. Convergence Results for Schubert’s Method for Solving Sparse Nonlinear Equations , 1979 .

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

[9] T. Ypma. The Effect of Rounding Errors on Newton-like Methods , 1983 .

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

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

[12] James M. Ortega,et al. Iterative solution of nonlinear equations in several variables , 2014, Computer science and applied mathematics.