论文信息 - Trust region dogleg path algorithms for unconstrained minimization

Trust region dogleg path algorithms for unconstrained minimization

In this paper, we propose a class of convenient curvilinear search algorithms to solve trust region problems arising from unconstrained optimization. The curvilinear paths we set are dogleg paths, generated mainly by employing Bunch‐Parlett factorization for general symmetric matrices which may be indefinite. These algorithms are easy to use and globally convergent. It is proved that these algorithms satisfy the first‐ and second‐order stationary point convergence properties and that the convergence rate is quadratic under commonly used conditions.

Chengxian Xu | Jianzhong Zhang

[1] Â Jean-Paul Bulteau,et al. Curvilinear path and trust region in unconstrained optimization: a convergence analysis , 1987 .

[2] J. Bunch,et al. Decomposition of a symmetric matrix , 1976 .

[3] J. Bunch,et al. Direct Methods for Solving Symmetric Indefinite Systems of Linear Equations , 1971 .

[4] Chengxian Xu,et al. A Class of Indefinite Dogleg Path Methods for Unconstrained Minimization , 1999, SIAM J. Optim..

[5] S. Nash. Newton-Type Minimization via the Lanczos Method , 1984 .

[6] J. Dennis,et al. Two new unconstrained optimization algorithms which use function and gradient values , 1979 .

[7] J. Vial,et al. A restricted trust region algorithm for unconstrained optimization , 1985 .

[8] Jorge J. Moré,et al. Testing Unconstrained Optimization Software , 1981, TOMS.

[9] Richard H. Byrd,et al. Approximate solution of the trust region problem by minimization over two-dimensional subspaces , 1988, Math. Program..

[10] Richard H. Byrd,et al. A Family of Trust Region Based Algorithms for Unconstrained Minimization with Strong Global Convergence Properties. , 1985 .