🌙

非孤立极小值下信赖域方法的快速收敛:基于不定矩阵上共轭梯度法的分析

Fast convergence of trust-regions for non-isolated minima via analysis of CG on indefinite matrices

Mathematical Programming · 2024
被引 1
ABS 4

中文导读

研究了在非孤立极小值(Hessian矩阵非正定)条件下,信赖域方法结合截断共轭梯度法仍能超线性收敛的理论原因,为优化算法在弱条件下的收敛性提供新工具。

Abstract

Abstract Trust-region methods (TR) can converge quadratically to minima where the Hessian is positive definite. However, if the minima are not isolated, then the Hessian there cannot be positive definite. The weaker Polyak–Łojasiewicz (PŁ) condition is compatible with non-isolated minima, and it is enough for many algorithms to preserve good local behavior. Yet, TR with an exact subproblem solver lacks even basic features such as a capture theorem under PŁ. In practice, a popular inexact subproblem solver is the truncated conjugate gradient method (tCG). Empirically, TR-tCG exhibits superlinear convergence under PŁ. We confirm this theoretically. The main mathematical obstacle is that, under PŁ, at points arbitrarily close to minima, the Hessian has vanishingly small, possibly negative eigenvalues. Thus, tCG is applied to ill-conditioned, indefinite systems. Yet, the core theory underlying tCG is that of CG, which assumes a positive definite operator. Accordingly, we develop new tools to analyze the dynamics of CG in the presence of small eigenvalues of any sign, for the regime of interest to TR-tCG.

优化理论信赖域方法共轭梯度法非凸优化