中文

Newton methods beyond Hessian Lipschitz continuity: A nonlinear preconditioning approach

最优化与控制 2026-05-14 v1

摘要

Newton-type methods are typically analyzed under Lipschitz continuity of the Hessian, an assumption that can fail for objectives with higher-order or polynomial growth. We introduce a class of nonlinearly preconditioned Newton methods that apply Newton's root-finding scheme to a transformed optimality mapping, thereby extending recent nonlinear preconditioning ideas from first-order methods to the second-order setting. The resulting methods are naturally analyzed under Lipschitz continuity of a preconditioned Hessian, a condition that significantly relaxes the classical Hessian Lipschitz continuity assumption. Under this generalized smoothness model, we establish local superlinear and quadratic convergence guarantees, and develop a globalization strategy for the nonregularized method despite the fact that the preconditioned Newton direction need not be a descent direction. We further propose a regularized variant for isotropic preconditioners, and show that it attains an O(ε3/2)O(\varepsilon^{-3/2}) iteration complexity. An adaptive version removes the need to know the smoothness constant and allows inexact subproblem solutions while preserving the same complexity order.

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引用

@article{arxiv.2605.12666,
  title  = {Newton methods beyond Hessian Lipschitz continuity: A nonlinear preconditioning approach},
  author = {Alexander Bodard and Panagiotis Patrinos},
  journal= {arXiv preprint arXiv:2605.12666},
  year   = {2026}
}