Fast convergence to non-isolated minima: four equivalent conditions for $${\textrm{C}^{2}}$$ functions

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Quentin Rebjock, Nicolas Boumal
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引用次数: 0

Abstract

Optimization algorithms can see their local convergence rates deteriorate when the Hessian at the optimum is singular. These singularities are inescapable when the optima are non-isolated. Yet, under the right circumstances, several algorithms preserve their favorable rates even when optima form a continuum (e.g., due to over-parameterization). This has been explained under various structural assumptions, including the Polyak–Łojasiewicz condition, Quadratic Growth and the Error Bound. We show that, for cost functions which are twice continuously differentiable (\(\textrm{C}^2\)), those three (local) properties are equivalent. Moreover, we show they are equivalent to the Morse–Bott property, that is, local minima form differentiable submanifolds, and the Hessian of the cost function is positive definite along its normal directions. We leverage this insight to improve local convergence guarantees for safe-guarded Newton-type methods under any (hence all) of the above assumptions. First, for adaptive cubic regularization, we secure quadratic convergence even with inexact subproblem solvers. Second, for trust-region methods, we argue capture can fail with an exact subproblem solver, then proceed to show linear convergence with an inexact one (Cauchy steps).

Abstract Image

非孤立极小值的快速收敛:$${textrm{C}^{2}}$函数的四个等价条件
当最优点的 Hessian 出现奇异值时,优化算法的局部收敛速度就会下降。当最优点不孤立时,这些奇异性是不可避免的。然而,在适当的情况下,有几种算法即使在最优点形成连续体时也能保持良好的收敛率(例如,由于过度参数化)。这在各种结构假设下都有解释,包括 Polyak-Łojasiewicz 条件、二次增长和误差约束。我们证明,对于两次连续可微(\(\textrm{C}^2\))的成本函数,这三个(局部)属性是等价的。此外,我们还证明了它们等同于莫尔斯-波特(Morse-Bott)性质,即局部极小值形成可微分的子曲面,成本函数的赫塞斯沿其法线方向是正定的。我们利用这一洞察力,改进了在上述任何(也包括所有)假设条件下的安全牛顿型方法的局部收敛保证。首先,对于自适应立方正则化,即使使用不精确的子问题求解器,我们也能确保二次收敛。其次,对于信任区域方法,我们认为使用精确子问题求解器可以捕获失败,然后继续证明使用非精确求解器(考奇步)可以线性收敛。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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