Newton and interior-point methods for (constrained) nonconvex–nonconcave minmax optimization with stability and instability guarantees

IF 1.8 4区 计算机科学 Q3 AUTOMATION & CONTROL SYSTEMS Mathematics of Control Signals and Systems Pub Date : 2023-10-10 DOI:10.1007/s00498-023-00371-4
Raphael Chinchilla, Guosong Yang, João P. Hespanha
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Abstract

Abstract We address the problem of finding a local solution to a nonconvex–nonconcave minmax optimization using Newton type methods, including primal-dual interior-point ones. The first step in our approach is to analyze the local convergence properties of Newton’s method in nonconvex minimization. It is well established that Newton’s method iterations are attracted to any point with a zero gradient, irrespective of it being a local minimum. From a dynamical system standpoint, this occurs because every point for which the gradient is zero is a locally asymptotically stable equilibrium point. We show that by adding a multiple of the identity such that the Hessian matrix is always positive definite, we can ensure that every non-local-minimum equilibrium point becomes unstable (meaning that the iterations are no longer attracted to such points), while local minima remain locally asymptotically stable. Building on this foundation, we develop Newton-type algorithms for minmax optimization, conceptualized as a sequence of local quadratic approximations for the minmax problem. Using a local quadratic approximation serves as a surrogate for guiding the modified Newton’s method toward a solution. For these local quadratic approximations to be well-defined, it is necessary to modify the Hessian matrix by adding a diagonal matrix. We demonstrate that, for an appropriate choice of this diagonal matrix, we can guarantee the instability of every non-local-minmax equilibrium point while maintaining stability for local minmax points. Using numerical examples, we illustrate the importance of guaranteeing the instability property. While our results are about local convergence, the numerical examples also indicate that our algorithm enjoys good global convergence properties.

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具有稳定性和不稳定性保证的(约束)非凸非凹极小极大优化问题的牛顿和内点法
摘要利用牛顿型方法求解非凸非凹极小极大优化问题的局部解,包括原始-对偶内点方法。我们方法的第一步是分析牛顿法在非凸极小化中的局部收敛性。牛顿法的迭代被吸引到任何一个梯度为零的点,而不管它是否是局部最小值。从动力系统的观点来看,这是因为梯度为零的每个点都是一个局部渐近稳定的平衡点。我们证明,通过增加单位矩阵的倍数,使得Hessian矩阵总是正定的,我们可以确保每个非局部最小平衡点变得不稳定(意味着迭代不再吸引到这样的点),而局部最小值保持局部渐近稳定。在此基础上,我们开发了newton型算法用于最小最大优化,概念化为最小最大问题的局部二次逼近序列。使用局部二次逼近作为指导改进的牛顿法求解的替代。为了使这些局部二次逼近定义良好,必须通过添加对角矩阵来修改Hessian矩阵。我们证明,对于该对角矩阵的适当选择,我们可以保证每个非局部极小极大平衡点的不稳定性,同时保持局部极小极大点的稳定性。通过数值算例说明了保证不稳定性的重要性。虽然我们的结果是局部收敛的,但数值算例也表明我们的算法具有良好的全局收敛性。
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来源期刊
Mathematics of Control Signals and Systems
Mathematics of Control Signals and Systems 工程技术-工程:电子与电气
CiteScore
2.90
自引率
0.00%
发文量
18
审稿时长
>12 weeks
期刊介绍: Mathematics of Control, Signals, and Systems (MCSS) is an international journal devoted to mathematical control and system theory, including system theoretic aspects of signal processing. Its unique feature is its focus on mathematical system theory; it concentrates on the mathematical theory of systems with inputs and/or outputs and dynamics that are typically described by deterministic or stochastic ordinary or partial differential equations, differential algebraic equations or difference equations. Potential topics include, but are not limited to controllability, observability, and realization theory, stability theory of nonlinear systems, system identification, mathematical aspects of switched, hybrid, networked, and stochastic systems, and system theoretic aspects of optimal control and other controller design techniques. Application oriented papers are welcome if they contain a significant theoretical contribution.
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