Linear optimization over homogeneous matrix cones

IF 16.3 1区 数学 Q1 MATHEMATICS
L. Tunçel, L. Vandenberghe
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引用次数: 1

Abstract

A convex cone is homogeneous if its automorphism group acts transitively on the interior of the cone. Cones that are homogeneous and self-dual are called symmetric. Conic optimization problems over symmetric cones have been extensively studied, particularly in the literature on interior-point algorithms, and as the foundation of modelling tools for convex optimization. In this paper we consider the less well-studied conic optimization problems over cones that are homogeneous but not necessarily self-dual. We start with cones of positive semidefinite symmetric matrices with a given sparsity pattern. Homogeneous cones in this class are characterized by nested block-arrow sparsity patterns, a subset of the chordal sparsity patterns. Chordal sparsity guarantees that positive define matrices in the cone have zero-fill Cholesky factorizations. The stronger properties that make the cone homogeneous guarantee that the inverse Cholesky factors have the same zero-fill pattern. We describe transitive subsets of the cone automorphism groups, and important properties of the composition of log-det barriers with the automorphisms. Next, we consider extensions to linear slices of the positive semidefinite cone, and review conditions that make such cones homogeneous. An important example is the matrix norm cone, the epigraph of a quadratic-over-linear matrix function. The properties of homogeneous sparse matrix cones are shown to extend to this more general class of homogeneous matrix cones. We then give an overview of the algebraic theory of homogeneous cones due to Vinberg and Rothaus. A fundamental consequence of this theory is that every homogeneous cone admits a spectrahedral (linear matrix inequality) representation. We conclude by discussing the role of homogeneous structure in primal–dual symmetric interior-point methods, contrasting this with the well-developed algorithms for symmetric cones that exploit the strong properties of self-scaled barriers, and with symmetric primal–dual methods for general convex cones.
齐次矩阵锥上的线性优化
凸锥是齐次的,如果它的自同构群传递作用于锥的内部。同构自对偶的圆锥称为对称圆锥。对称锥上的圆锥优化问题已经得到了广泛的研究,特别是在关于内点算法的文献中,并且是凸优化建模工具的基础。在本文中,我们考虑了在齐次但不一定是自对偶的圆锥上研究较少的圆锥优化问题。我们从具有给定稀疏性模式的半正定对称矩阵的锥开始。这一类中的同质锥的特征是嵌套的块箭头稀疏性模式,这是弦稀疏性模式的子集。弦稀疏性保证了锥中的正定义矩阵具有零填充Cholesky因子分解。使圆锥体均匀的更强特性保证了反Cholesky因子具有相同的零填充模式。我们描述了锥自同构群的传递子集,以及自同构的log-det势垒的组成的重要性质。接下来,我们考虑半正定锥的线性切片的扩展,并考察使这种锥齐次的条件。一个重要的例子是矩阵范数锥,它是线性矩阵函数上的二次型的题图。齐次稀疏矩阵锥的性质被证明扩展到这类更一般的齐次矩阵锥。然后,我们概述了由Vinberg和Rothaus提出的齐次锥的代数理论。这个理论的一个基本结果是,每个齐次锥都允许一个谱面(线性矩阵不等式)表示。最后,我们讨论了齐次结构在原对偶对称内点方法中的作用,并将其与利用自缩放屏障的强性质的对称锥的成熟算法以及一般凸锥的对称原对偶方法进行了对比。
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来源期刊
Acta Numerica
Acta Numerica MATHEMATICS-
CiteScore
26.00
自引率
0.70%
发文量
7
期刊介绍: Acta Numerica stands as the preeminent mathematics journal, ranking highest in both Impact Factor and MCQ metrics. This annual journal features a collection of review articles that showcase survey papers authored by prominent researchers in numerical analysis, scientific computing, and computational mathematics. These papers deliver comprehensive overviews of recent advances, offering state-of-the-art techniques and analyses. Encompassing the entirety of numerical analysis, the articles are crafted in an accessible style, catering to researchers at all levels and serving as valuable teaching aids for advanced instruction. The broad subject areas covered include computational methods in linear algebra, optimization, ordinary and partial differential equations, approximation theory, stochastic analysis, nonlinear dynamical systems, as well as the application of computational techniques in science and engineering. Acta Numerica also delves into the mathematical theory underpinning numerical methods, making it a versatile and authoritative resource in the field of mathematics.
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