正交约束优化的改进最陡下降和牛顿算法。第一部分复杂的Stiefel歧管

Proceedings of the Sixth International Symposium on Signal Processing and its Applications (Cat.No.01EX467) Pub Date : 1900-01-01 DOI:10.1109/ISSPA.2001.949780

J. Manton

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引用次数: 10

摘要

经典的最陡下降和牛顿算法可用于最小化成本函数f(X)。本文给出了如何将它们加以修改，以考虑复值矩阵X的列相互正交且具有单位范数的约束。该算法是通过将约束优化问题转化为Stiefel流形上的无约束优化问题而导出的。这大大减少了优化问题的维度，通常会导致更快的收敛。

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Modified steepest descent and Newton algorithms for orthogonally constrained optimisation. Part I. The complex Stiefel manifold

The classical steepest descent and Newton algorithms can be used to minimise a cost function f(X). This paper shows how they can be modified to take into account the constraint that the columns of the complex-valued matrix X are mutually orthogonal and have unit norm. The algorithms are derived by converting the constrained optimisation problem into an unconstrained one on the Stiefel manifold. This significantly reduces the dimension of the optimisation problem and often results in faster convergence.

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Proceedings of the Sixth International Symposium on Signal Processing and its Applications (Cat.No.01EX467)

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