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Bregman primal–dual first-order method and application to sparse semidefinite programming

Xin Jiang () and Lieven Vandenberghe ()
Additional contact information
Xin Jiang: Electrical and Computer Engineering, UCLA
Lieven Vandenberghe: Electrical and Computer Engineering, UCLA

Computational Optimization and Applications, 2022, vol. 81, issue 1, No 5, 127-159

Abstract: Abstract We present a new variant of the Chambolle–Pock primal–dual algorithm with Bregman distances, analyze its convergence, and apply it to the centering problem in sparse semidefinite programming. The novelty in the method is a line search procedure for selecting suitable step sizes. The line search obviates the need for estimating the norm of the constraint matrix and the strong convexity constant of the Bregman kernel. As an application, we discuss the centering problem in large-scale semidefinite programming with sparse coefficient matrices. The logarithmic barrier function for the cone of positive semidefinite completable sparse matrices is used as the distance-generating kernel. For this distance, the complexity of evaluating the Bregman proximal operator is shown to be roughly proportional to the cost of a sparse Cholesky factorization. This is much cheaper than the standard proximal operator with Euclidean distances, which requires an eigenvalue decomposition.

Keywords: Primal–dual algorithm; First-order algorithm; Semidefinite programming; Bregman divergence (search for similar items in EconPapers)
Date: 2022
References: View references in EconPapers View complete reference list from CitEc
Citations: View citations in EconPapers (1)

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DOI: 10.1007/s10589-021-00339-7

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