A primal-dual online framework updates policies from closed-loop data for SDP-based control synthesis in linear discrete-time systems, with local linear tracking and global ergodic convergence guarantees under persistency of excitation and slow data variation.
Local Linear Convergence of the Alternating Direction Method of Multipliers for Semidefinite Programming under Strict Complementarity
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
We investigate the local linear convergence properties of the Alternating Direction Method of Multipliers (ADMM) when applied to Semidefinite Programming (SDP). A longstanding belief suggests that ADMM is only capable of solving SDPs to moderate accuracy, primarily due to its sublinear worst-case complexity and empirical observations of slow convergence. We challenge this notion by introducing a new sufficient condition for local linear convergence: as long as the converged primal-dual optimal solutions satisfy strict complementarity, ADMM attains local linear convergence, independent of nondegeneracy conditions. Our proof is based on a direct local linearization of the ADMM operator and a refined error bound for the projection onto the positive semidefinite cone, improving previous bounds and revealing the anisotropic nature of projection residuals. Extensive numerical experiments confirm the significance of our theoretical results, demonstrating that ADMM achieves local linear convergence and computes high-accuracy solutions in a variety of SDP instances, including those cases where nondegeneracy fails. Furthermore, we identify where ADMM struggles, linking these difficulties with near violations of strict complementarity-a phenomenon that parallels recent findings in linear programming.
fields
eess.SY 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
citing papers explorer
-
A Data-Enabled Primal-Dual Approach for Policy Learning with SDP Formulations
A primal-dual online framework updates policies from closed-loop data for SDP-based control synthesis in linear discrete-time systems, with local linear tracking and global ergodic convergence guarantees under persistency of excitation and slow data variation.