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arxiv: 2312.15722 · v1 · pith:HSV5KNUL · submitted 2023-12-25 · eess.SY · cs.SY· math.OC

Frequency-Domain Identification of Discrete-Time Systems using Sum-of-Rational Optimization

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classification eess.SY cs.SYmath.OC
keywords optimizationproblemdiscrete-timefrequencyfunctionidentificationmethodmoment-sum-of-squares
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We propose a computationally tractable method for the identification of stable canonical discrete-time rational transfer function models, using frequency domain data. The problem is formulated as a global non-convex optimization problem whose objective function is the sum of weighted squared residuals at each observed frequency datapoint. Stability is enforced using a polynomial matrix inequality constraint. The problem is solved globally by a moment-sum-of-squares hierarchy of semidefinite programs through a framework for sum-of-rational-functions optimization. Convergence of the moment-sum-of-squares program is guaranteed as the bound on the degree of the sum-of-squares polynomials approaches infinity. The performance of the proposed method is demonstrated using numerical simulation examples.

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