A probabilistic analytic center cutting plane method for feasibility of uncertain LMIs

13 years 4 months ago

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ust control problems can be formulated in abstract form as convex feasibility programs, where one seeks a solution x that satisﬁes a set of inequalities of the form F . = {f (x, ) 0, ∈ D}. This set typically contains an inﬁnite and uncountable number of inequalities, and it has been proved that the related robust feasibility problem is numerically hard to solve in general. In this paper, we discuss a family of cutting plane methods that solve efﬁciently a probabilistically relaxed version of the problem. Speciﬁcally, under suitable hypotheses, we show that an Analytic Center Cutting Plane scheme based on a probabilistic oracle returns in a ﬁnite and prespeciﬁed number of iterations a solution x which is feasible for most of the members of F, except possibly for a subset having arbitrarily small probability measure. ᭧ 2007 Elsevier Ltd. All rights reserved.

Giuseppe C. Calafiore, Fabrizio Dabbene

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