Sampling method for semidefinite programmes with non-negative Popov function constraints

Abstract: An important class of optimisation problems in control and signal processing involves the constraint that a Popov function is non-negative on the unit circle or the imaginary axis. Such a constraint is convex in the coefficients of the Popov function. It can be converted to a finite-dimensional linear matrix inequality via the Kalman-Yakubovich-Popov lemma. However, the linear matrix inequality reformulation requires an auxiliary matrix variable and often results in a very large semidefinite programming proble… Show more

“…The forms ( 103) and ( 104) are sometimes called the standard form with free variables [135]. Note that the trivial cone {0} nF appearing in (104) is the dual cone of R nF appearing in (103).…”

Semi-definite programming and quantum information

“…The forms ( 103) and ( 104) are sometimes called the standard form with free variables [135]. Note that the trivial cone {0} nF appearing in (104) is the dual cone of R nF appearing in (103).…”

Semi-definite programming and quantum information

An oracle for the discrete-time integral quadratic constraint problem

Passive Modeling of Interconnects Using Sum of Squares Partial Fraction Expansions