Title :
Computing the L∞[0, h)-induced norm of a compression operator
Author :
Jung Hoon Kim ; Hagiwara, Tomomichi
Author_Institution :
Dept. of Electr. Eng., Kyoto Univ., Katsura, Japan
Abstract :
This paper is concerned with the computation of the induced norm of a compression operator defined on the Banach space L∞[0, h), which is a difficult problem because it is an infinite-rank operator. This paper provides two methods for this problem, each of which can compute an upper bound and a lower bound of the induced norm by using an idea of staircase or piecewise linear approximation. Another key idea in both methods is to apply fast-lifting by which the interval [0, h) is divided into M subintervals with equal width, and the computation errors in these methods are ensured to be reciprocally proportional to M or M2. The effectiveness of the proposed methods is demonstrated through a numerical example.
Keywords :
Banach spaces; approximation theory; delays; mathematical operators; piecewise linear techniques; sampled data systems; Banach space; L∞[0, h)-induced norm; compression operator; computation errors; fast-lifting method; infinite-rank operator; lower bound; piecewise linear approximation; sampled-data system; staircase approximation; time-delay systems; upper bound; Convergence; Delays; Linear approximation; MIMO; Piecewise linear approximation; Upper bound;
Conference_Titel :
Control Conference (ECC), 2013 European
Conference_Location :
Zurich
