Abstract :
This paper studies autonomous, single-input, single-output linear control systems on finite time intervals. The object of interest
is the output operator O, which associates to each input function and initial state vector the corresponding system output. Main
result: If the system has relative degree r <∞, then for any “admissible” Banach space U of inputs, O is a bounded operator
taking U ×Cn onto the “Sobolev space” of complex functions f ∈ C(r−1)([0,T ]) for which the (r − 1)-order derivative f (r−1)
is absolutely continuous, with f (r) ∈ U . This completes recent results of Jönsson and Martin [Ulf Jönsson, Clyde Martin, Approximation
with the output of linear control systems, J. Math. Anal. Appl. 329 (2007) 798–821] who showed that if the system is
minimal and U is either L2([0,T ]) or C([0,T ]), then O:U ×Cn→U has dense range.
© 2007 Elsevier Inc. All rights reserved.
