论文信息 - Two conjectures on the admissibility of control operators

Two conjectures on the admissibility of control operators

We are searching for necessary and/or sufficient conditions for the admissibility of unbounded control operators for semigroups on Hilbert spaces, with respect to input functions of class L 2. Our first conjecture is that admissibility of an unbounded input element 6 for a semigroup with generator A is equivalent to a certain decay rate of ∥(sI - A)-1 b∥ as Re s → ∞. The second conjecture states that a control operator B defined on a Hilbert space U is admissible if and only if, for any v ∈ U, Bv is an admissible input element. It is proved that both conjectures hold in many important particular cases (e.g., the first conjecture is true if the semigroup is normal).

George Weiss

[1] Paul L. Butzer,et al. Semi-groups of operators and approximation , 1967 .

[2] Scott W. Hansen,et al. The operator Carleson measure criterion for admissibility of control operators for diagonal semigroups on 1 2 , 1991 .

[3] George Weiss,et al. Admissible observation operators for linear semigroups , 1989 .

[4] H. Triebel. Interpolation Theory, Function Spaces, Differential Operators , 1978 .

[5] Amnon Pazy,et al. Semigroups of Linear Operators and Applications to Partial Differential Equations , 1992, Applied Mathematical Sciences.

[6] George Weiss. Admissibility in input elements for diagonal semigroups on l 2 , 1988 .

[7] George Weiss,et al. Admissibility of unbounded control operators , 1989 .

[8] D. Salamon. Infinite Dimensional Linear Systems with Unbounded Control and Observation: A Functional Analytic Approach. , 1987 .

[9] D. L. Russell,et al. Admissible Input Elements for Systems in Hilbert Space and a Carleson Measure Criterion , 1983 .

[10] J. Lions. Optimal Control of Systems Governed by Partial Differential Equations , 1971 .

[11] James Rovnyak,et al. Hardy classes and operator theory , 1985 .