论文信息 - Spectral boundary controllability of networks of strings

Spectral boundary controllability of networks of strings

Abstract In this Note we give a necessary and sufficient condition for the spectral controllability from one simple node of a general network of strings that undergoes transversal vibrations in a sufficiently large time. This condition asserts that no eigenfunction vanishes identically on the string that contains the controlled node. The proof combines the Beurling–Malliavin's theorem and an asymptotic formula for the eigenvalues of the network. The optimal control time may be characterized as twice the sum of the lengths of all the strings of the network. To cite this article: R. Dager, E. Zuazua, C. R. Acad. Sci. Paris, Ser. I 334 (2002) 545–550.

Enrique Zuazua | René Dáger

[1] Marius Tucsnak,et al. SIMULTANEOUS CONTROLLABILITY IN SHARP TIME FOR TWO ELASTIC STRINGS , 2001 .

[2] C. Baiocchi,et al. Ingham-Beurling type theorems with weakened gap conditions , 2002 .

[3] Enrique Zuazua Iriondo,et al. Controllability of star-shaped networks of strings , 2001 .

[4] William Moran,et al. Simultaneous control problems for systems of elastic strings and beams , 2001, Syst. Control. Lett..

[5] Enrique Zuazua,et al. Controllability of tree-shaped networks of vibrating strings , 2001 .

[6] Stéphane Jaffard,et al. Pointwise and spectral control of plate vibrations. , 1991 .

[7] D. L. Russell. Review: J.-L. Lions, Controlabilité Exacte, Perturbations et Stabilisation de Systèmes Distribués , 1990 .