Equivalent Conditions on Periodic Feedback Stabilization for Linear Periodic Evolution Equations
Abstract
This paper studies the periodic feedback stabilization for a class of linear -periodic evolution equations.Several equivalent conditions on the linear periodic feedback stabilization are obtained. These conditions are related with the following subjects: the attainable subspace of the controlled evolution equation under consideration; the unstable subspace (of the evolution equation with the null control) provided by the Kato projection; the Poincar map associated with the evolution equation with the null control; and two unique continuation properties for the dual equations on different time horizons and (where is the sum of algebraic multiplicities of distinct unstable eigenvalues of the Poincar map). It is also proved that a -periodic controlled evolution equation is linear -periodic feedback sabilizable if and only if it is linear -periodic feedback sabilizable with respect to a finite dimensional subspace. Some applications to heat equations with time-periodic potentials are presented.
Cite
@article{arxiv.1305.1711,
title = {Equivalent Conditions on Periodic Feedback Stabilization for Linear Periodic Evolution Equations},
author = {Gengsheng Wang and Yashan Xu},
journal= {arXiv preprint arXiv:1305.1711},
year = {2013}
}
Comments
40 pages