Pole placement results for complex symmetric and Hamiltonian transfer functions

Author

Helmke, U. ; Rosenthal, J. ; Wang, X.

Author_Institution

Univ. of Wurzburg, Wurzburg

fYear

2007

fDate

12-14 Dec. 2007

Firstpage

3450

Lastpage

3453

Abstract

This paper studies the problem of pole assignment for symmetric and Hamiltonian transfer functions. A necessary and sufficient condition for pole assignment by complex symmetric output feedback transformations is given. Moreover, in the case where the McMillan degree coincides with the number of parameters appearing in the symmetric feedback transformations, we derive an explicit combinatorial formula for the number of pole assigning symmetric feedback gains. The proof uses intersection theory in projective space as well as a formula for the degree of the complex Lagrangian Grassmann manifold.

Keywords

combinatorial mathematics; feedback; pole assignment; transfer functions; Hamiltonian transfer functions; Lagrangian Grassmann manifold; McMillan degree; combinatorial formula; complex symmetric output feedback transformations; pole placement; Eigenvalues and eigenfunctions; Geometry; Lagrangian functions; Linear systems; Mathematics; Output feedback; State feedback; Sufficient conditions; Transfer functions; USA Councils; Lagrangian Grassmannian; Output feedback; Pole placement; degree of a projective variety; inverse eigenvalue problems; symmetric or Hamiltonian realizations;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 2007 46th IEEE Conference on

Conference_Location

New Orleans, LA

ISSN

0191-2216

Print_ISBN

978-1-4244-1497-0

Electronic_ISBN

0191-2216

Type

conf

DOI

10.1109/CDC.2007.4435047

Filename

4435047