control theory Control theory is a field of mathematics that deals with the control of dynamical systems in engineered processes and machines. The objective is to develop a model or algorithm governing the application of system inputs to drive the system to a ...

and in particular when studying the properties of a

linear time-invariant In system analysis, among other fields of study, a linear time-invariant (LTI) system is a system that produces an output signal from any input signal subject to the constraints of linearity and time-invariance; these terms are briefly define ...

system in

state space A state space is the set of all possible configurations of a system. It is a useful abstraction for reasoning about the behavior of a given system and is widely used in the fields of artificial intelligence and game theory. For instance, the t ...

form, the Hautus lemma (after Malo L. J. Hautus), also commonly known as the Popov-Belevitch-Hautus test or PBH test, can prove to be a powerful tool. A special case of this result appeared first in 1963 in a paper by Elmer G. Gilbert, and was later expanded to the current PBH test with contributions by

Vasile M. Popov Vasile Mihai Popov (born 1928) is a leading systems theorist and control engineering specialist. He is well known for having developed a method to analyze stability of nonlinear dynamical systems, now known as Popov criterion. Biography He was b ...

in 1966,

Vitold Belevitch Vitold Belevitch (2 March 1921 – 26 December 1999) was a Belgian mathematician and electrical engineer of Russian origin who produced some important work in the field of electrical network theory. Born to parents fleeing the Bolsheviks, he ...

in 1968, and Malo Hautus in 1969, who emphasized its applicability in proving results for linear time-invariant systems.

Statement

There exist multiple forms of the lemma:

Hautus Lemma for controllability

The Hautus lemma for controllability says that given a square matrix

\mathbf\in M_n(\Re)

and a

\mathbf\in M_(\Re)

the following are equivalent: # The pair

(\mathbf,\mathbf)

controllable Controllability is an important property of a control system, and the controllability property plays a crucial role in many control problems, such as stabilization of unstable systems by feedback, or optimal control. Controllability and observabil ...

# For all

\lambda\in\mathbb

it holds that

\operatorname lambda \mathbf-\mathbf,\mathbf n

# For all

\lambda\in\mathbb

that are eigenvalues of

\mathbf

it holds that

\operatorname lambda \mathbf-\mathbf,\mathbf n

Hautus Lemma for stabilizability

The Hautus lemma for stabilizability says that given a square matrix

\mathbf\in M_n(\Re)

and a

\mathbf\in M_(\Re)

the following are equivalent: # The pair

(\mathbf,\mathbf)

is stabilizable # For all

\lambda\in\mathbb

that are eigenvalues of

\mathbf

and for which

\Re(\lambda)\ge 0

it holds that

\operatorname lambda \mathbf-\mathbf,\mathbf n

Hautus Lemma for observability

The Hautus lemma for observability says that given a square matrix

\mathbf\in M_n(\Re)

and a

\mathbf\in M_(\Re)

the following are equivalent: # The pair

(\mathbf,\mathbf)

is observable. # For all

\lambda\in\mathbb

it holds that

\operatorname lambda \mathbf-\mathbf;\mathbf n

# For all

\lambda\in\mathbb

that are eigenvalues of

\mathbf

it holds that

\operatorname lambda \mathbf-\mathbf;\mathbf n

Hautus Lemma for detectability

The Hautus lemma for detectability says that given a square matrix

\mathbf\in M_n(\Re)

and a

\mathbf\in M_(\Re)

the following are equivalent: # The pair

(\mathbf,\mathbf)

is detectable # For all

\lambda\in\mathbb

that are eigenvalues of

\mathbf

and for which

\Re(\lambda)\ge 0

it holds that

\operatorname lambda \mathbf-\mathbf;\mathbf n

References

* *{{cite book, last=Zabczyk, first=Jerzy, title=Mathematical Control Theory – An Introduction, url=https://archive.org/details/mathematicalcont0000zabc, url-access=registration, year=1995, publisher=Birkhauser, location=Boston, isbn=3-7643-3645-5

Notes

Control theory Lemmas