Householder operator

In linear algebra, the Householder operator is defined as follows.[1] Let $V\,$ be a finite-dimensional inner product space with inner product $\langle \cdot ,\cdot \rangle$ and unit vector $u\in V$ . Then

H_{u}:V\to V\,

is defined by

H_{u}(x)=x-2\,\langle x,u\rangle \,u\,.

This operator reflects the vector $x$ across a plane given by the normal vector $u$ .[2]

It is also common to choose a non-unit vector $q\in V$ , and normalize it directly in the Householder operator's expression:[3]

H_{q}\left(x\right)=x-2\,{\frac {\langle x,q\rangle }{\langle q,q\rangle }}\,q\,.

Properties

The Householder operator satisfies the following properties:

\forall \left(\lambda ,\mu \right)\in K^{2},\,\forall \left(x,y\right)\in V^{2},\,H_{q}\left(\lambda x+\mu y\right)=\lambda \ H_{q}\left(x\right)+\mu \ H_{q}\left(y\right).

It is self-adjoint.
If $K=\mathbb {R}$ , then it is orthogonal; otherwise, if $K=\mathbb {C}$ , then it is unitary.

Over a real or complex vector space, the Householder operator is also known as the Householder transformation.

Roman 2008, p. 243-244
Methods of Applied Mathematics for Engineers and Scientist. Cambridge University Press. pp. Section E.4.11. ISBN 9781107244467.
Roman 2008, p. 244

Roman, Stephen (2008), Advanced Linear Algebra, Graduate Texts in Mathematics (Third ed.), Springer, ISBN 978-0-387-72828-5

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