Block reflector

"A block reflector is an orthogonal, symmetric matrix that reverses a subspace whose dimension may be greater than one."^[1]

It is built out of many elementary reflectors.

It is also referred to as a triangular factor, and is a triangular matrix and they are used in the Householder transformation.

A reflector $Q$ belonging to ${\mathcal {M}}_{n}(\mathbb {R} )$ can be written in the form : $Q=I-auu^{T}$ where $I$ is the identity matrix for ${\mathcal {M}}_{n}(\mathbb {R} )$ , $a$ is a scalar and $u$ belongs to $\mathbb {R} ^{n}$ .

LAPACK routines[edit]

Here are some of the LAPACK routines that apply to block reflectors

"*larft" forms the triangular vector T of a block reflector H=I-VTVH.
"*larzb" applies a block reflector or its transpose/conjugate transpose as returned by "*tzrzf" to a general matrix.
"*larzt" forms the triangular vector T of a block reflector H=I-VTVH as returned by "*tzrzf".
"*larfb" applies a block reflector or its transpose/conjugate transpose to a general rectangular matrix.

References[edit]

^ Schreiber, Rober; Parlett, Beresford (2006). "Block Reflectors: Theory and Computation". SIAM Journal on Numerical Analysis. 25: 189–205. doi:10.1137/0725014.

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[Backus.1969-1] Schreiber, Rober; Parlett, Beresford (2006). "Block Reflectors: Theory and Computation". SIAM Journal on Numerical Analysis. 25: 189–205. doi:10.1137/0725014.

[1]

LAPACK routines[edit]

See also[edit]

References[edit]