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p?geqpf from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Computes the QR factorization of a general m-by-n matrix with pivoting.

Last updated on 11/01/2016 - 13:30
Documentation

p?orgqr from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Generates the orthogonal matrix Q of the QR factorization formed by p?geqrf.

Last updated on 11/01/2016 - 13:30
Documentation

p?ungqr from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Generates the complex unitary matrix Q of the QR factorization formed by p?geqrf.

Last updated on 11/01/2016 - 13:30
Documentation

p?ormqr from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Multiplies a general matrix by the orthogonal matrix Q of the QR factorization formed by p?geqrf.

Last updated on 11/01/2016 - 13:30
Documentation

p?unmqr from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Multiplies a complex matrix by the unitary matrix Q of the QR factorization formed by p?geqrf.

Last updated on 11/01/2016 - 13:30
Documentation

p?gelqf from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Computes the LQ factorization of a general rectangular matrix.

Last updated on 11/01/2016 - 13:30
Documentation

p?orglq from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Generates the real orthogonal matrix Q of the LQ factorization formed by p?gelqf.

Last updated on 11/01/2016 - 13:30
Documentation

p?unglq from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Generates the unitary matrix Q of the LQ factorization formed by p?gelqf.

Last updated on 11/01/2016 - 13:30
Documentation

p?ormlq from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Multiplies a general matrix by the orthogonal matrix Q of the LQ factorization formed by p?gelqf.

Last updated on 11/01/2016 - 13:30
Documentation

p?unmlq from Developer Reference for Intel® Math Kernel Library 2017 - Fortran

Multiplies a general matrix by the unitary matrix Q of the LQ factorization formed by p?gelqf.

Last updated on 11/01/2016 - 13:30
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