blas1_z


blas1_z, a C++ code which implements the Level 1 BLAS, or Basic Linear Algebra Subprograms, using double precision complex arithmetic.

The BLAS are a small core library of linear algebra utilities, which can be highly optimized for various architectures. Software that relies on the BLAS is thus highly portable, and will typically run very efficiently.

The Level 1 BLAS are primarily for use in vector operations. In certain cases, they may also be used to operate on the rows or columns of a two-dimensional array.

Licensing:

The computer code and data files described and made available on this web page are distributed under the MIT license

Languages:

blas1_z is available in a C version and a C++ version and a FORTRAN90 version and a MATLAB version.

Related Data and Programs:

BLAS0, a C++ code which contains auxilliary functions for the Basic Linear Algebra Subprograms (BLAS).

BLAS1_C, a C++ code which contains basic linear algebra routines for vector-vector operations, using single precision complex arithmetic.

BLAS1_D, a C++ code which contains basic linear algebra routines for vector-vector operations, using double precision real arithmetic.

BLAS1_S, a C++ code which contains basic linear algebra routines for vector-vector operations, using single precision real arithmetic.

blas1_z_test

BLAS2, a C++ code which contains basic linear algebra subprograms (BLAS) for matrix-vector operations;

BLAS3, a C++ code which contains basic linear algebra subprograms (BLAS) for matrix-matrix operations;

COMPLEX_NUMBERS, a C++ code which demonstrates some simple features involved in the use of complex numbers in C programming.

GSL, C++ codes which illustrate the use of the Gnu Scientific Library;

LINPACK_C, a C++ code which solves linear systems using single precision complex arithmetic;

SUPER_BLAS, a C library which implements some of the Basic Linear Algebra Subprograms for fast execution.

Author:

Original FORTRAN77 version by Charles Lawson, Richard Hanson, David Kincaid, Fred Krogh. C++ version by John Burkardt.

Reference:

  1. Thomas Coleman, Charles vanLoan,
    Handbook for Matrix Computations,
    SIAM, 1988,
    ISBN13: 978-0-898712-27-8,
    LC: QA188.C65.
  2. Jack Dongarra, Jim Bunch, Cleve Moler, Pete Stewart,
    LINPACK User's Guide,
    SIAM, 1979,
    ISBN13: 978-0-898711-72-1,
    LC: QA214.L56.
  3. Charles Lawson, Richard Hanson, David Kincaid, Fred Krogh,
    Algorithm 539: Basic Linear Algebra Subprograms for Fortran Usage,
    ACM Transactions on Mathematical Software,
    Volume 5, Number 3, September 1979, pages 308-323.

Source Code:


Last revised on 10 February 2020.