LINPAKD
P A C K A G E LINPAKD
(Version 1978 )
Analyse and solve various systems of linear algebraic equations. (Double
precision version of LINPACK).
DCHDC.........Compute Cholesky decomposition of positive definite double
precision matrix with optional pivoting.
DCHDD.........Downdates Cholesky factorization of positive definite
double precision matrix.
DCHEX.........Updates Cholesky factorization of positive definite double
precision matrix.
DCHUD.........Updates Cholesky factorization of positive definite double
precision matrix.
DGBCO.........Computes LU factorization of general double precision band
matrix and estimates its condition.
DGBDI.........Uses LU factorization of general double precision band
matrix to compute its determinant. (No provision for
inverse compution.)
DGBFA.........Computes LU factorization of general double precision band
matrix.
DGBSL.........Uses LU factorization of general double precision band
matrix to solve systems.
DGECO.........Compute LU factorization of general double precision
matrix and estimate its condition.
DGEDI.........Uses LU factorization of general double precision matrix
to compute its determinant and/or inverse.
DGEFA.........Compute LU factorization of general double precision
matrix.
DGESL.........Uses LU factorization of general double precision matrix
to solve systems.
DGTSL.........Solve systems with tridiagonal double precision matrix.
DPBCO.........Compute LU factorization of double precision positive
definite band matrix and estimate its condition.
DPBDI.........Use LU factorization of double precision positive definite
band matrix to compute determinant. (No provision for
inverse.)
DPBFA.........Computes LU factorization of double precision positive
definite band matrix.
DPBSL.........Uses LU factorization of double precision positive
definite band matrix to solve systems.
DPOCO.........Use Cholesky algorithm to factor double precision positive
definite matrix and estimate its condition.
DPODI.........Use factorization of double precision positive definite
matrix to compute determinant and/or inverse.
DPOFA.........Use Cholesky algorithm to factor double precision positive
definite matrix.
DPOSL.........Use factorization of double precision positive definite
matrix to solve systems.
DPPCO.........Use Cholesky algorithm to factor double precision positive
definite matrix stored in packed form and estimate its
condition.
DPPDI.........Use factorization of double precision positive definite
matrix stored in packed form to compute determinant and/or
inverse.
DPPFA.........Use Cholesky algorithm to factor double precision positive
definite matrix stored in packed form.
DPPSL.........Use factorization of double precision positive definite
matrix stored in packed form to solve systems.
DPTSL.........Decomposes double precision symmetric positive definite
tridiagonal matrix and simultaneously solve a system.
DQRDC.........Compute QR decomposition of general double precision
matrix.
DQRSL.........Manipulates truncated QR decomposition of double precision
matrix output from DQRDC.
DSICO.........Computes factorization of double precision symmetric
indefinite matrix and estimate its condition.
DSIDI.........Use factorization of double precision symmetric indefinite
matrix to compute determinant and/or inverse.
DSIFA.........Compute factorization of double precision symmetric
indefinite matrix.
DSISL.........Use factorization of double precision symmetric indefinite
matrix to solve systems.
DSPCO.........Compute factorization of double precision symmetric
indefinite matrix stored in packed form and estimate its
condition.
DSPDI.........Use factorization of double precision symmetric indefinite
matrix stored in packed form to compute determinant and/or
inverse.
DSPFA.........Compute factorization of double precision symmetric
indefinite matrix stored in packed form.
DSPSL.........Use factorization of double precision symmetric indefinite
matrix stored in packed form to solve systems.
DSVDC.........Compute Singular Value Decomposition of double precision
matrix.
DTRCO.........Estimates condition of double precision triangular matrix.
DTRDI.........Computes determinant and/or inverse of double precision
triangular matrix.
DTRSL.........Solves systems with double precision triangular matrix.