| e02dcc
|
Least-squares bicubic spline fit with automatic knot placement, two variables (rectangular grid)
|
| f06pac
|
Matrix-vector product, real rectangular matrix
|
| f06pbc
|
Matrix-vector product, real rectangular band matrix
|
| f06pmc
|
Rank-1 update, real rectangular matrix
|
| f06sac
|
Matrix-vector product, complex rectangular matrix
|
| f06sbc
|
Matrix-vector product, complex rectangular band matrix
|
| f06smc
|
Rank-1 update, complex rectangular matrix, unconjugated vector |
| f06snc
|
Rank-1 update, complex rectangular matrix, conjugated vector |
| f06yac
|
Matrix-matrix product, two real rectangular matrices
|
| f06ycc
|
Matrix-matrix product, one real symmetric matrix, one real rectangular matrix
|
| f06yfc
|
Matrix-matrix product, one real triangular matrix, one real rectangular matrix
|
| f06zac
|
Matrix-matrix product, two complex rectangular matrices
|
| f06zcc
|
Matrix-matrix product, one complex Hermitian matrix, one complex rectangular matrix
|
| f06zfc
|
Matrix-matrix product, one complex triangular matrix, one complex rectangular matrix
|
| f06ztc
|
Matrix-matrix product, one complex symmetric matrix, one complex rectangular matrix
|
| f08aec
|
QR factorization of real general rectangular matrix
|
| f08ahc
|
LQ factorization of real general rectangular matrix
|
| f08asc
|
QR factorization of complex general rectangular matrix
|
| f08avc
|
LQ factorization of complex general rectangular matrix
|
| f08bec
|
QR factorization of real general rectangular matrix with column pivoting |
| f08bsc
|
QR factorization of complex general rectangular matrix with column pivoting |
| f08kec
|
Orthogonal reduction of real general rectangular matrix to bidiagonal form
|
| f08ksc
|
Unitary reduction of complex general rectangular matrix to bidiagonal form
|
| f16qfc
|
Matrix copy, real rectangular matrix
|
| f16qhc
|
Matrix initialisation, real rectangular matrix
|
| f16tfc
|
Matrix copy, complex rectangular matrix
|
| f16thc
|
Matrix initialisation, complex rectangular matrix
|
| g13cac
|
Univariate time series, smoothed sample spectrum using rectangular, Bartlett, Tukey or Parzen lag window |
| g13ccc
|
Multivariate time series, smoothed sample cross spectrum using rectangular, Bartlett, Tukey or Parzen lag window |
© The Numerical Algorithms Group Ltd, Oxford UK. 2002