| C06EAF
|
Single one-dimensional real discrete Fourier transform, no extra workspace
|
| C06EBF
|
Single one-dimensional Hermitian discrete Fourier transform, no extra workspace
|
| C06ECF
|
Single one-dimensional complex discrete Fourier transform, no extra workspace
|
| C06FAF
|
Single one-dimensional real discrete Fourier transform, extra workspace for greater speed
|
| C06FBF
|
Single one-dimensional Hermitian discrete Fourier transform, extra workspace for greater speed
|
| C06FCF
|
Single one-dimensional complex discrete Fourier transform, extra workspace for greater speed
|
| C06FFF
|
One-dimensional complex discrete Fourier transform of multi-dimensional data
|
| C06FPF
|
Multiple one-dimensional real discrete Fourier transforms |
| C06FQF
|
Multiple one-dimensional Hermitian discrete Fourier transforms |
| C06FRF
|
Multiple one-dimensional complex discrete Fourier transforms |
| C06PAF
|
Single one-dimensional real and Hermitian complex discrete Fourier transform, using complex data format for Hermitian sequences |
| C06PCF
|
Single one-dimensional complex discrete Fourier transform, complex data format
|
| C06PFF
|
One-dimensional complex discrete Fourier transform of multi-dimensional data (using complex data type)
|
| C06PPF
|
Multiple one-dimensional real and Hermitian complex discrete Fourier transforms, using complex data format for Hermitian sequences
|
| C06PQF
|
Multiple one-dimensional real and Hermitian complex discrete Fourier transforms, using complex data format for Hermitian sequences
|
| C06PRF
|
Multiple one-dimensional complex discrete Fourier transforms using complex data format
|
| C06PSF
|
Multiple one-dimensional complex discrete Fourier transforms using complex data format and sequences stored as columns
|
| D01AHF
|
One-dimensional quadrature, adaptive, finite interval, strategy due to Patterson, suitable for well-behaved integrands
|
| D01AJF
|
One-dimensional quadrature, adaptive, finite interval, strategy due to Piessens and de Doncker, allowing for badly-behaved integrands
|
| D01AKF
|
One-dimensional quadrature, adaptive, finite interval, method suitable for oscillating functions
|
| D01ALF
|
One-dimensional quadrature, adaptive, finite interval, allowing for singularities at user-specified break-points |
| D01AMF
|
One-dimensional quadrature, adaptive, infinite or semi-infinite interval
|
| D01ANF
|
One-dimensional quadrature, adaptive, finite interval, weight function cos(omega x) or sin(omega x) |
| D01APF
|
One-dimensional quadrature, adaptive, finite interval, weight function with end-point singularities of algebraico-logarithmic type
|
| D01AQF
|
One-dimensional quadrature, adaptive, finite interval, weight function 1/(x-c), Cauchy principal value (Hilbert transform)
|
| D01ARF
|
One-dimensional quadrature, non-adaptive, finite interval with provision for indefinite integrals |
| D01ASF
|
One-dimensional quadrature, adaptive, semi-infinite interval, weight function cos(omega x) or sin(omega x) |
| D01ATF
|
One-dimensional quadrature, adaptive, finite interval, variant of D01AJF efficient on vector machines
|
| D01AUF
|
One-dimensional quadrature, adaptive, finite interval, variant of D01AKF efficient on vector machines
|
| D01BAF
|
One-dimensional Gaussian quadrature |
| D01BDF
|
One-dimensional quadrature, non-adaptive, finite interval
|
| D01GAF
|
One-dimensional quadrature, integration of function defined by data values, Gill–Miller method
|