man zrot (Fonctions bibliothèques) - applie a plane rotation, where the cos (C) is real and the sin (S) is complex, and the vectors CX and CY are complex
NAME
ZROT - applie a plane rotation, where the cos (C) is real and the sin (S) is complex, and the vectors CX and CY are complex
SYNOPSIS
- SUBROUTINE ZROT(
- N, CX, INCX, CY, INCY, C, S )
- INTEGER INCX, INCY, N
- DOUBLE PRECISION C
- COMPLEX*16 S
- COMPLEX*16 CX( * ), CY( * )
PURPOSE
ZROT applies a plane rotation, where the cos (C) is real and the sin (S) is complex, and the vectors CX and CY are complex.
ARGUMENTS
- N (input) INTEGER
- The number of elements in the vectors CX and CY.
- CX (input/output) COMPLEX*16 array, dimension (N)
- On input, the vector X. On output, CX is overwritten with C*X + S*Y.
- INCX (input) INTEGER
- The increment between successive values of CY. INCX <> 0.
- CY (input/output) COMPLEX*16 array, dimension (N)
- On input, the vector Y. On output, CY is overwritten with -CONJG(S)*X + C*Y.
- INCY (input) INTEGER
- The increment between successive values of CY. INCX <> 0.
- C (input) DOUBLE PRECISION
- S (input) COMPLEX*16 C and S define a rotation [ C S ] [ -conjg(S) C ] where C*C + S*CONJG(S) = 1.0.