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man pages section 3: Multimedia Library Functions

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Updated: July 2017
 
 

mlib_MatrixMulShift_S16_S16_Mod (3MLIB)

Name

mlib_MatrixMulShift_S16_S16_Mod, mlib_MatrixMulShift_S16_S16_Sat, mlib_MatrixMulShift_S16C_S16C_Mod, mlib_MatrixMulShift_S16C_S16C_Sat - matrix multiplication plus shifting

Synopsis

cc [ flag... ] file... –lmlib [ library... ]
#include <mlib.h>

mlib_status mlib_MatrixMulShift_S16_S16_Mod(mlib_s16 *z, 
    const mlib_s16 *x, const mlib_s16 *y, mlib_s32 m, 
    mlib_s32 l, mlib_s32 n, mlib_s32 shift);
mlib_status mlib_MatrixMulShift_S16_S16_Sat(mlib_s16 *z, 
     const mlib_s16 *x, const mlib_s16 *y, mlib_s32 m, 
     mlib_s32 l, mlib_s32 n, mlib_s32 shift);
mlib_status mlib_MatrixMulShift_S16C_S16C_Mod(mlib_s16 *z, 
     const mlib_s16 *x, const mlib_s16 *y, mlib_s32 m, 
     mlib_s32 l, mlib_s32 n, mlib_s32 shift);
mlib_status mlib_MatrixMulShift_S16C_S16C_Sat(mlib_s16 *z, 
     const mlib_s16 *x, const mlib_s16 *y, mlib_s32 m, 
     mlib_s32 l, mlib_s32 n, mlib_s32 shift);

Description

Each of these functions performs a multiplication of two matrices and shifts the result.

For real data, the following equation is used:

              l-1
z[i*n + j] = {SUM (x[i*l + k] * y[k*n + j])} * 2**(-shift)
              k=0

where i = 0, 1, ..., (m - 1); j = 0, 1, ..., (n - 1).

For complex data, the following equation is used:

                      l-1
z[2*(i*n + j)]     = {SUM (xR*yR - xI*yI)} * 2**(-shift)
                      k=0

                      l-1
z[2*(i*n + j) + 1] = {SUM (xR*yI + xI*yR)} * 2**(-shift)
                      k=0

where

xR = x[2*(i*l + k)]
xI = x[2*(i*l + k) + 1]
yR = y[2*(k*n + j)]
yI = y[2*(k*n + j) + 1]
i = 0, 1, ..., (m - 1)
j = 0, 1, ..., (n - 1)

Parameters

Each of the functions takes the following arguments:

z

Pointer to the first element of the result matrix, in row major order.

x

Pointer to the first element of the first matrix, in row major order.

y

Pointer to the first element of the second matrix, in row major order.

m

Number of rows in the first matrix. m > 0.

l

Number of columns in the first matrix, and the number of rows in the second matrix. l > 0.

n

Number of columns in the second matrix. n > 0.

shift

Right shifting factor. 1 ≤ shift ≤ 16.

Return Values

Each of the functions returns MLIB_SUCCESS if successful. Otherwise it returns MLIB_FAILURE.

Attributes

See attributes(5) for descriptions of the following attributes:

ATTRIBUTE TYPE
ATTRIBUTE VALUE
Interface Stability
Committed
MT-Level
MT-Safe

See Also

mlib_MatrixMul_U8_U8_Mod(3MLIB), attributes(5)