Complex 16Bit Block FloatingPoint API#
 group bfp_complex_s16_api
Functions

void bfp_complex_s16_init(bfp_complex_s16_t *a, int16_t *real_data, int16_t *imag_data, const exponent_t exp, const unsigned length, const unsigned calc_hr)#
Initialize a complex 16bit BFP vector.
This function initializes each of the fields of BFP vector
a
.Unlike complex 32bit BFP vectors (
bfp_complex_s16_t
), for the sake of various optimizations the real and imaginary parts of elements’ mantissas are stored in separate memory buffers.real_data
points to the memory buffer used to store the real part of each mantissa. It must be at leastlength * 2
bytes long, and must begin at a wordaligned address.imag_data
points to the memory buffer used to store the imaginary part of each mantissa. It must be at leastlength * 2
bytes long, and must begin at a wordaligned address.exp
is the exponent assigned to the BFP vector. The logical value associated with thek
th element of the vector after initialization is \( data_k \cdot 2^{exp} \).If
calc_hr
is false,a>hr
is initialized to 0. Otherwise, the headroom of the the BFP vector is calculated and used to initializea>hr
. Parameters:
a – [out] BFP vector to initialize
real_data – [in]
int16_t
buffer used to back the real part ofa
imag_data – [in]
int16_t
buffer used to back the imaginary part ofa
exp – [in] Exponent of BFP vector
length – [in] Number of elements in BFP vector
calc_hr – [in] Boolean indicating whether the HR of the BFP vector should be calculated

bfp_complex_s16_t bfp_complex_s16_alloc(const unsigned length)#
Dynamically allocate a complex 16bit BFP vector from the heap.
If allocation was unsuccessful, the
real
andimag
fields of the returned vector will be NULL, and thelength
field will be zero. Otherwise,real
andimag
will point to the allocated memory and thelength
field will be the userspecified length. Thelength
argument must not be zero.This function allocates a single block of memory for both the real and imaginary parts of the BFP vector. Because all BFP functions require the mantissa buffers to begin at a word aligned address, if
length
is odd, this function will allocate an extraint16_t
element for the buffer.Neither the BFP exponent, headroom, nor the elements of the allocated mantissa vector are set by this function. To set the BFP vector elements to a known value, use bfp_complex_s16_set() on the retuned BFP vector.
BFP vectors allocated using this function must be deallocated using bfp_complex_s16_dealloc() to avoid a memory leak.
To initialize a BFP vector using static memory allocation, use bfp_complex_s16_init() instead.
See also
Note
Dynamic allocation of BFP vectors relies on allocation from the heap, and offers no guarantees about the execution time. Use of this function in any timecritical section of code is highly discouraged.
 Parameters:
length – [in] The length of the BFP vector to be allocated (in elements)
 Returns:
Complex 16bit BFP vector

void bfp_complex_s16_dealloc(bfp_complex_s16_t *vector)#
Deallocate a complex 16bit BFP vector allocated by bfp_complex_s16_alloc().
Use this function to free the heap memory allocated by bfp_complex_s16_alloc().
BFP vectors whose mantissa buffer was (successfully) dynamically allocated have a flag set which indicates as much. This function can safely be called on any bfp_complex_s16_t which has not had its
flags
orreal
manually manipulated, including:bfp_complex_s16_t resulting from a successful call to bfp_complex_s16_alloc()
bfp_complex_s16_t resulting from an unsuccessful call to bfp_complex_s16_alloc()
bfp_complex_s16_t initialized with a call to bfp_complex_s16_init()
In the latter two cases, this function does nothing. In the former, the
real
,imag
,length
andflags
fields ofvector
are cleared to zero.See also
 Parameters:
vector – [in] BFP vector to be deallocated.

void bfp_complex_s16_set(bfp_complex_s16_t *a, const complex_s16_t b, const exponent_t exp)#
Set all elements of a complex 16bit BFP vector to a specified value.
The exponent of
a
is set toexp
, and each element’s mantissa is set tob
.After performing this operation, all elements will represent the same value \(b \cdot 2^{exp}\).
a
must have been initialized (see bfp_complex_s16_init()). Parameters:
a – [out] BFP vector to update
b – [in] New value each complex mantissa is set to
exp – [in] New exponent for the BFP vector

void bfp_complex_s16_use_exponent(bfp_complex_s16_t *a, const exponent_t exp)#
Modify a complex 16bit BFP vector to use a specified exponent.
This function forces complex BFP vector \(\bar A\) to use a specified exponent. The mantissa vector \(\bar a\) will be bitshifted left or right to compensate for the changed exponent.
This function can be used, for example, before calling a fixedpoint arithmetic function to ensure the underlying mantissa vector has the needed Qformat. As another example, this may be useful when communicating with peripheral devices (e.g. via I2S) that require sample data to be in a specified format.
Note that this sets the current encoding, and does not fix the exponent permanently (i.e. subsequent operations may change the exponent as usual).
If the required fixedpoint Qformat is
QX.Y
, whereY
is the number of fractional bits in the resulting mantissas, then the associated exponent (and value for parameterexp
) isY
.a
points to input BFP vector \(\bar A\), with complex mantissa vector \(\bar a\) and exponent \(a\_exp\).a
is updated in place to produce resulting BFP vector \(\bar{\tilde{A}}\) with complex mantissa vector \(\bar{\tilde{a}}\) and exponent \(\tilde{a}\_exp\).exp
is \(\tilde{a}\_exp\), the required exponent. \(\Delta{}p = \tilde{a}\_exp  a\_exp\) is the required change in exponent.If \(\Delta{}p = 0\), the BFP vector is left unmodified.
If \(\Delta{}p > 0\), the required exponent is larger than the current exponent and an arithmetic rightshift of \(\Delta{}p\) bits is applied to the mantissas \(\bar a\). When applying a rightshift, precision may be lost by discarding the \(\Delta{}p\) least significant bits.
If \(\Delta{}p < 0\), the required exponent is smaller than the current exponent and a leftshift of \(\Delta{}p\) bits is applied to the mantissas \(\bar a\). When leftshifting, saturation logic will be applied such that any element that can’t be represented exactly with the new exponent will saturate to the 16bit saturation bounds.
The exponent and headroom of
a
are updated by this function. Operation Performed:
 \[\begin{split}\begin{flalign*} & \Delta{}p = \tilde{a}\_exp  a\_exp \\ & \tilde{a_k} \leftarrow sat_{16}( a_k \cdot 2^{\Delta{}p} ) \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{A} \text{ (in elements) } && \end{flalign*}\end{split}\]
 Parameters:
a – [inout] Input BFP vector \(\bar A\) / Output BFP vector \(\bar{\tilde{A}}\)
exp – [in] The required exponent, \(\tilde{a}\_exp\)

headroom_t bfp_complex_s16_headroom(bfp_complex_s16_t *b)#
Get the headroom of a complex 16bit BFP vector.
The headroom of a complex vector is the number of bits that the real and imaginary parts of each of its elements can be leftshifted without losing any information. It conveys information about the range of values that vector may contain, which is useful for determining how best to preserve precision in potentially lossy block floatingpoint operations.
In a BFP context, headroom applies to mantissas only, not exponents.
In particular, if the complex 16bit mantissa vector \(\bar x\) has \(N\) bits of headroom, then for any element \(x_k\) of \(\bar x\)
\(2^{15N} \le Re\{x_k\} < 2^{15N}\)
and
\(2^{15N} \le Im\{x_k\} < 2^{15N}\)
And for any element \(X_k = x_k \cdot 2^{x\_exp}\) of a complex BFP vector \(\bar X\)
\(2^{15 + x\_exp  N} \le Re\{X_k\} < 2^{15 + x\_exp  N} \)
and
\(2^{15 + x\_exp  N} \le Im\{X_k\} < 2^{15 + x\_exp  N} \)
This function determines the headroom of
b
, updatesb>hr
with that value, and then returnsb>hr
. Parameters:
b – complex BFP vector to get the headroom of
 Returns:
Headroom of complex BFP vector
b

void bfp_complex_s16_shl(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const left_shift_t b_shl)#
Apply a leftshift to the mantissas of a complex 16bit BFP vector.
Each complex mantissa of input BFP vector \(\bar B\) is leftshifted
b_shl
bits and stored in the corresponding element of output BFP vector \(\bar A\).This operation can be used to add or remove headroom from a BFP vector.
b_shr
is the number of bits that the real and imaginary parts of each mantissa will be leftshifted. This shift is signed and arithmetic, so negative values forb_shl
will rightshift the mantissas.a
andb
must have been initialized (see bfp_complex_s16_init()), and must be the same length.This operation can be performed safely inplace on
b
.Note that this operation bypasses the logic protecting the caller from saturation or underflows. Output values saturate to the symmetric 16bit range (the open interval \((2^{15}, 2^{15})\)). To avoid saturation,
b_shl
should be no greater than the headroom ofb
(b>hr
). Operation Performed:
 \[\begin{split}\begin{flalign*} & Re\{a_k\} \leftarrow sat_{16}( \lfloor Re\{b_k\} \cdot 2^{b\_shl} \rfloor ) \\ & Im\{a_k\} \leftarrow sat_{16}( \lfloor Im\{b_k\} \cdot 2^{b\_shl} \rfloor ) \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B} \\ & \qquad\text{ and } b_k \text{ and } a_k \text{ are the } k\text{th mantissas from } \bar{B}\text{ and } \bar{A}\text{ respectively} && \end{flalign*}\end{split}\]
 Parameters:
a – [out] Complex output BFP vector \(\bar A\)
b – [in] Complex input BFP vector \(\bar B\)
b_shl – [in] Signed arithmetic leftshift to be applied to mantissas of \(\bar B\).

void bfp_complex_s16_real_mul(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const bfp_s16_t *c)#
Multiply a complex 16bit BFP vector elementwise by a real 16bit BFP vector.
Each complex output element \(A_k\) of complex output BFP vector \(\bar A\) is set to the complex product of \(B_k\) and \(C_k\), the corresponding elements of complex input BFP vector \(\bar B\) and real input BFP vector \(\bar C\) respectively.
a
,b
andc
must have been initialized (see bfp_complex_s16_init() and bfp_s16_init()), and must be the same length.This operation can be performed safely inplace on
b
. Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow B_k \cdot C_k \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ \qquad\text{where } N \text{ is the length of } \bar{B}\text{ and }\bar{C} && \end{flalign*}\end{split}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input real BFP vector \(\bar C\)

void bfp_complex_s16_mul(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const bfp_complex_s16_t *c)#
Multiply one complex 16bit BFP vector elementwise another.
Each complex output element \(A_k\) of complex output BFP vector \(\bar A\) is set to the complex product of \(B_k\) and \(C_k\), the corresponding elements of complex input BFP vectors \(\bar B\) and \(\bar C\) respectively.
a
,b
andc
must have been initialized (see bfp_complex_s16_init()), and must be the same length.This operation can be performed safely inplace on
b
orc
. Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow B_k \cdot C_k \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B}\text{ and }\bar{C} && \end{flalign*}\end{split}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex BFP vector \(\bar C\)

void bfp_complex_s16_conj_mul(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const bfp_complex_s16_t *c)#
Multiply one complex 16bit BFP vector elementwise by the complex conjugate of another.
Each complex output element \(A_k\) of complex output BFP vector \(\bar A\) is set to the complex product of \(B_k\), the corresponding element of complex input BFP vectors \(\bar B\), and \((C_k)^*\), the complex conjugate of the corresponding element of complex input BFP vector \(\bar C\).
 Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow B_k \cdot (C_k)^* \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B}\text{ and }\bar{C} \\ & \qquad\text{and } (C_k)^* \text{ is the complex conjugate of } C_k && \end{flalign*}\end{split}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex BFP vector \(\bar C\)

void bfp_complex_s16_macc(bfp_complex_s16_t *acc, const bfp_complex_s16_t *b, const bfp_complex_s16_t *c)#
Multiply one complex 16bit BFP vector by another elementwise and add the result to a third vector.
 Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow A_k + (B_k \cdot C_k) \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B}\text{ and }\bar{C} && \end{flalign*}\end{split}\]
 Parameters:
acc – [inout] Input/Output accumulator complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex BFP vector \(\bar C\)

void bfp_complex_s16_nmacc(bfp_complex_s16_t *acc, const bfp_complex_s16_t *b, const bfp_complex_s16_t *c)#
Multiply one complex 16bit BFP vector by another elementwise and subtract the result from a third vector.
 Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow A_k  (B_k \cdot C_k) \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B}\text{ and }\bar{C} && \end{flalign*}\end{split}\]
 Parameters:
acc – [inout] Input/Output accumulator complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex BFP vector \(\bar C\)

void bfp_complex_s16_conj_macc(bfp_complex_s16_t *acc, const bfp_complex_s16_t *b, const bfp_complex_s16_t *c)#
Multiply one complex 16bit BFP vector by the complex conjugate of another elementwise and add the result to a third vector.
 Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow A_k + (B_k \cdot C_k^*) \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B}\text{ and }\bar{C} \\ & \qquad\text{and } (C_k)^* \text{ is the complex conjugate of } C_k && \end{flalign*}\end{split}\]
 Parameters:
acc – [inout] Input/Output accumulator complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex BFP vector \(\bar C\)

void bfp_complex_s16_conj_nmacc(bfp_complex_s16_t *acc, const bfp_complex_s16_t *b, const bfp_complex_s16_t *c)#
Multiply one complex 16bit BFP vector by the complex conjugate of another elementwise and subtract the result from a third vector.
 Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow A_k  (B_k \cdot C_k^*) \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B}\text{ and }\bar{C} \\ & \qquad\text{and } (C_k)^* \text{ is the complex conjugate of } C_k && \end{flalign*}\end{split}\]
 Parameters:
acc – [inout] Input/Output accumulator complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex BFP vector \(\bar C\)

void bfp_complex_s16_real_scale(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const float alpha)#
Multiply a complex 16bit BFP vector by a real scalar.
Each complex output element \(A_k\) of complex output BFP vector \(\bar A\) is set to the complex product of \(B_k\), the corresponding element of complex input BFP vector \(\bar B\), and real scalar \(\alpha\cdot 2^{\alpha\_exp}\), where \(\alpha\) and \(\alpha\_exp\) are the mantissa and exponent respectively of parameter
alpha
.a
andb
must have been initialized (see bfp_complex_s16_init()), and must be the same length.This operation can be performed safely inplace on
b
. Operation Performed:
 \[\begin{flalign*} \bar{A} \leftarrow \bar{B} \cdot \left( \alpha \cdot 2^{\alpha\_exp} \right) && \end{flalign*}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
alpha – [in] Real scalar by which \(\bar B\) is multiplied

void bfp_complex_s16_scale(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const float_complex_s16_t alpha)#
Multiply a complex 16bit BFP vector by a complex scalar.
Each complex output element \(A_k\) of complex output BFP vector \(\bar A\) is set to the complex product of \(B_k\), the corresponding element of complex input BFP vector \(\bar B\), and complex scalar \(\alpha\cdot 2^{\alpha\_exp}\), where \(\alpha\) and \(\alpha\_exp\) are the complex mantissa and exponent respectively of parameter
alpha
.a
andb
must have been initialized (see bfp_complex_s16_init()), and must be the same length.This operation can be performed safely inplace on
b
. Operation Performed:
 \[\begin{flalign*} \bar{A} \leftarrow \bar{B} \cdot \left( \alpha \cdot 2^{\alpha\_exp} \right) && \end{flalign*}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
alpha – [in] Complex scalar by which \(\bar B\) is multiplied

void bfp_complex_s16_add(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const bfp_complex_s16_t *c)#
Add one complex 16bit BFP vector to another.
Each complex output element \(A_k\) of complex output BFP vector \(\bar A\) is set to the sum of \(B_k\) and \(C_k\), the corresponding elements of complex input BFP vectors \(\bar B\) and \(\bar C\) respectively.
a
,b
andc
must have been initialized (see bfp_complex_s16_init()), and must be the same length.This operation can be performed safely inplace on
b
orc
. Operation Performed:
 \[\begin{flalign*} \bar{A} \leftarrow \bar{B} + \bar{C} && \end{flalign*}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex BFP vector \(\bar C\)

void bfp_complex_s16_add_scalar(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const float_complex_s16_t c)#
Add a complex scalar to a complex 16bit BFP vector.
Add a real scalar \(c\) to input BFP vector \(\bar B\) and store the result in BFP vector \(\bar A\).
a
, andb
must have been initialized (see bfp_complex_s16_init()), and must be the same length.This operation can be performed safely inplace on
b
. Operation Performed:
 \[\begin{flalign*} \bar{A} \leftarrow \bar{B} + c && \end{flalign*}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex scalar \(c\)

void bfp_complex_s16_sub(bfp_complex_s16_t *a, const bfp_complex_s16_t *b, const bfp_complex_s16_t *c)#
Subtract one complex 16bit BFP vector from another.
Each complex output element \(A_k\) of complex output BFP vector \(\bar A\) is set to the difference between \(B_k\) and \(C_k\), the corresponding elements of complex input BFP vectors \(\bar B\) and \(\bar C\) respectively.
a
,b
andc
must have been initialized (see bfp_complex_s16_init()), and must be the same length.This operation can be performed safely inplace on
b
orc
. Operation Performed:
 \[\begin{flalign*} \bar{A} \leftarrow \bar{B}  \bar{C} && \end{flalign*}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)
c – [in] Input complex BFP vector \(\bar C\)

void bfp_complex_s16_to_bfp_complex_s32(bfp_complex_s32_t *a, const bfp_complex_s16_t *b)#
Convert a complex 16bit BFP vector to a complex 32bit BFP vector.
Each complex 32bit output element \(A_k\) of complex output BFP vector \(\bar A\) is set to the value of \(B_k\), the corresponding element of complex 16bit input BFP vector \(\bar B\), signextended to 32 bits.
a
andb
must have been initialized (see bfp_complex_s32_init() and bfp_complex_s16_init()), and must be the same length. Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \overset{32bit}{\longleftarrow} B_k \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B} && \end{flalign*}\end{split}\]
 Parameters:
a – [out] Output complex 32bit BFP vector \(\bar A\)
b – [in] Input complex 16bit BFP vector \(\bar B\)

void bfp_complex_s16_squared_mag(bfp_s16_t *a, const bfp_complex_s16_t *b)#
Get the squared magnitude of each element of a complex 16bit BFP vector.
Each element \(A_k\) of real output BFP vector \(\bar A\) is set to the squared magnitude of \(B_k\), the corresponding element of complex input BFP vector \(\bar B\).
a
andb
must have been initialized (see bfp_s16_init() bfp_complex_s16_init()), and must be the same length. Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow B_k \cdot (B_k)^* \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B} \\ & \qquad\text{ and } (B_k)^* \text{ is the complex conjugate of } B_k && \end{flalign*}\end{split}\]
 Parameters:
a – [out] Output real BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)

void bfp_complex_s16_mag(bfp_s16_t *a, const bfp_complex_s16_t *b)#
Get the magnitude of each element of a complex 16bit BFP vector.
Each element \(A_k\) of real output BFP vector \(\bar A\) is set to the magnitude of \(B_k\), the corresponding element of complex input BFP vector \(\bar B\).
a
andb
must have been initialized (see bfp_s16_init() bfp_complex_s16_init()), and must be the same length. Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow \left B_k \right \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B} && \end{flalign*}\end{split}\]
 Parameters:
a – [out] Output real BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)

float_complex_s32_t bfp_complex_s16_sum(const bfp_complex_s16_t *b)#
Get the sum of elements of a complex 16bit BFP vector.
The elements of complex input BFP vector \(\bar B\) are summed together. The result is a complex 32bit floatingpoint scalar \(a\), which is returned.
b
must have been initialized (see bfp_complex_s16_init()). Operation Performed:
 \[\begin{split}\begin{flalign*} & a \leftarrow \sum_{k=0}^{N1} \left( b_k \cdot 2^{B\_exp} \right) \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B} && \end{flalign*}\end{split}\]
 Parameters:
b – [in] Input complex BFP vector \(\bar B\)
 Returns:
\(a\), the sum of vector \(\bar B\)’s elements

void bfp_complex_s16_conjugate(bfp_complex_s16_t *a, const bfp_complex_s16_t *b)#
Get the complex conjugate of each element of a complex 16bit BFP vector.
Each element \(A_k\) of complex output BFP vector \(\bar A\) is set to the complex conjugate of \(B_k\), the corresponding element of complex input BFP vector \(\bar B\).
 Operation Performed:
 \[\begin{split}\begin{flalign*} & A_k \leftarrow B_k^* \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B}\text{ and }\bar{C} \\ & \qquad\text{and } B_k^* \text{ is the complex conjugate of } B_k && \end{flalign*}\end{split}\]
 Parameters:
a – [out] Output complex BFP vector \(\bar A\)
b – [in] Input complex BFP vector \(\bar B\)

float_s64_t bfp_complex_s16_energy(const bfp_complex_s16_t *b)#
Get the energy of a complex 16bit BFP vector.
The energy of a complex 16bit BFP vector here is the sum of the squared magnitudes of each of the vector’s elements.
 Operation Performed:
 \[\begin{split}\begin{flalign*} & a \leftarrow \sum_{k=0}^{N1} \left( \leftb_k \cdot 2^{B\_exp}\right^2 \right) \\ & \qquad\text{for } k \in 0\ ...\ (N1) \\ & \qquad\text{where } N \text{ is the length of } \bar{B} && \end{flalign*}\end{split}\]
 Parameters:
b – [in] Input complex BFP vector \(\bar B\)
 Returns:
\(a\), the energy of vector \(\bar B\)

void bfp_complex_s16_init(bfp_complex_s16_t *a, int16_t *real_data, int16_t *imag_data, const exponent_t exp, const unsigned length, const unsigned calc_hr)#