Vector Inverse Clarke Transform

Collaboration diagram for Vector Inverse Clarke Transform:

Functions
static __INLINE void	arm_inv_clarke_f32 (float32_t Ialpha, float32_t Ibeta, float32_t *pIa, float32_t *pIb)
	Floating-point Inverse Clarke transform. More...
static __INLINE void	arm_inv_clarke_q31 (q31_t Ialpha, q31_t Ibeta, q31_t *pIa, q31_t *pIb)
	Inverse Clarke transform for Q31 version. More...

Detailed Description

Inverse Clarke transform converts the two-coordinate time invariant vector into instantaneous stator phases.

The function operates on a single sample of data and each call to the function returns the processed output. The library provides separate functions for Q31 and floating-point data types.

Algorithm

where pIa and pIb are the instantaneous stator phases and Ialpha and Ibeta are the two coordinates of time invariant vector.

Fixed-Point Behavior

Care must be taken when using the Q31 version of the Clarke transform. In particular, the overflow and saturation behavior of the accumulator used must be considered. Refer to the function specific documentation below for usage guidelines.

Function Documentation

arm_inv_clarke_f32()

static __INLINE void arm_inv_clarke_f32 ( float32_t  Ialpha, float32_t  Ibeta, float32_t *  pIa, float32_t *  pIb  )

static

Floating-point Inverse Clarke transform.

Parameters

[in]	Ialpha	input two-phase orthogonal vector axis alpha
[in]	Ibeta	input two-phase orthogonal vector axis beta
[out]	*pIa	points to output three-phase coordinate a
[out]	*pIb	points to output three-phase coordinate b

Returns

none.

Definition at line 5395 of file arm_math.h.

arm_inv_clarke_q31()

static __INLINE void arm_inv_clarke_q31 ( q31_t  Ialpha, q31_t  Ibeta, q31_t *  pIa, q31_t *  pIb  )

static

Inverse Clarke transform for Q31 version.

Parameters

[in]	Ialpha	input two-phase orthogonal vector axis alpha
[in]	Ibeta	input two-phase orthogonal vector axis beta
[out]	*pIa	points to output three-phase coordinate a
[out]	*pIb	points to output three-phase coordinate b

Returns

none.

Scaling and Overflow Behavior:

The function is implemented using an internal 32-bit accumulator. The accumulator maintains 1.31 format by truncating lower 31 bits of the intermediate multiplication in 2.62 format. There is saturation on the subtraction, hence there is no risk of overflow.

Definition at line 5424 of file arm_math.h.