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[/] [openrisc/] [trunk/] [gnu-old/] [newlib-1.17.0/] [newlib/] [libm/] [machine/] [spu/] [headers/] [asind2.h] - Rev 825

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/* --------------------------------------------------------------  */
/* (C)Copyright 2006,2008,                                         */
/* International Business Machines Corporation                     */
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/* --------------------------------------------------------------  */
/* PROLOG END TAG zYx                                              */
 
#ifdef __SPU__
 
#ifndef _ASIND2_H_
#define _ASIND2_H_	1
 
#include "simdmath.h"
#include <spu_intrinsics.h>
#include "sqrtd2.h"
#include "divd2.h"
 
 
 
/*
 * FUNCTION
 *	vector double _asind2(vector double x)
 *
 * DESCRIPTION
 * 	Compute the arc sine of the vector of double precision elements 
 * 	specified by x, returning the resulting angles in radians. The input
 *      elements are to be in the closed interval [-1, 1]. Values outside 
 *      this range result in a invalid operation execption being latched in 
 *	the FPSCR register and a NAN is returned.
 *
 * 	The basic algorithm computes the arc sine using a rational polynomial
 * 	of the form x + x^3 * P(x^2) / Q(x^2) for inputs |x| in the interval 
 *      [0, 0.5]. Values outsize this range are transformed as by:
 * 
 * 	asin(x) =  PI/2 - 2*asin(sqrt((1-x)/2)) for x in the range (0.5, 1.0]
 * 
 * 	asin(x) = -PI/2 + 2*asin(sqrt((1+x)/2)) for x in the range [-1.0, -0.5)
 *
 * 	This yields the basic algorithm of:
 *
 *	   absx = (x < 0.0) ? -x : x;
 *	 
 *	   if (absx > 0.5) {
 *	     if (x < 0) {
 *	       addend = -SM_PI_2;
 *	       multiplier = -2.0;
 *	     } else {
 *	       addend = SM_PI_2;
 *	       multiplier = 2.0;
 *	     }
 *	
 *	     x = sqrt(-0.5 * absx + 0.5);
 *	   } else {
 *	     addend = 0.0;
 *	     multiplier = 1.0;
 *	   }
 *	
 *	    x2 = x * x;
 *	    x3 = x2 * x;
 *
 *	    p = ((((P5 * x2 + P4)*x2 + P3)*x2 + P2)*x2 + P1)*x2 + P0;
 *	 
 *	    q = ((((Q5 * x2 + Q4)*x2 + Q3)*x2 + Q2)*x2 + Q1)*x2 + Q0;;
 *	
 *	    pq = p / q;
 *	
 *	    result = addend - (x3*pq + x)*multiplier;
 *
 *	 Where P5-P0 and Q5-Q0 are the polynomial coeficients.
 */
static __inline vector double _asind2(vector double x)
{
  vec_uint4   x_gt_half, x_eq_half;
  vec_double2 x_abs;			// absolute value of x
  vec_double2 x_trans;			// transformed x when |x| > 0.5
  vec_double2 x2, x3;			// x squared and x cubed, respectively.
  vec_double2 result;
  vec_double2 multiplier, addend; 
  vec_double2 p, q, pq;
  vec_double2 half = spu_splats(0.5);
  vec_double2 sign = (vec_double2)spu_splats(0x8000000000000000ULL);
  vec_uchar16 splat_hi = ((vec_uchar16){0,1,2,3, 0,1,2,3, 8,9,10,11, 8,9,10,11});
 
  // Compute the absolute value of x
  x_abs = spu_andc(x, sign);
 
  // Perform transformation for the case where |x| > 0.5. We rely on
  // sqrtd2 producing a NAN is |x| > 1.0.
  x_trans = _sqrtd2(spu_nmsub(x_abs, half, half));
 
  // Determine the correct addend and multiplier.
  x_gt_half = spu_cmpgt((vec_uint4)x_abs, (vec_uint4)half);
  x_eq_half = spu_cmpeq((vec_uint4)x_abs, (vec_uint4)half);
  x_gt_half = spu_or(x_gt_half, spu_and(x_eq_half, spu_rlqwbyte(x_gt_half, 4)));
  x_gt_half = spu_shuffle(x_gt_half, x_gt_half, splat_hi);
 
  addend = spu_and(spu_sel(spu_splats((double)SM_PI_2), x, (vec_ullong2)sign), (vec_double2)x_gt_half);
 
  multiplier = spu_sel(spu_splats(-1.0), spu_sel(spu_splats(2.0), x, (vec_ullong2)sign), (vec_ullong2)x_gt_half);
 
  // Select whether to use the x or the transformed x for the polygon evaluation.
  // if |x| > 0.5 use x_trans
  // else         use x
 
  x = spu_sel(x, x_trans, (vec_ullong2)x_gt_half);
 
  // Compute the polynomials.
 
  x2 = spu_mul(x, x);
  x3 = spu_mul(x2, x);
 
  p = spu_madd(spu_splats(0.004253011369004428248960), x2, spu_splats(-0.6019598008014123785661));
  p = spu_madd(p, x2, spu_splats(5.444622390564711410273));
  p = spu_madd(p, x2, spu_splats(-16.26247967210700244449));
  p = spu_madd(p, x2, spu_splats(19.56261983317594739197));
  p = spu_madd(p, x2, spu_splats(-8.198089802484824371615));
 
  q = spu_add(x2, spu_splats(-14.74091372988853791896));
  q = spu_madd(q, x2, spu_splats(70.49610280856842141659));
  q = spu_madd(q, x2, spu_splats(-147.1791292232726029859));
  q = spu_madd(q, x2, spu_splats(139.5105614657485689735));
  q = spu_madd(q, x2, spu_splats(-49.18853881490881290097));
 
  // Compute the rational solution p/q and final multiplication and addend 
  // correction.
  pq = _divd2(p, q);
 
  result = spu_nmsub(spu_madd(x3, pq, x), multiplier, addend);
 
  return (result);
}
 
#endif /* _ASIND2_H_ */
#endif /* __SPU__ */
 

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