1 files changed, 80 insertions, 0 deletions

diff --git a/pl/math/expm1f_1u6.c b/pl/math/expm1f_1u6.c
new file mode 100644
index 0000000..70b14e4
--- /dev/null
+++ b/pl/math/expm1f_1u6.c
@@ -0,0 +1,80 @@
+/*
+ * Single-precision e^x - 1 function.
+ *
+ * Copyright (c) 2022-2023, Arm Limited.
+ * SPDX-License-Identifier: MIT OR Apache-2.0 WITH LLVM-exception
+ */
+
+#include "hornerf.h"
+#include "math_config.h"
+#include "pl_sig.h"
+#include "pl_test.h"
+
+#define Shift (0x1.8p23f)
+#define InvLn2 (0x1.715476p+0f)
+#define Ln2hi (0x1.62e4p-1f)
+#define Ln2lo (0x1.7f7d1cp-20f)
+#define AbsMask (0x7fffffff)
+#define InfLimit                                                               \
+  (0x1.644716p6) /* Smallest value of x for which expm1(x) overflows.  */
+#define NegLimit                                                               \
+  (-0x1.9bbabcp+6) /* Largest value of x for which expm1(x) rounds to 1.  */
+
+#define C(i) __expm1f_poly[i]
+
+/* Approximation for exp(x) - 1 using polynomial on a reduced interval.
+   The maximum error is 1.51 ULP:
+   expm1f(0x1.8baa96p-2) got 0x1.e2fb9p-2
+			want 0x1.e2fb94p-2.  */
+float
+expm1f (float x)
+{
+  uint32_t ix = asuint (x);
+  uint32_t ax = ix & AbsMask;
+
+  /* Tiny: |x| < 0x1p-23. expm1(x) is closely approximated by x.
+     Inf:  x == +Inf => expm1(x) = x.  */
+  if (ax <= 0x34000000 || (ix == 0x7f800000))
+    return x;
+
+  /* +/-NaN.  */
+  if (ax > 0x7f800000)
+    return __math_invalidf (x);
+
+  if (x >= InfLimit)
+    return __math_oflowf (0);
+
+  if (x <= NegLimit || ix == 0xff800000)
+    return -1;
+
+  /* Reduce argument to smaller range:
+     Let i = round(x / ln2)
+     and f = x - i * ln2, then f is in [-ln2/2, ln2/2].
+     exp(x) - 1 = 2^i * (expm1(f) + 1) - 1
+     where 2^i is exact because i is an integer.  */
+  float j = fmaf (InvLn2, x, Shift) - Shift;
+  int32_t i = j;
+  float f = fmaf (j, -Ln2hi, x);
+  f = fmaf (j, -Ln2lo, f);
+
+  /* Approximate expm1(f) using polynomial.
+     Taylor expansion for expm1(x) has the form:
+	 x + ax^2 + bx^3 + cx^4 ....
+     So we calculate the polynomial P(f) = a + bf + cf^2 + ...
+     and assemble the approximation expm1(f) ~= f + f^2 * P(f).  */
+  float p = fmaf (f * f, HORNER_4 (f, C), f);
+  /* Assemble the result, using a slight rearrangement to achieve acceptable
+     accuracy.
+     expm1(x) ~= 2^i * (p + 1) - 1
+     Let t = 2^(i - 1).  */
+  float t = ldexpf (0.5f, i);
+  /* expm1(x) ~= 2 * (p * t + (t - 1/2)).  */
+  return 2 * fmaf (p, t, t - 0.5f);
+}
+
+PL_SIG (S, F, 1, expm1, -9.9, 9.9)
+PL_TEST_ULP (expm1f, 1.02)
+PL_TEST_INTERVAL (expm1f, 0, 0x1p-23, 1000)
+PL_TEST_INTERVAL (expm1f, -0, -0x1p-23, 1000)
+PL_TEST_INTERVAL (expm1f, 0x1p-23, 0x1.644716p6, 100000)
+PL_TEST_INTERVAL (expm1f, -0x1p-23, -0x1.9bbabcp+6, 100000)