Add m-esr52 at 52.6.0

1 files changed, 151 insertions, 0 deletions

diff --git a/dom/smil/nsSMILKeySpline.cpp b/dom/smil/nsSMILKeySpline.cpp
new file mode 100644
index 000000000..716437aab
--- /dev/null
+++ b/dom/smil/nsSMILKeySpline.cpp
@@ -0,0 +1,151 @@
+/* -*- Mode: C++; tab-width: 8; indent-tabs-mode: nil; c-basic-offset: 2 -*- */
+/* vim: set ts=8 sts=2 et sw=2 tw=80: */
+/* This Source Code Form is subject to the terms of the Mozilla Public
+ * License, v. 2.0. If a copy of the MPL was not distributed with this
+ * file, You can obtain one at http://mozilla.org/MPL/2.0/. */
+
+#include "nsSMILKeySpline.h"
+#include <stdint.h>
+#include <math.h>
+
+#define NEWTON_ITERATIONS          4
+#define NEWTON_MIN_SLOPE           0.02
+#define SUBDIVISION_PRECISION      0.0000001
+#define SUBDIVISION_MAX_ITERATIONS 10
+
+const double nsSMILKeySpline::kSampleStepSize =
+                                        1.0 / double(kSplineTableSize - 1);
+
+void
+nsSMILKeySpline::Init(double aX1,
+                      double aY1,
+                      double aX2,
+                      double aY2)
+{
+  mX1 = aX1;
+  mY1 = aY1;
+  mX2 = aX2;
+  mY2 = aY2;
+
+  if (mX1 != mY1 || mX2 != mY2)
+    CalcSampleValues();
+}
+
+double
+nsSMILKeySpline::GetSplineValue(double aX) const
+{
+  if (mX1 == mY1 && mX2 == mY2)
+    return aX;
+
+  return CalcBezier(GetTForX(aX), mY1, mY2);
+}
+
+void
+nsSMILKeySpline::GetSplineDerivativeValues(double aX, double& aDX, double& aDY) const
+{
+  double t = GetTForX(aX);
+  aDX = GetSlope(t, mX1, mX2);
+  aDY = GetSlope(t, mY1, mY2);
+}
+
+void
+nsSMILKeySpline::CalcSampleValues()
+{
+  for (uint32_t i = 0; i < kSplineTableSize; ++i) {
+    mSampleValues[i] = CalcBezier(double(i) * kSampleStepSize, mX1, mX2);
+  }
+}
+
+/*static*/ double
+nsSMILKeySpline::CalcBezier(double aT,
+                            double aA1,
+                            double aA2)
+{
+  // use Horner's scheme to evaluate the Bezier polynomial
+  return ((A(aA1, aA2)*aT + B(aA1, aA2))*aT + C(aA1))*aT;
+}
+
+/*static*/ double
+nsSMILKeySpline::GetSlope(double aT,
+                          double aA1,
+                          double aA2)
+{
+  return 3.0 * A(aA1, aA2)*aT*aT + 2.0 * B(aA1, aA2) * aT + C(aA1);
+}
+
+double
+nsSMILKeySpline::GetTForX(double aX) const
+{
+  // Early return when aX == 1.0 to avoid floating-point inaccuracies.
+  if (aX == 1.0) {
+    return 1.0;
+  }
+  // Find interval where t lies
+  double intervalStart = 0.0;
+  const double* currentSample = &mSampleValues[1];
+  const double* const lastSample = &mSampleValues[kSplineTableSize - 1];
+  for (; currentSample != lastSample && *currentSample <= aX;
+        ++currentSample) {
+    intervalStart += kSampleStepSize;
+  }
+  --currentSample; // t now lies between *currentSample and *currentSample+1
+
+  // Interpolate to provide an initial guess for t
+  double dist = (aX - *currentSample) /
+                (*(currentSample+1) - *currentSample);
+  double guessForT = intervalStart + dist * kSampleStepSize;
+
+  // Check the slope to see what strategy to use. If the slope is too small
+  // Newton-Raphson iteration won't converge on a root so we use bisection
+  // instead.
+  double initialSlope = GetSlope(guessForT, mX1, mX2);
+  if (initialSlope >= NEWTON_MIN_SLOPE) {
+    return NewtonRaphsonIterate(aX, guessForT);
+  } else if (initialSlope == 0.0) {
+    return guessForT;
+  } else {
+    return BinarySubdivide(aX, intervalStart, intervalStart + kSampleStepSize);
+  }
+}
+
+double
+nsSMILKeySpline::NewtonRaphsonIterate(double aX, double aGuessT) const
+{
+  // Refine guess with Newton-Raphson iteration
+  for (uint32_t i = 0; i < NEWTON_ITERATIONS; ++i) {
+    // We're trying to find where f(t) = aX,
+    // so we're actually looking for a root for: CalcBezier(t) - aX
+    double currentX = CalcBezier(aGuessT, mX1, mX2) - aX;
+    double currentSlope = GetSlope(aGuessT, mX1, mX2);
+
+    if (currentSlope == 0.0)
+      return aGuessT;
+
+    aGuessT -= currentX / currentSlope;
+  }
+
+  return aGuessT;
+}
+
+double
+nsSMILKeySpline::BinarySubdivide(double aX, double aA, double aB) const
+{
+  double currentX;
+  double currentT;
+  uint32_t i = 0;
+
+  do
+  {
+    currentT = aA + (aB - aA) / 2.0;
+    currentX = CalcBezier(currentT, mX1, mX2) - aX;
+
+    if (currentX > 0.0) {
+      aB = currentT;
+    } else {
+      aA = currentT;
+    }
+  } while (fabs(currentX) > SUBDIVISION_PRECISION
+           && ++i < SUBDIVISION_MAX_ITERATIONS);
+
+  return currentT;
+}