/*
* Copyright 2014 Google Inc.
*
* Use of this source code is governed by a BSD-style license that can be
* found in the LICENSE file.
*/
#include "SkPatchUtils.h"
#include "SkArenaAlloc.h"
#include "SkColorData.h"
#include "SkColorSpacePriv.h"
#include "SkConvertPixels.h"
#include "SkGeometry.h"
#include "SkTo.h"
namespace {
enum CubicCtrlPts {
kTopP0_CubicCtrlPts = 0,
kTopP1_CubicCtrlPts = 1,
kTopP2_CubicCtrlPts = 2,
kTopP3_CubicCtrlPts = 3,
kRightP0_CubicCtrlPts = 3,
kRightP1_CubicCtrlPts = 4,
kRightP2_CubicCtrlPts = 5,
kRightP3_CubicCtrlPts = 6,
kBottomP0_CubicCtrlPts = 9,
kBottomP1_CubicCtrlPts = 8,
kBottomP2_CubicCtrlPts = 7,
kBottomP3_CubicCtrlPts = 6,
kLeftP0_CubicCtrlPts = 0,
kLeftP1_CubicCtrlPts = 11,
kLeftP2_CubicCtrlPts = 10,
kLeftP3_CubicCtrlPts = 9,
};
// Enum for corner also clockwise.
enum Corner {
kTopLeft_Corner = 0,
kTopRight_Corner,
kBottomRight_Corner,
kBottomLeft_Corner
};
}
/**
* Evaluator to sample the values of a cubic bezier using forward differences.
* Forward differences is a method for evaluating a nth degree polynomial at a uniform step by only
* adding precalculated values.
* For a linear example we have the function f(t) = m*t+b, then the value of that function at t+h
* would be f(t+h) = m*(t+h)+b. If we want to know the uniform step that we must add to the first
* evaluation f(t) then we need to substract f(t+h) - f(t) = m*t + m*h + b - m*t + b = mh. After
* obtaining this value (mh) we could just add this constant step to our first sampled point
* to compute the next one.
*
* For the cubic case the first difference gives as a result a quadratic polynomial to which we can
* apply again forward differences and get linear function to which we can apply again forward
* differences to get a constant difference. This is why we keep an array of size 4, the 0th
* position keeps the sampled value while the next ones keep the quadratic, linear and constant
* difference values.
*/
class FwDCubicEvaluator {
public:
/**
* Receives the 4 control points of the cubic bezier.
*/
explicit FwDCubicEvaluator(const SkPoint points[4])
: fCoefs(points) {
memcpy(fPoints, points, 4 * sizeof(SkPoint));
this->restart(1);
}
/**
* Restarts the forward differences evaluator to the first value of t = 0.
*/
void restart(int divisions) {
fDivisions = divisions;
fCurrent = 0;
fMax = fDivisions + 1;
Sk2s h = Sk2s(1.f / fDivisions);
Sk2s h2 = h * h;
Sk2s h3 = h2 * h;
Sk2s fwDiff3 = Sk2s(6) * fCoefs.fA * h3;
fFwDiff[3] = to_point(fwDiff3);
fFwDiff[2] = to_point(fwDiff3 + times_2(fCoefs.fB) * h2);
fFwDiff[1] = to_point(fCoefs.fA * h3 + fCoefs.fB * h2 + fCoefs.fC * h);
fFwDiff[0] = to_point(fCoefs.fD);
}
/**
* Check if the evaluator is still within the range of 0<=t<=1
*/
bool done() const {
return fCurrent > fMax;
}
/**
* Call next to obtain the SkPoint sampled and move to the next one.
*/
SkPoint next() {
SkPoint point = fFwDiff[0];
fFwDiff[0] += fFwDiff[1];
fFwDiff[1] += fFwDiff[2];
fFwDiff[2] += fFwDiff[3];
fCurrent++;
return point;
}
const SkPoint* getCtrlPoints() const {
return fPoints;
}
private:
SkCubicCoeff fCoefs;
int fMax, fCurrent, fDivisions;
SkPoint fFwDiff[4], fPoints[4];
};
////////////////////////////////////////////////////////////////////////////////
// size in pixels of each partition per axis, adjust this knob
static const int kPartitionSize = 10;
/**
* Calculate the approximate arc length given a bezier curve's control points.
* Returns -1 if bad calc (i.e. non-finite)
*/
static SkScalar approx_arc_length(const SkPoint points[], int count) {
if (count < 2) {
return 0;
}
SkScalar arcLength = 0;
for (int i = 0; i < count - 1; i++) {
arcLength += SkPoint::Distance(points[i], points[i + 1]);
}
return SkScalarIsFinite(arcLength) ? arcLength : -1;
}
static SkScalar bilerp(SkScalar tx, SkScalar ty, SkScalar c00, SkScalar c10, SkScalar c01,
SkScalar c11) {
SkScalar a = c00 * (1.f - tx) + c10 * tx;
SkScalar b = c01 * (1.f - tx) + c11 * tx;
return a * (1.f - ty) + b * ty;
}
static Sk4f bilerp(SkScalar tx, SkScalar ty,
const Sk4f& c00, const Sk4f& c10, const Sk4f& c01, const Sk4f& c11) {
Sk4f a = c00 * (1.f - tx) + c10 * tx;
Sk4f b = c01 * (1.f - tx) + c11 * tx;
return a * (1.f - ty) + b * ty;
}
SkISize SkPatchUtils::GetLevelOfDetail(const SkPoint cubics[12], const SkMatrix* matrix) {
// Approximate length of each cubic.
SkPoint pts[kNumPtsCubic];
SkPatchUtils::GetTopCubic(cubics, pts);
matrix->mapPoints(pts, kNumPtsCubic);
SkScalar topLength = approx_arc_length(pts, kNumPtsCubic);
SkPatchUtils::GetBottomCubic(cubics, pts);
matrix->mapPoints(pts, kNumPtsCubic);
SkScalar bottomLength = approx_arc_length(pts, kNumPtsCubic);
SkPatchUtils::GetLeftCubic(cubics, pts);
matrix->mapPoints(pts, kNumPtsCubic);
SkScalar leftLength = approx_arc_length(pts, kNumPtsCubic);
SkPatchUtils::GetRightCubic(cubics, pts);
matrix->mapPoints(pts, kNumPtsCubic);
SkScalar rightLength = approx_arc_length(pts, kNumPtsCubic);
if (topLength < 0 || bottomLength < 0 || leftLength < 0 || rightLength < 0) {
return {0, 0}; // negative length is a sentinel for bad length (i.e. non-finite)
}
// Level of detail per axis, based on the larger side between top and bottom or left and right
int lodX = static_cast<int>(SkMaxScalar(topLength, bottomLength) / kPartitionSize);
int lodY = static_cast<int>(SkMaxScalar(leftLength, rightLength) / kPartitionSize);
return SkISize::Make(SkMax32(8, lodX), SkMax32(8, lodY));
}
void SkPatchUtils::GetTopCubic(const SkPoint cubics[12], SkPoint points[4]) {
points[0] = cubics[kTopP0_CubicCtrlPts];
points[1] = cubics[kTopP1_CubicCtrlPts];
points[2] = cubics[kTopP2_CubicCtrlPts];
points[3] = cubics[kTopP3_CubicCtrlPts];
}
void SkPatchUtils::GetBottomCubic(const SkPoint cubics[12], SkPoint points[4]) {
points[0] = cubics[kBottomP0_CubicCtrlPts];
points[1] = cubics[kBottomP1_CubicCtrlPts];
points[2] = cubics[kBottomP2_CubicCtrlPts];
points[3] = cubics[kBottomP3_CubicCtrlPts];
}
void SkPatchUtils::GetLeftCubic(const SkPoint cubics[12], SkPoint points[4]) {
points[0] = cubics[kLeftP0_CubicCtrlPts];
points[1] = cubics[kLeftP1_CubicCtrlPts];
points[2] = cubics[kLeftP2_CubicCtrlPts];
points[3] = cubics[kLeftP3_CubicCtrlPts];
}
void SkPatchUtils::GetRightCubic(const SkPoint cubics[12], SkPoint points[4]) {
points[0] = cubics[kRightP0_CubicCtrlPts];
points[1] = cubics[kRightP1_CubicCtrlPts];
points[2] = cubics[kRightP2_CubicCtrlPts];
points[3] = cubics[kRightP3_CubicCtrlPts];
}
static void skcolor_to_float(SkPMColor4f* dst, const SkColor* src, int count, SkColorSpace* dstCS) {
SkImageInfo srcInfo = SkImageInfo::Make(count, 1, kBGRA_8888_SkColorType,
kUnpremul_SkAlphaType, SkColorSpace::MakeSRGB());
SkImageInfo dstInfo = SkImageInfo::Make(count, 1, kRGBA_F32_SkColorType,
kPremul_SkAlphaType, sk_ref_sp(dstCS));
SkConvertPixels(dstInfo, dst, 0, srcInfo, src, 0);
}
static void float_to_skcolor(SkColor* dst, const SkPMColor4f* src, int count, SkColorSpace* srcCS) {
SkImageInfo srcInfo = SkImageInfo::Make(count, 1, kRGBA_F32_SkColorType,
kPremul_SkAlphaType, sk_ref_sp(srcCS));
SkImageInfo dstInfo = SkImageInfo::Make(count, 1, kBGRA_8888_SkColorType,
kUnpremul_SkAlphaType, SkColorSpace::MakeSRGB());
SkConvertPixels(dstInfo, dst, 0, srcInfo, src, 0);
}
sk_sp<SkVertices> SkPatchUtils::MakeVertices(const SkPoint cubics[12], const SkColor srcColors[4],
const SkPoint srcTexCoords[4], int lodX, int lodY,
SkColorSpace* colorSpace) {
if (lodX < 1 || lodY < 1 || nullptr == cubics) {
return nullptr;
}
// check for overflow in multiplication
const int64_t lodX64 = (lodX + 1),
lodY64 = (lodY + 1),
mult64 = lodX64 * lodY64;
if (mult64 > SK_MaxS32) {
return nullptr;
}
// Treat null interpolation space as sRGB.
if (!colorSpace) {
colorSpace = sk_srgb_singleton();
}
int vertexCount = SkToS32(mult64);
// it is recommended to generate draw calls of no more than 65536 indices, so we never generate
// more than 60000 indices. To accomplish that we resize the LOD and vertex count
if (vertexCount > 10000 || lodX > 200 || lodY > 200) {
float weightX = static_cast<float>(lodX) / (lodX + lodY);
float weightY = static_cast<float>(lodY) / (lodX + lodY);
// 200 comes from the 100 * 2 which is the max value of vertices because of the limit of
// 60000 indices ( sqrt(60000 / 6) that comes from data->fIndexCount = lodX * lodY * 6)
// Need a min of 1 since we later divide by lod
lodX = std::max(1, sk_float_floor2int_no_saturate(weightX * 200));
lodY = std::max(1, sk_float_floor2int_no_saturate(weightY * 200));
vertexCount = (lodX + 1) * (lodY + 1);
}
const int indexCount = lodX * lodY * 6;
uint32_t flags = 0;
if (srcTexCoords) {
flags |= SkVertices::kHasTexCoords_BuilderFlag;
}
if (srcColors) {
flags |= SkVertices::kHasColors_BuilderFlag;
}
SkSTArenaAlloc<2048> alloc;
SkPMColor4f* cornerColors = srcColors ? alloc.makeArray<SkPMColor4f>(4) : nullptr;
SkPMColor4f* tmpColors = srcColors ? alloc.makeArray<SkPMColor4f>(vertexCount) : nullptr;
SkVertices::Builder builder(SkVertices::kTriangles_VertexMode, vertexCount, indexCount, flags);
SkPoint* pos = builder.positions();
SkPoint* texs = builder.texCoords();
uint16_t* indices = builder.indices();
if (cornerColors) {
skcolor_to_float(cornerColors, srcColors, kNumCorners, colorSpace);
}
SkPoint pts[kNumPtsCubic];
SkPatchUtils::GetBottomCubic(cubics, pts);
FwDCubicEvaluator fBottom(pts);
SkPatchUtils::GetTopCubic(cubics, pts);
FwDCubicEvaluator fTop(pts);
SkPatchUtils::GetLeftCubic(cubics, pts);
FwDCubicEvaluator fLeft(pts);
SkPatchUtils::GetRightCubic(cubics, pts);
FwDCubicEvaluator fRight(pts);
fBottom.restart(lodX);
fTop.restart(lodX);
SkScalar u = 0.0f;
int stride = lodY + 1;
for (int x = 0; x <= lodX; x++) {
SkPoint bottom = fBottom.next(), top = fTop.next();
fLeft.restart(lodY);
fRight.restart(lodY);
SkScalar v = 0.f;
for (int y = 0; y <= lodY; y++) {
int dataIndex = x * (lodY + 1) + y;
SkPoint left = fLeft.next(), right = fRight.next();
SkPoint s0 = SkPoint::Make((1.0f - v) * top.x() + v * bottom.x(),
(1.0f - v) * top.y() + v * bottom.y());
SkPoint s1 = SkPoint::Make((1.0f - u) * left.x() + u * right.x(),
(1.0f - u) * left.y() + u * right.y());
SkPoint s2 = SkPoint::Make(
(1.0f - v) * ((1.0f - u) * fTop.getCtrlPoints()[0].x()
+ u * fTop.getCtrlPoints()[3].x())
+ v * ((1.0f - u) * fBottom.getCtrlPoints()[0].x()
+ u * fBottom.getCtrlPoints()[3].x()),
(1.0f - v) * ((1.0f - u) * fTop.getCtrlPoints()[0].y()
+ u * fTop.getCtrlPoints()[3].y())
+ v * ((1.0f - u) * fBottom.getCtrlPoints()[0].y()
+ u * fBottom.getCtrlPoints()[3].y()));
pos[dataIndex] = s0 + s1 - s2;
if (cornerColors) {
bilerp(u, v, Sk4f::Load(cornerColors[kTopLeft_Corner].vec()),
Sk4f::Load(cornerColors[kTopRight_Corner].vec()),
Sk4f::Load(cornerColors[kBottomLeft_Corner].vec()),
Sk4f::Load(cornerColors[kBottomRight_Corner].vec()))
.store(tmpColors[dataIndex].vec());
}
if (texs) {
texs[dataIndex] = SkPoint::Make(bilerp(u, v, srcTexCoords[kTopLeft_Corner].x(),
srcTexCoords[kTopRight_Corner].x(),
srcTexCoords[kBottomLeft_Corner].x(),
srcTexCoords[kBottomRight_Corner].x()),
bilerp(u, v, srcTexCoords[kTopLeft_Corner].y(),
srcTexCoords[kTopRight_Corner].y(),
srcTexCoords[kBottomLeft_Corner].y(),
srcTexCoords[kBottomRight_Corner].y()));
}
if(x < lodX && y < lodY) {
int i = 6 * (x * lodY + y);
indices[i] = x * stride + y;
indices[i + 1] = x * stride + 1 + y;
indices[i + 2] = (x + 1) * stride + 1 + y;
indices[i + 3] = indices[i];
indices[i + 4] = indices[i + 2];
indices[i + 5] = (x + 1) * stride + y;
}
v = SkScalarClampMax(v + 1.f / lodY, 1);
}
u = SkScalarClampMax(u + 1.f / lodX, 1);
}
if (tmpColors) {
float_to_skcolor(builder.colors(), tmpColors, vertexCount, colorSpace);
}
return builder.detach();
}