godot/thirdparty/embree/kernels/subdiv/linear_bezier_patch.h

Ignoring revisions in .git-blame-ignore-revs. Click here to bypass and see the normal blame view.

444 lines
18 KiB
C++
Raw Normal View History

// Copyright 2009-2021 Intel Corporation
2021-04-20 16:38:09 +00:00
// SPDX-License-Identifier: Apache-2.0
#pragma once
#include "bezier_curve.h"
namespace embree
{
namespace isa
{
template<typename V>
struct TensorLinearQuadraticBezierSurface
{
QuadraticBezierCurve<V> L;
QuadraticBezierCurve<V> R;
__forceinline TensorLinearQuadraticBezierSurface() {}
__forceinline TensorLinearQuadraticBezierSurface(const TensorLinearQuadraticBezierSurface<V>& curve)
: L(curve.L), R(curve.R) {}
__forceinline TensorLinearQuadraticBezierSurface& operator= (const TensorLinearQuadraticBezierSurface& other) {
L = other.L; R = other.R; return *this;
}
__forceinline TensorLinearQuadraticBezierSurface(const QuadraticBezierCurve<V>& L, const QuadraticBezierCurve<V>& R)
: L(L), R(R) {}
__forceinline BBox<V> bounds() const {
return merge(L.bounds(),R.bounds());
}
};
2024-02-24 11:40:55 +00:00
#if !defined(__SYCL_DEVICE_ONLY__)
2021-04-20 16:38:09 +00:00
template<>
struct TensorLinearQuadraticBezierSurface<Vec2fa>
{
QuadraticBezierCurve<vfloat4> LR;
__forceinline TensorLinearQuadraticBezierSurface() {}
__forceinline TensorLinearQuadraticBezierSurface(const TensorLinearQuadraticBezierSurface<Vec2fa>& curve)
: LR(curve.LR) {}
__forceinline TensorLinearQuadraticBezierSurface& operator= (const TensorLinearQuadraticBezierSurface& other) {
LR = other.LR; return *this;
}
__forceinline TensorLinearQuadraticBezierSurface(const QuadraticBezierCurve<vfloat4>& LR)
: LR(LR) {}
__forceinline BBox<Vec2fa> bounds() const
{
const BBox<vfloat4> b = LR.bounds();
const BBox<Vec2fa> bl(Vec2fa(b.lower),Vec2fa(b.upper));
const BBox<Vec2fa> br(Vec2fa(shuffle<2,3,2,3>(b.lower)),Vec2fa(shuffle<2,3,2,3>(b.upper)));
return merge(bl,br);
}
};
2024-02-24 11:40:55 +00:00
#endif
2021-04-20 16:38:09 +00:00
template<typename V>
struct TensorLinearCubicBezierSurface
{
CubicBezierCurve<V> L;
CubicBezierCurve<V> R;
__forceinline TensorLinearCubicBezierSurface() {}
__forceinline TensorLinearCubicBezierSurface(const TensorLinearCubicBezierSurface& curve)
: L(curve.L), R(curve.R) {}
__forceinline TensorLinearCubicBezierSurface& operator= (const TensorLinearCubicBezierSurface& other) {
L = other.L; R = other.R; return *this;
}
__forceinline TensorLinearCubicBezierSurface(const CubicBezierCurve<V>& L, const CubicBezierCurve<V>& R)
: L(L), R(R) {}
template<template<typename T> class SourceCurve>
__forceinline static TensorLinearCubicBezierSurface fromCenterAndNormalCurve(const SourceCurve<Vec3ff>& center, const SourceCurve<Vec3fa>& normal)
{
SourceCurve<Vec3ff> vcurve = center;
SourceCurve<Vec3fa> ncurve = normal;
2022-11-24 14:45:59 +00:00
2021-04-20 16:38:09 +00:00
/* here we construct a patch which follows the curve l(t) =
* p(t) +/- r(t)*normalize(cross(n(t),dp(t))) */
const Vec3ff p0 = vcurve.eval(0.0f);
const Vec3ff dp0 = vcurve.eval_du(0.0f);
2022-11-24 14:45:59 +00:00
//const Vec3ff ddp0 = vcurve.eval_dudu(0.0f); // ddp0 is assumed to be 0
2021-04-20 16:38:09 +00:00
const Vec3fa n0 = ncurve.eval(0.0f);
const Vec3fa dn0 = ncurve.eval_du(0.0f);
const Vec3ff p1 = vcurve.eval(1.0f);
const Vec3ff dp1 = vcurve.eval_du(1.0f);
2022-11-24 14:45:59 +00:00
//const Vec3ff ddp1 = vcurve.eval_dudu(1.0f); // ddp1 is assumed to be 0
2021-04-20 16:38:09 +00:00
const Vec3fa n1 = ncurve.eval(1.0f);
const Vec3fa dn1 = ncurve.eval_du(1.0f);
const Vec3fa bt0 = cross(n0,dp0);
2022-11-24 14:45:59 +00:00
const Vec3fa dbt0 = cross(dn0,dp0);// + cross(n0,ddp0);
2021-04-20 16:38:09 +00:00
const Vec3fa bt1 = cross(n1,dp1);
2022-11-24 14:45:59 +00:00
const Vec3fa dbt1 = cross(dn1,dp1);// + cross(n1,ddp1);
2021-04-20 16:38:09 +00:00
const Vec3fa k0 = normalize(bt0);
const Vec3fa dk0 = dnormalize(bt0,dbt0);
const Vec3fa k1 = normalize(bt1);
const Vec3fa dk1 = dnormalize(bt1,dbt1);
const Vec3fa l0 = p0 - p0.w*k0;
const Vec3fa dl0 = dp0 - (dp0.w*k0 + p0.w*dk0);
const Vec3fa r0 = p0 + p0.w*k0;
const Vec3fa dr0 = dp0 + (dp0.w*k0 + p0.w*dk0);
const Vec3fa l1 = p1 - p1.w*k1;
const Vec3fa dl1 = dp1 - (dp1.w*k1 + p1.w*dk1);
const Vec3fa r1 = p1 + p1.w*k1;
const Vec3fa dr1 = dp1 + (dp1.w*k1 + p1.w*dk1);
const float scale = 1.0f/3.0f;
CubicBezierCurve<V> L(l0,l0+scale*dl0,l1-scale*dl1,l1);
CubicBezierCurve<V> R(r0,r0+scale*dr0,r1-scale*dr1,r1);
return TensorLinearCubicBezierSurface(L,R);
}
__forceinline BBox<V> bounds() const {
return merge(L.bounds(),R.bounds());
}
__forceinline BBox3fa accurateBounds() const {
return merge(L.accurateBounds(),R.accurateBounds());
}
__forceinline CubicBezierCurve<Interval1f> reduce_v() const {
return merge(CubicBezierCurve<Interval<V>>(L),CubicBezierCurve<Interval<V>>(R));
}
__forceinline LinearBezierCurve<Interval1f> reduce_u() const {
return LinearBezierCurve<Interval1f>(L.bounds(),R.bounds());
}
__forceinline TensorLinearCubicBezierSurface<float> xfm(const V& dx) const {
return TensorLinearCubicBezierSurface<float>(L.xfm(dx),R.xfm(dx));
}
2024-02-24 11:40:55 +00:00
template<int W>
__forceinline TensorLinearCubicBezierSurface<vfloat<W>> vxfm(const V& dx) const {
return TensorLinearCubicBezierSurface<vfloat<W>>(L.template vxfm<W>(dx),R.template vxfm<W>(dx));
2021-04-20 16:38:09 +00:00
}
__forceinline TensorLinearCubicBezierSurface<float> xfm(const V& dx, const V& p) const {
return TensorLinearCubicBezierSurface<float>(L.xfm(dx,p),R.xfm(dx,p));
}
__forceinline TensorLinearCubicBezierSurface<Vec3fa> xfm(const LinearSpace3fa& space) const {
return TensorLinearCubicBezierSurface(L.xfm(space),R.xfm(space));
}
__forceinline TensorLinearCubicBezierSurface<Vec3fa> xfm(const LinearSpace3fa& space, const Vec3fa& p) const {
return TensorLinearCubicBezierSurface(L.xfm(space,p),R.xfm(space,p));
}
__forceinline TensorLinearCubicBezierSurface<Vec3fa> xfm(const LinearSpace3fa& space, const Vec3fa& p, const float s) const {
return TensorLinearCubicBezierSurface(L.xfm(space,p,s),R.xfm(space,p,s));
}
__forceinline TensorLinearCubicBezierSurface clip_u(const Interval1f& u) const {
return TensorLinearCubicBezierSurface(L.clip(u),R.clip(u));
}
__forceinline TensorLinearCubicBezierSurface clip_v(const Interval1f& v) const {
return TensorLinearCubicBezierSurface(clerp(L,R,V(v.lower)),clerp(L,R,V(v.upper)));
}
__forceinline TensorLinearCubicBezierSurface clip(const Interval1f& u, const Interval1f& v) const {
return clip_v(v).clip_u(u);
}
__forceinline void split_u(TensorLinearCubicBezierSurface& left, TensorLinearCubicBezierSurface& right, const float u = 0.5f) const
{
CubicBezierCurve<V> L0,L1; L.split(L0,L1,u);
CubicBezierCurve<V> R0,R1; R.split(R0,R1,u);
new (&left ) TensorLinearCubicBezierSurface(L0,R0);
new (&right) TensorLinearCubicBezierSurface(L1,R1);
}
2024-02-24 11:40:55 +00:00
2021-04-20 16:38:09 +00:00
__forceinline TensorLinearCubicBezierSurface<Vec2vfx> vsplit_u(vboolx& valid, const BBox1f& u) const {
valid = true; clear(valid,VSIZEX-1);
return TensorLinearCubicBezierSurface<Vec2vfx>(L.split(u),R.split(u));
}
2024-02-24 11:40:55 +00:00
template<int W>
__forceinline TensorLinearCubicBezierSurface<Vec2vf<W>> vsplit_u(vbool<W>& valid, const BBox1f& u, int& i, int N) const
{
valid = true; clear(valid,W-1);
auto r = TensorLinearCubicBezierSurface<Vec2vf<W>>(L.template split<W>(u,i,N),R.template split<W>(u,i,N));
i += W-1;
return r;
}
2021-04-20 16:38:09 +00:00
__forceinline V eval(const float u, const float v) const {
return clerp(L,R,V(v)).eval(u);
}
__forceinline V eval_du(const float u, const float v) const {
return clerp(L,R,V(v)).eval_dt(u);
}
__forceinline V eval_dv(const float u, const float v) const {
return (R-L).eval(u);
}
__forceinline void eval(const float u, const float v, V& p, V& dpdu, V& dpdv) const
{
V p0, dp0du; L.eval(u,p0,dp0du);
V p1, dp1du; R.eval(u,p1,dp1du);
p = lerp(p0,p1,v);
dpdu = lerp(dp0du,dp1du,v);
dpdv = p1-p0;
}
__forceinline TensorLinearQuadraticBezierSurface<V> derivative_u() const {
return TensorLinearQuadraticBezierSurface<V>(L.derivative(),R.derivative());
}
__forceinline CubicBezierCurve<V> derivative_v() const {
return R-L;
}
__forceinline V axis_u() const {
return (L.end()-L.begin())+(R.end()-R.begin());
}
__forceinline V axis_v() const {
return (R.begin()-L.begin())+(R.end()-L.end());
}
friend embree_ostream operator<<(embree_ostream cout, const TensorLinearCubicBezierSurface& a)
{
return cout << "TensorLinearCubicBezierSurface" << embree_endl
<< "{" << embree_endl
<< " L = " << a.L << ", " << embree_endl
<< " R = " << a.R << embree_endl
<< "}";
}
friend __forceinline TensorLinearCubicBezierSurface clerp(const TensorLinearCubicBezierSurface& a, const TensorLinearCubicBezierSurface& b, const float t) {
return TensorLinearCubicBezierSurface(clerp(a.L,b.L,V(t)), clerp(a.R,b.R,V(t)));
}
};
2024-02-24 11:40:55 +00:00
#if !defined(__SYCL_DEVICE_ONLY__)
2021-04-20 16:38:09 +00:00
template<>
struct TensorLinearCubicBezierSurface<Vec2fa>
{
CubicBezierCurve<vfloat4> LR;
__forceinline TensorLinearCubicBezierSurface() {}
__forceinline TensorLinearCubicBezierSurface(const TensorLinearCubicBezierSurface& curve)
: LR(curve.LR) {}
__forceinline TensorLinearCubicBezierSurface& operator= (const TensorLinearCubicBezierSurface& other) {
LR = other.LR; return *this;
}
__forceinline TensorLinearCubicBezierSurface(const CubicBezierCurve<vfloat4>& LR)
: LR(LR) {}
__forceinline TensorLinearCubicBezierSurface(const CubicBezierCurve<Vec2fa>& L, const CubicBezierCurve<Vec2fa>& R)
: LR(shuffle<0,1,0,1>(vfloat4(L.v0),vfloat4(R.v0)),shuffle<0,1,0,1>(vfloat4(L.v1),vfloat4(R.v1)),shuffle<0,1,0,1>(vfloat4(L.v2),vfloat4(R.v2)),shuffle<0,1,0,1>(vfloat4(L.v3),vfloat4(R.v3))) {}
__forceinline CubicBezierCurve<Vec2fa> getL() const {
return CubicBezierCurve<Vec2fa>(Vec2fa(LR.v0),Vec2fa(LR.v1),Vec2fa(LR.v2),Vec2fa(LR.v3));
}
__forceinline CubicBezierCurve<Vec2fa> getR() const {
return CubicBezierCurve<Vec2fa>(Vec2fa(shuffle<2,3,2,3>(LR.v0)),Vec2fa(shuffle<2,3,2,3>(LR.v1)),Vec2fa(shuffle<2,3,2,3>(LR.v2)),Vec2fa(shuffle<2,3,2,3>(LR.v3)));
}
__forceinline BBox<Vec2fa> bounds() const
{
const BBox<vfloat4> b = LR.bounds();
const BBox<Vec2fa> bl(Vec2fa(b.lower),Vec2fa(b.upper));
const BBox<Vec2fa> br(Vec2fa(shuffle<2,3,2,3>(b.lower)),Vec2fa(shuffle<2,3,2,3>(b.upper)));
return merge(bl,br);
}
__forceinline BBox1f bounds(const Vec2fa& axis) const
{
const CubicBezierCurve<vfloat4> LRx = LR;
const CubicBezierCurve<vfloat4> LRy(shuffle<1,0,3,2>(LR.v0),shuffle<1,0,3,2>(LR.v1),shuffle<1,0,3,2>(LR.v2),shuffle<1,0,3,2>(LR.v3));
const CubicBezierCurve<vfloat4> LRa = cmadd(shuffle<0>(vfloat4(axis)),LRx,shuffle<1>(vfloat4(axis))*LRy);
const BBox<vfloat4> Lb = LRa.bounds();
const BBox<vfloat4> Rb(shuffle<3>(Lb.lower),shuffle<3>(Lb.upper));
const BBox<vfloat4> b = merge(Lb,Rb);
return BBox1f(b.lower[0],b.upper[0]);
}
__forceinline TensorLinearCubicBezierSurface<float> xfm(const Vec2fa& dx) const
{
const CubicBezierCurve<vfloat4> LRx = LR;
const CubicBezierCurve<vfloat4> LRy(shuffle<1,0,3,2>(LR.v0),shuffle<1,0,3,2>(LR.v1),shuffle<1,0,3,2>(LR.v2),shuffle<1,0,3,2>(LR.v3));
const CubicBezierCurve<vfloat4> LRa = cmadd(shuffle<0>(vfloat4(dx)),LRx,shuffle<1>(vfloat4(dx))*LRy);
return TensorLinearCubicBezierSurface<float>(CubicBezierCurve<float>(LRa.v0[0],LRa.v1[0],LRa.v2[0],LRa.v3[0]),
CubicBezierCurve<float>(LRa.v0[2],LRa.v1[2],LRa.v2[2],LRa.v3[2]));
}
__forceinline TensorLinearCubicBezierSurface<float> xfm(const Vec2fa& dx, const Vec2fa& p) const
{
const vfloat4 pxyxy = shuffle<0,1,0,1>(vfloat4(p));
const CubicBezierCurve<vfloat4> LRx = LR-pxyxy;
const CubicBezierCurve<vfloat4> LRy(shuffle<1,0,3,2>(LR.v0),shuffle<1,0,3,2>(LR.v1),shuffle<1,0,3,2>(LR.v2),shuffle<1,0,3,2>(LR.v3));
const CubicBezierCurve<vfloat4> LRa = cmadd(shuffle<0>(vfloat4(dx)),LRx,shuffle<1>(vfloat4(dx))*LRy);
return TensorLinearCubicBezierSurface<float>(CubicBezierCurve<float>(LRa.v0[0],LRa.v1[0],LRa.v2[0],LRa.v3[0]),
CubicBezierCurve<float>(LRa.v0[2],LRa.v1[2],LRa.v2[2],LRa.v3[2]));
}
__forceinline TensorLinearCubicBezierSurface clip_u(const Interval1f& u) const {
return TensorLinearCubicBezierSurface(LR.clip(u));
}
__forceinline TensorLinearCubicBezierSurface clip_v(const Interval1f& v) const
{
const CubicBezierCurve<vfloat4> LL(shuffle<0,1,0,1>(LR.v0),shuffle<0,1,0,1>(LR.v1),shuffle<0,1,0,1>(LR.v2),shuffle<0,1,0,1>(LR.v3));
const CubicBezierCurve<vfloat4> RR(shuffle<2,3,2,3>(LR.v0),shuffle<2,3,2,3>(LR.v1),shuffle<2,3,2,3>(LR.v2),shuffle<2,3,2,3>(LR.v3));
return TensorLinearCubicBezierSurface(clerp(LL,RR,vfloat4(v.lower,v.lower,v.upper,v.upper)));
}
__forceinline TensorLinearCubicBezierSurface clip(const Interval1f& u, const Interval1f& v) const {
return clip_v(v).clip_u(u);
}
__forceinline void split_u(TensorLinearCubicBezierSurface& left, TensorLinearCubicBezierSurface& right, const float u = 0.5f) const
{
CubicBezierCurve<vfloat4> LR0,LR1; LR.split(LR0,LR1,u);
new (&left ) TensorLinearCubicBezierSurface(LR0);
new (&right) TensorLinearCubicBezierSurface(LR1);
}
2024-02-24 11:40:55 +00:00
2021-04-20 16:38:09 +00:00
__forceinline TensorLinearCubicBezierSurface<Vec2vfx> vsplit_u(vboolx& valid, const BBox1f& u) const {
valid = true; clear(valid,VSIZEX-1);
return TensorLinearCubicBezierSurface<Vec2vfx>(getL().split(u),getR().split(u));
}
2024-02-24 11:40:55 +00:00
template<int W>
__forceinline TensorLinearCubicBezierSurface<Vec2vf<W>> vsplit_u(vbool<W>& valid, const BBox1f& u, int& i, int N) const {
valid = true; clear(valid,W-1);
auto r = TensorLinearCubicBezierSurface<Vec2vf<W>>(getL().split<W>(u,i,N),getR().split<W>(u,i,N));
i += W-1;
return r;
}
2021-04-20 16:38:09 +00:00
__forceinline Vec2fa eval(const float u, const float v) const
{
const vfloat4 p = LR.eval(u);
return Vec2fa(lerp(shuffle<0,1,0,1>(p),shuffle<2,3,2,3>(p),v));
}
__forceinline Vec2fa eval_du(const float u, const float v) const
{
const vfloat4 dpdu = LR.eval_dt(u);
return Vec2fa(lerp(shuffle<0,1,0,1>(dpdu),shuffle<2,3,2,3>(dpdu),v));
}
__forceinline Vec2fa eval_dv(const float u, const float v) const
{
const vfloat4 p = LR.eval(u);
return Vec2fa(shuffle<2,3,2,3>(p)-shuffle<0,1,0,1>(p));
}
__forceinline void eval(const float u, const float v, Vec2fa& p, Vec2fa& dpdu, Vec2fa& dpdv) const
{
vfloat4 p0, dp0du; LR.eval(u,p0,dp0du);
p = Vec2fa(lerp(shuffle<0,1,0,1>(p0),shuffle<2,3,2,3>(p0),v));
dpdu = Vec2fa(lerp(shuffle<0,1,0,1>(dp0du),shuffle<2,3,2,3>(dp0du),v));
dpdv = Vec2fa(shuffle<2,3,2,3>(p0)-shuffle<0,1,0,1>(p0));
}
__forceinline TensorLinearQuadraticBezierSurface<Vec2fa> derivative_u() const {
return TensorLinearQuadraticBezierSurface<Vec2fa>(LR.derivative());
}
__forceinline CubicBezierCurve<Vec2fa> derivative_v() const {
return getR()-getL();
}
__forceinline Vec2fa axis_u() const
{
const CubicBezierCurve<Vec2fa> L = getL();
const CubicBezierCurve<Vec2fa> R = getR();
return (L.end()-L.begin())+(R.end()-R.begin());
}
__forceinline Vec2fa axis_v() const
{
const CubicBezierCurve<Vec2fa> L = getL();
const CubicBezierCurve<Vec2fa> R = getR();
return (R.begin()-L.begin())+(R.end()-L.end());
}
friend embree_ostream operator<<(embree_ostream cout, const TensorLinearCubicBezierSurface& a)
{
return cout << "TensorLinearCubicBezierSurface" << embree_endl
<< "{" << embree_endl
<< " L = " << a.getL() << ", " << embree_endl
<< " R = " << a.getR() << embree_endl
<< "}";
}
};
2024-02-24 11:40:55 +00:00
template<>
__forceinline TensorLinearCubicBezierSurface<Vec2f> TensorLinearCubicBezierSurface<Vec2fa>::vsplit_u<1>(bool& valid, const BBox1f& u, int& i, int N) const {
auto r = TensorLinearCubicBezierSurface<Vec2f>(getL().split1(u,i,N),getR().split1(u,i,N));
valid = true; i += 1;
return r;
}
#else
template<> template<>
__forceinline TensorLinearCubicBezierSurface<Vec2f> TensorLinearCubicBezierSurface<Vec2fa>::vsplit_u<1>(bool& valid, const BBox1f& u, int& i, int N) const {
auto r = TensorLinearCubicBezierSurface<Vec2f>(L.split1(u,i,N),R.split1(u,i,N));
valid = true; i += 1;
return r;
}
#endif
2021-04-20 16:38:09 +00:00
typedef TensorLinearCubicBezierSurface<float> TensorLinearCubicBezierSurface1f;
typedef TensorLinearCubicBezierSurface<Vec2fa> TensorLinearCubicBezierSurface2fa;
typedef TensorLinearCubicBezierSurface<Vec3fa> TensorLinearCubicBezierSurface3fa;
}
}