Revision b995ce76b9eb71a302a3716e08502ee0d2705ed0 authored by Alec Jacobson on 06 June 2018, 23:03:22 UTC, committed by Alec Jacobson on 06 June 2018, 23:03:22 UTC
1 parent 1b5700d
UT_SolidAngle.h
/*
* Copyright (c) 2018 Side Effects Software Inc.
*
* Permission is hereby granted, free of charge, to any person obtaining a copy
* of this software and associated documentation files (the "Software"), to deal
* in the Software without restriction, including without limitation the rights
* to use, copy, modify, merge, publish, distribute, sublicense, and/or sell
* copies of the Software, and to permit persons to whom the Software is
* furnished to do so, subject to the following conditions:
*
* The above copyright notice and this permission notice shall be included in all
* copies or substantial portions of the Software.
*
* THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR
* IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,
* FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE
* AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER
* LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM,
* OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE
* SOFTWARE.
*
* COMMENTS:
* Functions and structures for computing solid angles.
*/
#pragma once
#ifndef __HDK_UT_SolidAngle_h__
#define __HDK_UT_SolidAngle_h__
#include "UT_BVH.h"
#include "UT_FixedVector.h"
#include "SYS/SYS_Math.h"
#include <memory>
namespace HDK_Sample {
template<typename T>
using UT_Vector2T = UT_FixedVector<T,2>;
template<typename T>
using UT_Vector3T = UT_FixedVector<T,3>;
template <typename T>
SYS_FORCE_INLINE T cross(const UT_Vector2T<T> &v1, const UT_Vector2T<T> &v2)
{
return v1[0]*v2[1] - v1[1]*v2[0];
}
template <typename T>
SYS_FORCE_INLINE
UT_Vector3T<T> cross(const UT_Vector3T<T> &v1, const UT_Vector3T<T> &v2)
{
UT_Vector3T<T> result;
// compute the cross product:
result[0] = v1[1]*v2[2] - v1[2]*v2[1];
result[1] = v1[2]*v2[0] - v1[0]*v2[2];
result[2] = v1[0]*v2[1] - v1[1]*v2[0];
return result;
}
/// Returns the signed solid angle subtended by triangle abc
/// from query point.
///
/// WARNING: This uses the right-handed normal convention, whereas most of
/// Houdini uses the left-handed normal convention, so either
/// negate the output, or swap b and c if you want it to be
/// positive inside and negative outside.
template<typename T>
T UTsignedSolidAngleTri(
const UT_Vector3T<T> &a,
const UT_Vector3T<T> &b,
const UT_Vector3T<T> &c,
const UT_Vector3T<T> &query)
{
// Make a, b, and c relative to query
UT_Vector3T<T> qa = a-query;
UT_Vector3T<T> qb = b-query;
UT_Vector3T<T> qc = c-query;
const T alength = qa.length();
const T blength = qb.length();
const T clength = qc.length();
// If any triangle vertices are coincident with query,
// query is on the surface, which we treat as no solid angle.
if (alength == 0 || blength == 0 || clength == 0)
return T(0);
// Normalize the vectors
qa /= alength;
qb /= blength;
qc /= clength;
// The formula on Wikipedia has roughly dot(qa,cross(qb,qc)),
// but that's unstable when qa, qb, and qc are very close,
// (e.g. if the input triangle was very far away).
// This should be equivalent, but more stable.
const T numerator = dot(qa, cross(qb-qa, qc-qa));
// If numerator is 0, regardless of denominator, query is on the
// surface, which we treat as no solid angle.
if (numerator == 0)
return T(0);
const T denominator = T(1) + dot(qa,qb) + dot(qa,qc) + dot(qb,qc);
return T(2)*SYSatan2(numerator, denominator);
}
template<typename T>
T UTsignedSolidAngleQuad(
const UT_Vector3T<T> &a,
const UT_Vector3T<T> &b,
const UT_Vector3T<T> &c,
const UT_Vector3T<T> &d,
const UT_Vector3T<T> &query)
{
// Make a, b, c, and d relative to query
UT_Vector3T<T> v[4] = {
a-query,
b-query,
c-query,
d-query
};
const T lengths[4] = {
v[0].length(),
v[1].length(),
v[2].length(),
v[3].length()
};
// If any quad vertices are coincident with query,
// query is on the surface, which we treat as no solid angle.
// We could add the contribution from the non-planar part,
// but in the context of a mesh, we'd still miss some, like
// we do in the triangle case.
if (lengths[0] == T(0) || lengths[1] == T(0) || lengths[2] == T(0) || lengths[3] == T(0))
return T(0);
// Normalize the vectors
v[0] /= lengths[0];
v[1] /= lengths[1];
v[2] /= lengths[2];
v[3] /= lengths[3];
// Compute (unnormalized, but consistently-scaled) barycentric coordinates
// for the query point inside the tetrahedron of points.
// If 0 or 4 of the coordinates are positive, (or slightly negative), the
// query is (approximately) inside, so the choice of triangulation matters.
// Otherwise, the triangulation doesn't matter.
const UT_Vector3T<T> diag02 = v[2]-v[0];
const UT_Vector3T<T> diag13 = v[3]-v[1];
const UT_Vector3T<T> v01 = v[1]-v[0];
const UT_Vector3T<T> v23 = v[3]-v[2];
T bary[4];
bary[0] = dot(v[3],cross(v23,diag13));
bary[1] = -dot(v[2],cross(v23,diag02));
bary[2] = -dot(v[1],cross(v01,diag13));
bary[3] = dot(v[0],cross(v01,diag02));
const T dot01 = dot(v[0],v[1]);
const T dot12 = dot(v[1],v[2]);
const T dot23 = dot(v[2],v[3]);
const T dot30 = dot(v[3],v[0]);
T omega = T(0);
// Equation of a bilinear patch in barycentric coordinates of its
// tetrahedron is x0*x2 = x1*x3. Less is one side; greater is other.
if (bary[0]*bary[2] < bary[1]*bary[3])
{
// Split 0-2: triangles 0,1,2 and 0,2,3
const T numerator012 = bary[3];
const T numerator023 = bary[1];
const T dot02 = dot(v[0],v[2]);
// If numerator is 0, regardless of denominator, query is on the
// surface, which we treat as no solid angle.
if (numerator012 != T(0))
{
const T denominator012 = T(1) + dot01 + dot12 + dot02;
omega = SYSatan2(numerator012, denominator012);
}
if (numerator023 != T(0))
{
const T denominator023 = T(1) + dot02 + dot23 + dot30;
omega += SYSatan2(numerator023, denominator023);
}
}
else
{
// Split 1-3: triangles 0,1,3 and 1,2,3
const T numerator013 = -bary[2];
const T numerator123 = -bary[0];
const T dot13 = dot(v[1],v[3]);
// If numerator is 0, regardless of denominator, query is on the
// surface, which we treat as no solid angle.
if (numerator013 != T(0))
{
const T denominator013 = T(1) + dot01 + dot13 + dot30;
omega = SYSatan2(numerator013, denominator013);
}
if (numerator123 != T(0))
{
const T denominator123 = T(1) + dot12 + dot23 + dot13;
omega += SYSatan2(numerator123, denominator123);
}
}
return T(2)*omega;
}
/// Class for quickly approximating signed solid angle of a large mesh
/// from many query points. This is useful for computing the
/// generalized winding number at many points.
///
/// NOTE: This is currently only instantiated for <float,float>.
template<typename T,typename S>
class UT_SolidAngle
{
public:
/// This is outlined so that we don't need to include UT_BVHImpl.h
UT_SolidAngle();
/// This is outlined so that we don't need to include UT_BVHImpl.h
~UT_SolidAngle();
/// NOTE: This does not take ownership over triangle_points or positions,
/// but does keep pointers to them, so the caller must keep them in
/// scope for the lifetime of this structure.
UT_SolidAngle(
const int ntriangles,
const int *const triangle_points,
const int npoints,
const UT_Vector3T<S> *const positions,
const int order = 2)
: UT_SolidAngle()
{ init(ntriangles, triangle_points, npoints, positions, order); }
/// Initialize the tree and data.
/// NOTE: It is safe to call init on a UT_SolidAngle that has had init
/// called on it before, to re-initialize it.
void init(
const int ntriangles,
const int *const triangle_points,
const int npoints,
const UT_Vector3T<S> *const positions,
const int order = 2);
/// Frees myTree and myData, and clears the rest.
void clear();
/// Returns true if this is clear
bool isClear() const
{ return myNTriangles == 0; }
/// Returns an approximation of the signed solid angle of the mesh from the specified query_point
/// accuracy_scale is the value of (maxP/q) beyond which the approximation of the box will be used.
T computeSolidAngle(const UT_Vector3T<T> &query_point, const T accuracy_scale = T(2.0)) const;
private:
struct BoxData;
static constexpr uint BVH_N = 4;
UT_BVH<BVH_N> myTree;
int myNBoxes;
int myOrder;
std::unique_ptr<BoxData[]> myData;
int myNTriangles;
const int *myTrianglePoints;
int myNPoints;
const UT_Vector3T<S> *myPositions;
};
template<typename T>
T UTsignedAngleSegment(
const UT_Vector2T<T> &a,
const UT_Vector2T<T> &b,
const UT_Vector2T<T> &query)
{
// Make a and b relative to query
UT_Vector2T<T> qa = a-query;
UT_Vector2T<T> qb = b-query;
// If any segment vertices are coincident with query,
// query is on the segment, which we treat as no angle.
if (qa.isZero() || qb.isZero())
return T(0);
// numerator = |qa||qb|sin(theta)
const T numerator = cross(qa, qb);
// If numerator is 0, regardless of denominator, query is on the
// surface, which we treat as no solid angle.
if (numerator == 0)
return T(0);
// denominator = |qa||qb|cos(theta)
const T denominator = dot(qa,qb);
// numerator/denominator = tan(theta)
return SYSatan2(numerator, denominator);
}
/// Class for quickly approximating signed subtended angle of a large curve
/// from many query points. This is useful for computing the
/// generalized winding number at many points.
///
/// NOTE: This is currently only instantiated for <float,float>.
template<typename T,typename S>
class UT_SubtendedAngle
{
public:
/// This is outlined so that we don't need to include UT_BVHImpl.h
UT_SubtendedAngle();
/// This is outlined so that we don't need to include UT_BVHImpl.h
~UT_SubtendedAngle();
/// NOTE: This does not take ownership over segment_points or positions,
/// but does keep pointers to them, so the caller must keep them in
/// scope for the lifetime of this structure.
UT_SubtendedAngle(
const int nsegments,
const int *const segment_points,
const int npoints,
const UT_Vector2T<S> *const positions,
const int order = 2)
: UT_SubtendedAngle()
{ init(nsegments, segment_points, npoints, positions, order); }
/// Initialize the tree and data.
/// NOTE: It is safe to call init on a UT_SolidAngle that has had init
/// called on it before, to re-initialize it.
void init(
const int nsegments,
const int *const segment_points,
const int npoints,
const UT_Vector2T<S> *const positions,
const int order = 2);
/// Frees myTree and myData, and clears the rest.
void clear();
/// Returns true if this is clear
bool isClear() const
{ return myNSegments == 0; }
/// Returns an approximation of the signed solid angle of the mesh from the specified query_point
/// accuracy_scale is the value of (maxP/q) beyond which the approximation of the box will be used.
T computeAngle(const UT_Vector2T<T> &query_point, const T accuracy_scale = T(2.0)) const;
private:
struct BoxData;
static constexpr uint BVH_N = 4;
UT_BVH<BVH_N> myTree;
int myNBoxes;
int myOrder;
std::unique_ptr<BoxData[]> myData;
int myNSegments;
const int *mySegmentPoints;
int myNPoints;
const UT_Vector2T<S> *myPositions;
};
} // End HDK_Sample namespace
#endif
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