solvespace/srf/surface.h

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#ifndef __SURFACE_H
#define __SURFACE_H
// Utility functions, Bernstein polynomials of order 1-3 and their derivatives.
double Bernstein(int k, int deg, double t);
double BernsteinDerivative(int k, int deg, double t);
class SSurface;
class SCurvePt;
// Utility data structure, a two-dimensional BSP to accelerate polygon
// operations.
class SBspUv {
public:
Point2d a, b;
SBspUv *pos;
SBspUv *neg;
SBspUv *more;
static const int INSIDE = 100;
static const int OUTSIDE = 200;
static const int EDGE_PARALLEL = 300;
static const int EDGE_ANTIPARALLEL = 400;
static const int EDGE_OTHER = 500;
static SBspUv *Alloc(void);
static SBspUv *From(SEdgeList *el);
Point2d IntersectionWith(Point2d a, Point2d b);
SBspUv *InsertEdge(Point2d a, Point2d b);
int ClassifyPoint(Point2d p, Point2d eb,
Point2d *ia=NULL, Point2d *ib=NULL);
int ClassifyEdge(Point2d ea, Point2d eb);
};
// Now the data structures to represent a shell of trimmed rational polynomial
// surfaces.
class SShell;
class hSSurface {
public:
DWORD v;
};
class hSCurve {
public:
DWORD v;
};
// Stuff for rational polynomial curves, of degree one to three. These are
// our inputs, and are also calculated for certain exact surface-surface
// intersections.
class SBezier {
public:
int tag;
int deg;
Vector ctrl[4];
double weight[4];
Vector PointAt(double t);
Vector TangentAt(double t);
void ClosestPointTo(Vector p, double *t, bool converge=true);
void SplitAt(double t, SBezier *bef, SBezier *aft);
Vector Start(void);
Vector Finish(void);
bool Equals(SBezier *b);
void MakePwlInto(List<SCurvePt> *l);
void MakePwlInto(List<Vector> *l);
void MakePwlWorker(List<Vector> *l, double ta, double tb);
void GetBoundingProjd(Vector u, Vector orig, double *umin, double *umax);
void Reverse(void);
bool IsCircle(Vector axis, Vector *center, double *r);
bool IsRational(void);
SBezier TransformedBy(Vector t, Quaternion q);
SBezier InPerspective(Vector u, Vector v, Vector n,
Vector origin, double cameraTan);
static SBezier From(Vector p0, Vector p1, Vector p2, Vector p3);
static SBezier From(Vector p0, Vector p1, Vector p2);
static SBezier From(Vector p0, Vector p1);
static SBezier From(Vector4 p0, Vector4 p1, Vector4 p2, Vector4 p3);
static SBezier From(Vector4 p0, Vector4 p1, Vector4 p2);
static SBezier From(Vector4 p0, Vector4 p1);
};
class SBezierList {
public:
List<SBezier> l;
void Clear(void);
void CullIdenticalBeziers(void);
};
class SBezierLoop {
public:
int tag;
List<SBezier> l;
inline void Clear(void) { l.Clear(); }
void Reverse(void);
void MakePwlInto(SContour *sc);
void GetBoundingProjd(Vector u, Vector orig, double *umin, double *umax);
static SBezierLoop FromCurves(SBezierList *spcl,
bool *allClosed, SEdge *errorAt);
};
class SBezierLoopSet {
public:
List<SBezierLoop> l;
Vector normal;
Vector point;
static SBezierLoopSet From(SBezierList *spcl, SPolygon *poly,
bool *allClosed, SEdge *errorAt);
void GetBoundingProjd(Vector u, Vector orig, double *umin, double *umax);
void Clear(void);
};
// Stuff for the surface trim curves: piecewise linear
class SCurvePt {
public:
int tag;
Vector p;
bool vertex;
};
class SCurve {
public:
hSCurve h;
// In a Boolean, C = A op B. The curves in A and B get copied into C, and
// therefore must get new hSCurves assigned. For the curves in A and B,
// we use newH to record their new handle in C.
hSCurve newH;
static const int FROM_A = 100;
static const int FROM_B = 200;
static const int FROM_INTERSECTION = 300;
int source;
bool isExact;
SBezier exact;
List<SCurvePt> pts;
hSSurface surfA;
hSSurface surfB;
static SCurve FromTransformationOf(SCurve *a, Vector t, Quaternion q);
SCurve MakeCopySplitAgainst(SShell *agnstA, SShell *agnstB,
SSurface *srfA, SSurface *srfB);
void RemoveShortSegments(SSurface *srfA, SSurface *srfB);
void Clear(void);
};
// A segment of a curve by which a surface is trimmed: indicates which curve,
// by its handle, and the starting and ending points of our segment of it.
// The vector out points out of the surface; it, the surface outer normal,
// and a tangent to the beginning of the curve are all orthogonal.
class STrimBy {
public:
hSCurve curve;
bool backwards;
// If a trim runs backwards, then start and finish still correspond to
// the actual start and finish, but they appear in reverse order in
// the referenced curve.
Vector start;
Vector finish;
static STrimBy STrimBy::EntireCurve(SShell *shell, hSCurve hsc, bool bkwds);
};
// An intersection point between a line and a surface
class SInter {
public:
int tag;
Vector p;
SSurface *srf;
Point2d pinter;
Vector surfNormal; // of the intersecting surface, at pinter
bool onEdge; // pinter is on edge of trim poly
Point2d edgeA, edgeB; // the edge that pinter is on
};
// A rational polynomial surface in Bezier form.
class SSurface {
public:
int tag;
hSSurface h;
// Same as newH for the curves; record what a surface gets renamed to
// when I copy things over.
hSSurface newH;
int color;
DWORD face;
int degm, degn;
Vector ctrl[4][4];
double weight[4][4];
List<STrimBy> trim;
// For testing whether a point (u, v) on the surface lies inside the trim
SBspUv *bsp;
SEdgeList edges;
static SSurface FromExtrusionOf(SBezier *spc, Vector t0, Vector t1);
static SSurface FromRevolutionOf(SBezier *sb, Vector pt, Vector axis,
double thetas, double thetaf);
static SSurface FromPlane(Vector pt, Vector u, Vector v);
static SSurface FromTransformationOf(SSurface *a, Vector t, Quaternion q,
bool includingTrims);
void EdgeNormalsWithinSurface(Point2d auv, Point2d buv,
Vector *pt, Vector *enin, Vector *enout,
Vector *surfn,
DWORD auxA, SShell *shell);
SSurface MakeCopyTrimAgainst(SShell *against, SShell *parent, SShell *into,
int type, bool opA);
void TrimFromEdgeList(SEdgeList *el, bool asUv);
void IntersectAgainst(SSurface *b, SShell *agnstA, SShell *agnstB,
SShell *into);
void AddExactIntersectionCurve(SBezier *sb, SSurface *srfB,
SShell *agnstA, SShell *agnstB, SShell *into);
typedef struct {
int tag;
Point2d p;
} Inter;
void WeightControlPoints(void);
void UnWeightControlPoints(void);
void CopyRowOrCol(bool row, int this_ij, SSurface *src, int src_ij);
void BlendRowOrCol(bool row, int this_ij, SSurface *a, int a_ij,
SSurface *b, int b_ij);
double DepartureFromCoplanar(void);
void SplitInHalf(bool byU, SSurface *sa, SSurface *sb);
void AllPointsIntersecting(Vector a, Vector b,
List<SInter> *l,
bool seg, bool trimmed, bool inclTangent);
void AllPointsIntersectingUntrimmed(Vector a, Vector b,
int *cnt, int *level,
List<Inter> *l, bool segment,
SSurface *sorig);
void ClosestPointTo(Vector p, Point2d *puv, bool converge=true);
void ClosestPointTo(Vector p, double *u, double *v, bool converge=true);
bool PointIntersectingLine(Vector p0, Vector p1, double *u, double *v);
Vector ClosestPointOnThisAndSurface(SSurface *srf2, Vector p);
void PointOnSurfaces(SSurface *s1, SSurface *s2, double *u, double *v);
Vector PointAt(double u, double v);
Vector PointAt(Point2d puv);
void TangentsAt(double u, double v, Vector *tu, Vector *tv);
Vector NormalAt(Point2d puv);
Vector NormalAt(double u, double v);
bool LineEntirelyOutsideBbox(Vector a, Vector b, bool segment);
void GetAxisAlignedBounding(Vector *ptMax, Vector *ptMin);
bool CoincidentWithPlane(Vector n, double d);
bool CoincidentWith(SSurface *ss, bool sameNormal);
bool IsExtrusion(SBezier *of, Vector *along);
bool IsCylinder(Vector *axis, Vector *center, double *r,
Vector *start, Vector *finish);
void TriangulateInto(SShell *shell, SMesh *sm);
void MakeTrimEdgesInto(SEdgeList *sel, bool asUv, SCurve *sc, STrimBy *stb);
void MakeEdgesInto(SShell *shell, SEdgeList *sel, bool asUv,
SShell *useCurvesFrom=NULL);
void MakeSectionEdgesInto(SShell *shell, SEdgeList *sel, SBezierList *sbl);
void MakeClassifyingBsp(SShell *shell, SShell *useCurvesFrom);
double ChordToleranceForEdge(Vector a, Vector b);
void MakeTriangulationGridInto(List<double> *l, double vs, double vf,
bool swapped);
Vector PointAtMaybeSwapped(double u, double v, bool swapped);
void Reverse(void);
void Clear(void);
};
class SShell {
public:
IdList<SCurve,hSCurve> curve;
IdList<SSurface,hSSurface> surface;
bool booleanFailed;
void MakeFromExtrusionOf(SBezierLoopSet *sbls, Vector t0, Vector t1,
int color);
void MakeFromRevolutionOf(SBezierLoopSet *sbls, Vector pt, Vector axis,
int color);
void MakeFromUnionOf(SShell *a, SShell *b);
void MakeFromDifferenceOf(SShell *a, SShell *b);
static const int AS_UNION = 10;
static const int AS_DIFFERENCE = 11;
static const int AS_INTERSECT = 12;
void MakeFromBoolean(SShell *a, SShell *b, int type);
void CopyCurvesSplitAgainst(bool opA, SShell *agnst, SShell *into);
void CopySurfacesTrimAgainst(SShell *against, SShell *into, int t, bool a);
void MakeIntersectionCurvesAgainst(SShell *against, SShell *into);
void MakeClassifyingBsps(SShell *useCurvesFrom);
void AllPointsIntersecting(Vector a, Vector b, List<SInter> *il,
bool seg, bool trimmed, bool inclTangent);
void MakeCoincidentEdgesInto(SSurface *proto, bool sameNormal,
SEdgeList *el, SShell *useCurvesFrom);
void RewriteSurfaceHandlesForCurves(SShell *a, SShell *b);
void CleanupAfterBoolean(void);
// Definitions when classifying regions of a surface; it is either inside,
// outside, or coincident (with parallel or antiparallel normal) with a
// shell.
static const int INSIDE = 100;
static const int OUTSIDE = 200;
static const int COINC_SAME = 300;
static const int COINC_OPP = 400;
static const double DOTP_TOL;
int ClassifyRegion(Vector edge_n, Vector inter_surf_n, Vector edge_surf_n);
bool ClassifyEdge(int *indir, int *outdir,
Vector ea, Vector eb,
Vector p,
Vector edge_n_in, Vector edge_n_out, Vector surf_n);
void MakeFromCopyOf(SShell *a);
void MakeFromTransformationOf(SShell *a, Vector trans, Quaternion q);
void MakeFromAssemblyOf(SShell *a, SShell *b);
void MergeCoincidentSurfaces(void);
void TriangulateInto(SMesh *sm);
void MakeEdgesInto(SEdgeList *sel);
void MakeSectionEdgesInto(Vector n, double d,
SEdgeList *sel, SBezierList *sbl);
bool IsEmpty(void);
void RemapFaces(Group *g, int remap);
void Clear(void);
};
#endif