/** @file * @brief Path - a sequence of contiguous curves (implementation file) *//* * Authors: * MenTaLguY * Marco Cecchetti * Krzysztof Kosiński * * Copyright 2007-2014 authors * * This library is free software; you can redistribute it and/or * modify it either under the terms of the GNU Lesser General Public * License version 2.1 as published by the Free Software Foundation * (the "LGPL") or, at your option, under the terms of the Mozilla * Public License Version 1.1 (the "MPL"). If you do not alter this * notice, a recipient may use your version of this file under either * the MPL or the LGPL. * * You should have received a copy of the LGPL along with this library * in the file COPYING-LGPL-2.1; if not, write to the Free Software * Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA * You should have received a copy of the MPL along with this library * in the file COPYING-MPL-1.1 * * The contents of this file are subject to the Mozilla Public License * Version 1.1 (the "License"); you may not use this file except in * compliance with the License. You may obtain a copy of the License at * http://www.mozilla.org/MPL/ * * This software is distributed on an "AS IS" basis, WITHOUT WARRANTY * OF ANY KIND, either express or implied. See the LGPL or the MPL for * the specific language governing rights and limitations. */ #include <2geom/path.h> #include <2geom/pathvector.h> #include <2geom/transforms.h> #include <2geom/circle.h> #include <2geom/ellipse.h> #include <2geom/convex-hull.h> #include <2geom/svg-path-writer.h> #include <2geom/sweeper.h> #include #include using std::swap; using namespace Geom::PathInternal; namespace Geom { // this represents an empty interval PathInterval::PathInterval() : _from(0, 0.0) , _to(0, 0.0) , _path_size(1) , _cross_start(false) , _reverse(false) {} PathInterval::PathInterval(PathTime const &from, PathTime const &to, bool cross_start, size_type path_size) : _from(from) , _to(to) , _path_size(path_size) , _cross_start(cross_start) , _reverse(cross_start ? to >= from : to < from) { if (_reverse) { _to.normalizeForward(_path_size); if (_from != _to) { _from.normalizeBackward(_path_size); } } else { _from.normalizeForward(_path_size); if (_from != _to) { _to.normalizeBackward(_path_size); } } if (_from == _to) { _reverse = false; _cross_start = false; } } bool PathInterval::contains(PathTime const &pos) const { if (_cross_start) { if (_reverse) { return pos >= _to || _from >= pos; } else { return pos >= _from || _to >= pos; } } else { if (_reverse) { return _to <= pos && pos <= _from; } else { return _from <= pos && pos <= _to; } } } PathInterval::size_type PathInterval::curveCount() const { if (isDegenerate()) return 0; if (_cross_start) { if (_reverse) { return _path_size - _to.curve_index + _from.curve_index + 1; } else { return _path_size - _from.curve_index + _to.curve_index + 1; } } else { if (_reverse) { return _from.curve_index - _to.curve_index + 1; } else { return _to.curve_index - _from.curve_index + 1; } } } PathTime PathInterval::inside(Coord min_dist) const { // If there is some node further than min_dist (in time coord) from the ends, // return that node. Otherwise, return the middle. PathTime result(0, 0.0); if (!_cross_start && _from.curve_index == _to.curve_index) { PathTime result(_from.curve_index, lerp(0.5, _from.t, _to.t)); return result; } // If _cross_start, then we can be sure that at least one node is in the domain. // If dcurve == 0, it actually means that all curves are included in the domain if (_reverse) { size_type dcurve = (_path_size + _from.curve_index - _to.curve_index) % _path_size; bool from_close = _from.t < min_dist; bool to_close = _to.t > 1 - min_dist; if (dcurve == 0) { dcurve = _path_size; } if (dcurve == 1) { if (from_close || to_close) { result.curve_index = _from.curve_index; Coord tmid = _from.t - ((1 - _to.t) + _from.t) * 0.5; if (tmid < 0) { result.curve_index = (_path_size + result.curve_index - 1) % _path_size; tmid += 1; } result.t = tmid; return result; } result.curve_index = _from.curve_index; return result; } result.curve_index = (_to.curve_index + 1) % _path_size; if (to_close) { if (dcurve == 2) { result.t = 0.5; } else { result.curve_index = (result.curve_index + 1) % _path_size; } } return result; } else { size_type dcurve = (_path_size + _to.curve_index - _from.curve_index) % _path_size; bool from_close = _from.t > 1 - min_dist; bool to_close = _to.t < min_dist; if (dcurve == 0) { dcurve = _path_size; } if (dcurve == 1) { if (from_close || to_close) { result.curve_index = _from.curve_index; Coord tmid = ((1 - _from.t) + _to.t) * 0.5 + _from.t; if (tmid >= 1) { result.curve_index = (result.curve_index + 1) % _path_size; tmid -= 1; } result.t = tmid; return result; } result.curve_index = _to.curve_index; return result; } result.curve_index = (_from.curve_index + 1) % _path_size; if (from_close) { if (dcurve == 2) { result.t = 0.5; } else { result.curve_index = (result.curve_index + 1) % _path_size; } } return result; } result.curve_index = _reverse ? _from.curve_index : _to.curve_index; return result; } PathInterval PathInterval::from_direction(PathTime const &from, PathTime const &to, bool reversed, size_type path_size) { PathInterval result; result._from = from; result._to = to; result._path_size = path_size; if (reversed) { result._to.normalizeForward(path_size); if (result._from != result._to) { result._from.normalizeBackward(path_size); } } else { result._from.normalizeForward(path_size); if (result._from != result._to) { result._to.normalizeBackward(path_size); } } if (result._from == result._to) { result._reverse = false; result._cross_start = false; } else { result._reverse = reversed; if (reversed) { result._cross_start = from < to; } else { result._cross_start = to < from; } } return result; } Path::Path(Rect const &r) : _data(new PathData()) , _closing_seg(new ClosingSegment(r.corner(3), r.corner(0))) , _closed(true) , _exception_on_stitch(true) { for (unsigned i = 0; i < 3; ++i) { _data->curves.push_back(new LineSegment(r.corner(i), r.corner(i+1))); } _data->curves.push_back(_closing_seg); } Path::Path(ConvexHull const &ch) : _data(new PathData()) , _closing_seg(new ClosingSegment(Point(), Point())) , _closed(true) , _exception_on_stitch(true) { if (ch.empty()) { _data->curves.push_back(_closing_seg); return; } _closing_seg->setInitial(ch.back()); _closing_seg->setFinal(ch.front()); Point last = ch.front(); for (std::size_t i = 1; i < ch.size(); ++i) { _data->curves.push_back(new LineSegment(last, ch[i])); last = ch[i]; } _data->curves.push_back(_closing_seg); _closed = true; } Path::Path(Circle const &c) : _data(new PathData()) , _closing_seg(NULL) , _closed(true) , _exception_on_stitch(true) { Point p1 = c.pointAt(0); Point p2 = c.pointAt(M_PI); _data->curves.push_back(new EllipticalArc(p1, c.radius(), c.radius(), 0, false, true, p2)); _data->curves.push_back(new EllipticalArc(p2, c.radius(), c.radius(), 0, false, true, p1)); _closing_seg = new ClosingSegment(p1, p1); _data->curves.push_back(_closing_seg); } Path::Path(Ellipse const &e) : _data(new PathData()) , _closing_seg(NULL) , _closed(true) , _exception_on_stitch(true) { Point p1 = e.pointAt(0); Point p2 = e.pointAt(M_PI); _data->curves.push_back(new EllipticalArc(p1, e.rays(), e.rotationAngle(), false, true, p2)); _data->curves.push_back(new EllipticalArc(p2, e.rays(), e.rotationAngle(), false, true, p1)); _closing_seg = new ClosingSegment(p1, p1); _data->curves.push_back(_closing_seg); } void Path::close(bool c) { if (c == _closed) return; if (c && _data->curves.size() >= 2) { // when closing, if last segment is linear and ends at initial point, // replace it with the closing segment Sequence::iterator last = _data->curves.end() - 2; if (last->isLineSegment() && last->finalPoint() == initialPoint()) { _closing_seg->setInitial(last->initialPoint()); _data->curves.erase(last); } } _closed = c; } void Path::clear() { _unshare(); _data->curves.pop_back().release(); _data->curves.clear(); _closing_seg->setInitial(Point(0, 0)); _closing_seg->setFinal(Point(0, 0)); _data->curves.push_back(_closing_seg); _closed = false; } OptRect Path::boundsFast() const { OptRect bounds; if (empty()) { return bounds; } // if the path is not empty, we look for cached bounds if (_data->fast_bounds) { return _data->fast_bounds; } bounds = front().boundsFast(); const_iterator iter = begin(); // the closing path segment can be ignored, because it will always // lie within the bbox of the rest of the path if (iter != end()) { for (++iter; iter != end(); ++iter) { bounds.unionWith(iter->boundsFast()); } } _data->fast_bounds = bounds; return bounds; } OptRect Path::boundsExact() const { OptRect bounds; if (empty()) return bounds; bounds = front().boundsExact(); const_iterator iter = begin(); // the closing path segment can be ignored, because it will always lie within the bbox of the rest of the path if (iter != end()) { for (++iter; iter != end(); ++iter) { bounds.unionWith(iter->boundsExact()); } } return bounds; } Piecewise > Path::toPwSb() const { Piecewise > ret; ret.push_cut(0); unsigned i = 1; bool degenerate = true; // pw> is always open. so if path is closed, add closing segment as well to pwd2. for (const_iterator it = begin(); it != end_default(); ++it) { if (!it->isDegenerate()) { ret.push(it->toSBasis(), i++); degenerate = false; } } if (degenerate) { // if path only contains degenerate curves, no second cut is added // so we need to create at least one segment manually ret = Piecewise >(initialPoint()); } return ret; } template iter inc(iter const &x, unsigned n) { iter ret = x; for (unsigned i = 0; i < n; i++) ret++; return ret; } bool Path::operator==(Path const &other) const { if (this == &other) return true; if (_closed != other._closed) return false; return _data->curves == other._data->curves; } void Path::start(Point const &p) { if (_data->curves.size() > 1) { clear(); } _closing_seg->setInitial(p); _closing_seg->setFinal(p); } Interval Path::timeRange() const { Interval ret(0, size_default()); return ret; } Curve const &Path::curveAt(Coord t, Coord *rest) const { PathTime pos = _factorTime(t); if (rest) { *rest = pos.t; } return at(pos.curve_index); } Point Path::pointAt(Coord t) const { return pointAt(_factorTime(t)); } Coord Path::valueAt(Coord t, Dim2 d) const { return valueAt(_factorTime(t), d); } Curve const &Path::curveAt(PathTime const &pos) const { return at(pos.curve_index); } Point Path::pointAt(PathTime const &pos) const { return at(pos.curve_index).pointAt(pos.t); } Coord Path::valueAt(PathTime const &pos, Dim2 d) const { return at(pos.curve_index).valueAt(pos.t, d); } std::vector Path::roots(Coord v, Dim2 d) const { std::vector res; for (unsigned i = 0; i < size(); i++) { std::vector temp = (*this)[i].roots(v, d); for (unsigned j = 0; j < temp.size(); j++) res.push_back(PathTime(i, temp[j])); } return res; } // The class below implements sweepline optimization for curve intersection in paths. // Instead of O(N^2), this takes O(N + X), where X is the number of overlaps // between the bounding boxes of curves. struct CurveIntersectionSweepSet { public: struct CurveRecord { boost::intrusive::list_member_hook<> _hook; Curve const *curve; Rect bounds; std::size_t index; unsigned which; CurveRecord(Curve const *pc, std::size_t idx, unsigned w) : curve(pc) , bounds(curve->boundsFast()) , index(idx) , which(w) {} }; typedef std::vector::const_iterator ItemIterator; CurveIntersectionSweepSet(std::vector &result, Path const &a, Path const &b, Coord precision) : _result(result) , _precision(precision) , _sweep_dir(X) { std::size_t asz = a.size(), bsz = b.size(); _records.reserve(asz + bsz); for (std::size_t i = 0; i < asz; ++i) { _records.push_back(CurveRecord(&a[i], i, 0)); } for (std::size_t i = 0; i < bsz; ++i) { _records.push_back(CurveRecord(&b[i], i, 1)); } OptRect abb = a.boundsFast() | b.boundsFast(); if (abb && abb->height() > abb->width()) { _sweep_dir = Y; } } std::vector const &items() { return _records; } Interval itemBounds(ItemIterator ii) { return ii->bounds[_sweep_dir]; } void addActiveItem(ItemIterator ii) { unsigned w = ii->which; unsigned ow = (w+1) % 2; _active[w].push_back(const_cast(*ii)); for (ActiveCurveList::iterator i = _active[ow].begin(); i != _active[ow].end(); ++i) { if (!ii->bounds.intersects(i->bounds)) continue; std::vector cx = ii->curve->intersect(*i->curve, _precision); for (std::size_t k = 0; k < cx.size(); ++k) { PathTime tw(ii->index, cx[k].first), tow(i->index, cx[k].second); _result.push_back(PathIntersection( w == 0 ? tw : tow, w == 0 ? tow : tw, cx[k].point())); } } } void removeActiveItem(ItemIterator ii) { ActiveCurveList &acl = _active[ii->which]; acl.erase(acl.iterator_to(*ii)); } private: typedef boost::intrusive::list < CurveRecord , boost::intrusive::member_hook < CurveRecord , boost::intrusive::list_member_hook<> , &CurveRecord::_hook > > ActiveCurveList; std::vector _records; std::vector &_result; ActiveCurveList _active[2]; Coord _precision; Dim2 _sweep_dir; }; std::vector Path::intersect(Path const &other, Coord precision) const { std::vector result; CurveIntersectionSweepSet cisset(result, *this, other, precision); Sweeper sweeper(cisset); sweeper.process(); // preprocessing to remove duplicate intersections at endpoints std::size_t asz = size(), bsz = other.size(); for (std::size_t i = 0; i < result.size(); ++i) { result[i].first.normalizeForward(asz); result[i].second.normalizeForward(bsz); } std::sort(result.begin(), result.end()); result.erase(std::unique(result.begin(), result.end()), result.end()); return result; } int Path::winding(Point const &p) const { int wind = 0; /* To handle all the edge cases, we consider the maximum Y edge of the bounding box * as not included in box. This way paths that contain linear horizontal * segments will be treated correctly. */ for (const_iterator i = begin(); i != end_closed(); ++i) { Rect bounds = i->boundsFast(); if (bounds.height() == 0) continue; if (p[X] > bounds.right() || !bounds[Y].lowerContains(p[Y])) { // Ray doesn't intersect bbox, so we ignore this segment continue; } if (p[X] < bounds.left()) { /* Ray intersects the curve's bbox, but the point is outside it. * The winding contribution is exactly the same as that * of a linear segment with the same initial and final points. */ Point ip = i->initialPoint(); Point fp = i->finalPoint(); Rect eqbox(ip, fp); if (eqbox[Y].lowerContains(p[Y])) { /* The ray intersects the equivalent linear segment. * Determine winding contribution based on its derivative. */ if (ip[Y] < fp[Y]) { wind += 1; } else if (ip[Y] > fp[Y]) { wind -= 1; } else { // should never happen, because bounds.height() was not zero assert(false); } } } else { // point is inside bbox wind += i->winding(p); } } return wind; } std::vector Path::allNearestTimes(Point const &_point, double from, double to) const { // TODO from and to are not used anywhere. // rewrite this to simplify. using std::swap; if (from > to) swap(from, to); const Path &_path = *this; unsigned int sz = _path.size(); if (_path.closed()) ++sz; if (from < 0 || to > sz) { THROW_RANGEERROR("[from,to] interval out of bounds"); } double sif, st = modf(from, &sif); double eif, et = modf(to, &eif); unsigned int si = static_cast(sif); unsigned int ei = static_cast(eif); if (si == sz) { --si; st = 1; } if (ei == sz) { --ei; et = 1; } if (si == ei) { std::vector all_nearest = _path[si].allNearestTimes(_point, st, et); for (unsigned int i = 0; i < all_nearest.size(); ++i) { all_nearest[i] = si + all_nearest[i]; } return all_nearest; } std::vector all_t; std::vector > all_np; all_np.push_back(_path[si].allNearestTimes(_point, st)); std::vector ni; ni.push_back(si); double dsq; double mindistsq = distanceSq(_point, _path[si].pointAt(all_np.front().front())); Rect bb(Geom::Point(0, 0), Geom::Point(0, 0)); for (unsigned int i = si + 1; i < ei; ++i) { bb = (_path[i].boundsFast()); dsq = distanceSq(_point, bb); if (mindistsq < dsq) continue; all_t = _path[i].allNearestTimes(_point); dsq = distanceSq(_point, _path[i].pointAt(all_t.front())); if (mindistsq > dsq) { all_np.clear(); all_np.push_back(all_t); ni.clear(); ni.push_back(i); mindistsq = dsq; } else if (mindistsq == dsq) { all_np.push_back(all_t); ni.push_back(i); } } bb = (_path[ei].boundsFast()); dsq = distanceSq(_point, bb); if (mindistsq >= dsq) { all_t = _path[ei].allNearestTimes(_point, 0, et); dsq = distanceSq(_point, _path[ei].pointAt(all_t.front())); if (mindistsq > dsq) { for (unsigned int i = 0; i < all_t.size(); ++i) { all_t[i] = ei + all_t[i]; } return all_t; } else if (mindistsq == dsq) { all_np.push_back(all_t); ni.push_back(ei); } } std::vector all_nearest; for (unsigned int i = 0; i < all_np.size(); ++i) { for (unsigned int j = 0; j < all_np[i].size(); ++j) { all_nearest.push_back(ni[i] + all_np[i][j]); } } all_nearest.erase(std::unique(all_nearest.begin(), all_nearest.end()), all_nearest.end()); return all_nearest; } std::vector Path::nearestTimePerCurve(Point const &p) const { // return a single nearest time for each curve in this path std::vector np; for (const_iterator it = begin(); it != end_default(); ++it) { np.push_back(it->nearestTime(p)); } return np; } PathTime Path::nearestTime(Point const &p, Coord *dist) const { Coord mindist = std::numeric_limits::max(); PathTime ret; if (_data->curves.size() == 1) { // naked moveto ret.curve_index = 0; ret.t = 0; if (dist) { *dist = distance(_closing_seg->initialPoint(), p); } return ret; } for (size_type i = 0; i < size_default(); ++i) { Curve const &c = at(i); if (distance(p, c.boundsFast()) >= mindist) continue; Coord t = c.nearestTime(p); Coord d = distance(c.pointAt(t), p); if (d < mindist) { mindist = d; ret.curve_index = i; ret.t = t; } } if (dist) { *dist = mindist; } return ret; } std::vector Path::nodes() const { std::vector result; size_type path_size = size_closed(); for (size_type i = 0; i < path_size; ++i) { result.push_back(_data->curves[i].initialPoint()); } return result; } void Path::appendPortionTo(Path &ret, double from, double to) const { if (!(from >= 0 && to >= 0)) { THROW_RANGEERROR("from and to must be >=0 in Path::appendPortionTo"); } if (to == 0) to = size() + 0.999999; if (from == to) { return; } double fi, ti; double ff = modf(from, &fi), tf = modf(to, &ti); if (tf == 0) { ti--; tf = 1; } const_iterator fromi = inc(begin(), (unsigned)fi); if (fi == ti && from < to) { ret.append(fromi->portion(ff, tf)); return; } const_iterator toi = inc(begin(), (unsigned)ti); if (ff != 1.) { // fromv->setInitial(ret.finalPoint()); ret.append(fromi->portion(ff, 1.)); } if (from >= to) { const_iterator ender = end(); if (ender->initialPoint() == ender->finalPoint()) ++ender; ret.insert(ret.end(), ++fromi, ender); ret.insert(ret.end(), begin(), toi); } else { ret.insert(ret.end(), ++fromi, toi); } ret.append(toi->portion(0., tf)); } void Path::appendPortionTo(Path &target, PathInterval const &ival, boost::optional const &p_from, boost::optional const &p_to) const { assert(ival.pathSize() == size_closed()); if (ival.isDegenerate()) { Point stitch_to = p_from ? *p_from : pointAt(ival.from()); target.stitchTo(stitch_to); return; } PathTime const &from = ival.from(), &to = ival.to(); bool reverse = ival.reverse(); int di = reverse ? -1 : 1; size_type s = size_closed(); if (!ival.crossesStart() && from.curve_index == to.curve_index) { Curve *c = (*this)[from.curve_index].portion(from.t, to.t); if (p_from) { c->setInitial(*p_from); } if (p_to) { c->setFinal(*p_to); } target.append(c); } else { Curve *c_first = (*this)[from.curve_index].portion(from.t, reverse ? 0 : 1); if (p_from) { c_first->setInitial(*p_from); } target.append(c_first); for (size_type i = (from.curve_index + s + di) % s; i != to.curve_index; i = (i + s + di) % s) { if (reverse) { target.append((*this)[i].reverse()); } else { target.append((*this)[i].duplicate()); } } Curve *c_last = (*this)[to.curve_index].portion(reverse ? 1 : 0, to.t); if (p_to) { c_last->setFinal(*p_to); } target.append(c_last); } } Path Path::reversed() const { typedef std::reverse_iterator RIter; Path ret(finalPoint()); if (empty()) return ret; ret._data->curves.pop_back(); // this also deletes the closing segment from ret RIter iter(_includesClosingSegment() ? _data->curves.end() : _data->curves.end() - 1); RIter rend(_data->curves.begin()); if (_closed) { // when the path is closed, there are two cases: if (front().isLineSegment()) { // 1. initial segment is linear: it becomes the new closing segment. rend = RIter(_data->curves.begin() + 1); ret._closing_seg = new ClosingSegment(front().finalPoint(), front().initialPoint()); } else { // 2. initial segment is not linear: the closing segment becomes degenerate. // However, skip it if it's already degenerate. Point fp = finalPoint(); ret._closing_seg = new ClosingSegment(fp, fp); } } else { // when the path is open, we reverse all real curves, and add a reversed closing segment. ret._closing_seg = static_cast(_closing_seg->reverse()); } for (; iter != rend; ++iter) { ret._data->curves.push_back(iter->reverse()); } ret._data->curves.push_back(ret._closing_seg); ret._closed = _closed; return ret; } void Path::insert(iterator pos, Curve const &curve) { _unshare(); Sequence::iterator seq_pos(seq_iter(pos)); Sequence source; source.push_back(curve.duplicate()); do_update(seq_pos, seq_pos, source); } void Path::erase(iterator pos) { _unshare(); Sequence::iterator seq_pos(seq_iter(pos)); Sequence stitched; do_update(seq_pos, seq_pos + 1, stitched); } void Path::erase(iterator first, iterator last) { _unshare(); Sequence::iterator seq_first = seq_iter(first); Sequence::iterator seq_last = seq_iter(last); Sequence stitched; do_update(seq_first, seq_last, stitched); } void Path::stitchTo(Point const &p) { if (!empty() && _closing_seg->initialPoint() != p) { if (_exception_on_stitch) { THROW_CONTINUITYERROR(); } _unshare(); do_append(new StitchSegment(_closing_seg->initialPoint(), p)); } } void Path::replace(iterator replaced, Curve const &curve) { replace(replaced, replaced + 1, curve); } void Path::replace(iterator first_replaced, iterator last_replaced, Curve const &curve) { _unshare(); Sequence::iterator seq_first_replaced(seq_iter(first_replaced)); Sequence::iterator seq_last_replaced(seq_iter(last_replaced)); Sequence source(1); source.push_back(curve.duplicate()); do_update(seq_first_replaced, seq_last_replaced, source); } void Path::replace(iterator replaced, Path const &path) { replace(replaced, path.begin(), path.end()); } void Path::replace(iterator first, iterator last, Path const &path) { replace(first, last, path.begin(), path.end()); } void Path::snapEnds(Coord precision) { if (!_closed) return; if (_data->curves.size() > 1 && are_near(_closing_seg->length(precision), 0, precision)) { _unshare(); _closing_seg->setInitial(_closing_seg->finalPoint()); (_data->curves.end() - 1)->setFinal(_closing_seg->finalPoint()); } } // replace curves between first and last with contents of source, // void Path::do_update(Sequence::iterator first, Sequence::iterator last, Sequence &source) { // TODO: handle cases where first > last in closed paths? bool last_beyond_closing_segment = (last == _data->curves.end()); // special case: // if do_update replaces the closing segment, we have to regenerate it if (source.empty()) { if (first == last) return; // nothing to do // only removing some segments if ((!_closed && first == _data->curves.begin()) || (!_closed && last == _data->curves.end() - 1) || last_beyond_closing_segment) { // just adjust the closing segment // do nothing } else if (first->initialPoint() != (last - 1)->finalPoint()) { if (_exception_on_stitch) { THROW_CONTINUITYERROR(); } source.push_back(new StitchSegment(first->initialPoint(), (last - 1)->finalPoint())); } } else { // replacing if (first == _data->curves.begin() && last == _data->curves.end()) { // special case: replacing everything should work the same in open and closed curves _data->curves.erase(_data->curves.begin(), _data->curves.end() - 1); _closing_seg->setFinal(source.front().initialPoint()); _closing_seg->setInitial(source.back().finalPoint()); _data->curves.transfer(_data->curves.begin(), source.begin(), source.end(), source); return; } // stitch in front if (!_closed && first == _data->curves.begin()) { // not necessary to stitch in front } else if (first->initialPoint() != source.front().initialPoint()) { if (_exception_on_stitch) { THROW_CONTINUITYERROR(); } source.insert(source.begin(), new StitchSegment(first->initialPoint(), source.front().initialPoint())); } // stitch at the end if ((!_closed && last == _data->curves.end() - 1) || last_beyond_closing_segment) { // repurpose the closing segment as the stitch segment // do nothing } else if (source.back().finalPoint() != (last - 1)->finalPoint()) { if (_exception_on_stitch) { THROW_CONTINUITYERROR(); } source.push_back(new StitchSegment(source.back().finalPoint(), (last - 1)->finalPoint())); } } // do not erase the closing segment, adjust it instead if (last_beyond_closing_segment) { --last; } _data->curves.erase(first, last); _data->curves.transfer(first, source.begin(), source.end(), source); // adjust closing segment if (size_open() == 0) { _closing_seg->setFinal(_closing_seg->initialPoint()); } else { _closing_seg->setInitial(back_open().finalPoint()); _closing_seg->setFinal(front().initialPoint()); } checkContinuity(); } void Path::do_append(Curve *c) { if (&_data->curves.front() == _closing_seg) { _closing_seg->setFinal(c->initialPoint()); } else { // if we can't freely move the closing segment, we check whether // the new curve connects with the last non-closing curve if (c->initialPoint() != _closing_seg->initialPoint()) { THROW_CONTINUITYERROR(); } if (_closed && c->isLineSegment() && c->finalPoint() == _closing_seg->finalPoint()) { // appending a curve that matches the closing segment has no effect delete c; return; } } _data->curves.insert(_data->curves.end() - 1, c); _closing_seg->setInitial(c->finalPoint()); } void Path::checkContinuity() const { Sequence::const_iterator i = _data->curves.begin(), j = _data->curves.begin(); ++j; for (; j != _data->curves.end(); ++i, ++j) { if (i->finalPoint() != j->initialPoint()) { THROW_CONTINUITYERROR(); } } if (_data->curves.front().initialPoint() != _data->curves.back().finalPoint()) { THROW_CONTINUITYERROR(); } } // breaks time value into integral and fractional part PathTime Path::_factorTime(Coord t) const { size_type sz = size_default(); if (t < 0 || t > sz) { THROW_RANGEERROR("parameter t out of bounds"); } PathTime ret; Coord k; ret.t = modf(t, &k); ret.curve_index = k; if (ret.curve_index == sz) { --ret.curve_index; ret.t = 1; } return ret; } Piecewise > paths_to_pw(PathVector const &paths) { Piecewise > ret = paths[0].toPwSb(); for (unsigned i = 1; i < paths.size(); i++) { ret.concat(paths[i].toPwSb()); } return ret; } bool are_near(Path const &a, Path const &b, Coord precision) { if (a.size() != b.size()) return false; for (unsigned i = 0; i < a.size(); ++i) { if (!a[i].isNear(b[i], precision)) return false; } return true; } std::ostream &operator<<(std::ostream &out, Path const &path) { SVGPathWriter pw; pw.feed(path); out << pw.str(); return out; } } // end namespace Geom /* Local Variables: mode:c++ c-file-style:"stroustrup" c-file-offsets:((innamespace . 0)(inline-open . 0)(case-label . +)) indent-tabs-mode:nil fill-column:99 End: */ // vim: filetype=cpp:expandtab:shiftwidth=4:tabstop=8:softtabstop=4:fileencoding=utf-8:textwidth=99 :