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brep2sdf/code/pre_processing/ParametricSample/Mathematics/RectangleManager.h

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// David Eberly, Geometric Tools, Redmond WA 98052
// Copyright (c) 1998-2021
// Distributed under the Boost Software License, Version 1.0.
// https://www.boost.org/LICENSE_1_0.txt
// https://www.geometrictools.com/License/Boost/LICENSE_1_0.txt
// Version: 4.0.2019.08.13
#pragma once
#include <Mathematics/IntrAlignedBox2AlignedBox2.h>
#include <Mathematics/EdgeKey.h>
#include <set>
#include <vector>
namespace gte
{
template <typename Real>
class RectangleManager
{
public:
// Construction.
RectangleManager(std::vector<AlignedBox2<Real>>& rectangles)
:
mRectangles(rectangles)
{
Initialize();
}
// No default construction, copy construction, or assignment are
// allowed.
RectangleManager() = delete;
RectangleManager(RectangleManager const&) = delete;
RectangleManager& operator=(RectangleManager const&) = delete;
// This function is called by the constructor and does the
// sort-and-sweep to initialize the update system. However, if you
// add or remove items from the array of rectangles after the
// constructor call, you will need to call this function once before
// you start the multiple calls of the update function.
void Initialize()
{
// Get the rectangle endpoints.
int intrSize = static_cast<int>(mRectangles.size()), endpSize = 2 * intrSize;
mXEndpoints.resize(endpSize);
mYEndpoints.resize(endpSize);
for (int i = 0, j = 0; i < intrSize; ++i)
{
mXEndpoints[j].type = 0;
mXEndpoints[j].value = mRectangles[i].min[0];
mXEndpoints[j].index = i;
mYEndpoints[j].type = 0;
mYEndpoints[j].value = mRectangles[i].min[1];
mYEndpoints[j].index = i;
++j;
mXEndpoints[j].type = 1;
mXEndpoints[j].value = mRectangles[i].max[0];
mXEndpoints[j].index = i;
mYEndpoints[j].type = 1;
mYEndpoints[j].value = mRectangles[i].max[1];
mYEndpoints[j].index = i;
++j;
}
// Sort the rectangle endpoints.
std::sort(mXEndpoints.begin(), mXEndpoints.end());
std::sort(mYEndpoints.begin(), mYEndpoints.end());
// Create the interval-to-endpoint lookup tables.
mXLookup.resize(endpSize);
mYLookup.resize(endpSize);
for (int j = 0; j < endpSize; ++j)
{
mXLookup[2 * mXEndpoints[j].index + mXEndpoints[j].type] = j;
mYLookup[2 * mYEndpoints[j].index + mYEndpoints[j].type] = j;
}
// Active set of rectangles (stored by index in array).
std::set<int> active;
// Set of overlapping rectangles (stored by pairs of indices in
// array).
mOverlap.clear();
// Sweep through the endpoints to determine overlapping
// x-intervals.
for (int i = 0; i < endpSize; ++i)
{
Endpoint& endpoint = mXEndpoints[i];
int index = endpoint.index;
if (endpoint.type == 0) // an interval 'begin' value
{
// In the 1D problem, the current interval overlaps with
// all the active intervals. In 2D we also need to check
// for y-overlap.
for (auto activeIndex : active)
{
// Rectangles activeIndex and index overlap in the
// x-dimension. Test for overlap in the y-dimension.
AlignedBox2<Real> const& r0 = mRectangles[activeIndex];
AlignedBox2<Real> const& r1 = mRectangles[index];
if (r0.max[1] >= r1.min[1] && r0.min[1] <= r1.max[1])
{
if (activeIndex < index)
{
mOverlap.insert(EdgeKey<false>(activeIndex, index));
}
else
{
mOverlap.insert(EdgeKey<false>(index, activeIndex));
}
}
}
active.insert(index);
}
else // an interval 'end' value
{
active.erase(index);
}
}
}
// After the system is initialized, you can move the rectangles using
// this function. It is not enough to modify the input array of
// rectangles because the endpoint values stored internally by this
// class must also change. You can also retrieve the current
// rectangles information.
void SetRectangle(int i, AlignedBox2<Real> const& rectangle)
{
mRectangles[i] = rectangle;
mXEndpoints[mXLookup[2 * i]].value = rectangle.min[0];
mXEndpoints[mXLookup[2 * i + 1]].value = rectangle.max[0];
mYEndpoints[mYLookup[2 * i]].value = rectangle.min[1];
mYEndpoints[mYLookup[2 * i + 1]].value = rectangle.max[1];
}
inline void GetRectangle(int i, AlignedBox2<Real>& rectangle) const
{
rectangle = mRectangles[i];
}
// When you are finished moving rectangles, call this function to
// determine the overlapping rectangles. An incremental update is
// applied to determine the new set of overlapping rectangles.
void Update()
{
InsertionSort(mXEndpoints, mXLookup);
InsertionSort(mYEndpoints, mYLookup);
}
// If (i,j) is in the overlap set, then rectangle i and rectangle j
// are overlapping. The indices are those for the the input array.
// The set elements (i,j) are stored so that i < j.
inline std::set<EdgeKey<false>> const& GetOverlap() const
{
return mOverlap;
}
private:
class Endpoint
{
public:
Real value; // endpoint value
int type; // '0' if interval min, '1' if interval max.
int index; // index of interval containing this endpoint
// Support for sorting of endpoints.
bool operator<(Endpoint const& endpoint) const
{
if (value < endpoint.value)
{
return true;
}
if (value > endpoint.value)
{
return false;
}
return type < endpoint.type;
}
};
void InsertionSort(std::vector<Endpoint>& endpoint, std::vector<int>& lookup)
{
// Apply an insertion sort. Under the assumption that the
// rectangles have not changed much since the last call, the
// endpoints are nearly sorted. The insertion sort should be very
// fast in this case.
TIQuery<Real, AlignedBox2<Real>, AlignedBox2<Real>> query;
int endpSize = static_cast<int>(endpoint.size());
for (int j = 1; j < endpSize; ++j)
{
Endpoint key = endpoint[j];
int i = j - 1;
while (i >= 0 && key < endpoint[i])
{
Endpoint e0 = endpoint[i];
Endpoint e1 = endpoint[i + 1];
// Update the overlap status.
if (e0.type == 0)
{
if (e1.type == 1)
{
// The 'b' of interval E0.index was smaller than
// the 'e' of interval E1.index, and the intervals
// *might have been* overlapping. Now 'b' and 'e'
// are swapped, and the intervals cannot overlap.
// Remove the pair from the overlap set. The
// removal operation needs to find the pair and
// erase it if it exists. Finding the pair is the
// expensive part of the operation, so there is no
// real time savings in testing for existence
// first, then deleting if it does.
mOverlap.erase(EdgeKey<false>(e0.index, e1.index));
}
}
else
{
if (e1.type == 0)
{
// The 'b' of interval E1.index was larger than
// the 'e' of interval E0.index, and the intervals
// were not overlapping. Now 'b' and 'e' are
// swapped, and the intervals *might be*
// overlapping. Determine if they are overlapping
// and then insert.
if (query(mRectangles[e0.index], mRectangles[e1.index]).intersect)
{
mOverlap.insert(EdgeKey<false>(e0.index, e1.index));
}
}
}
// Reorder the items to maintain the sorted list.
endpoint[i] = e1;
endpoint[i + 1] = e0;
lookup[2 * e1.index + e1.type] = i;
lookup[2 * e0.index + e0.type] = i + 1;
--i;
}
endpoint[i + 1] = key;
lookup[2 * key.index + key.type] = i + 1;
}
}
std::vector<AlignedBox2<Real>>& mRectangles;
std::vector<Endpoint> mXEndpoints, mYEndpoints;
std::set<EdgeKey<false>> mOverlap;
// The intervals are indexed 0 <= i < n. The endpoint array has 2*n
// entries. The original 2*n interval values are ordered as
// b[0], e[0], b[1], e[1], ..., b[n-1], e[n-1]
// When the endpoint array is sorted, the mapping between interval
// values and endpoints is lost. In order to modify interval values
// that are stored in the endpoint array, we need to maintain the
// mapping. This is done by the following lookup table of 2*n
// entries. The value mLookup[2*i] is the index of b[i] in the
// endpoint array. The value mLookup[2*i+1] is the index of e[i]
// in the endpoint array.
std::vector<int> mXLookup, mYLookup;
};
}