mirror of
https://github.com/Luzifer/staticmap.git
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352 lines
16 KiB
Go
352 lines
16 KiB
Go
// Copyright 2017 Google Inc. All rights reserved.
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//
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// Licensed under the Apache License, Version 2.0 (the "License");
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// you may not use this file except in compliance with the License.
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// You may obtain a copy of the License at
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//
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// http://www.apache.org/licenses/LICENSE-2.0
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//
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// Unless required by applicable law or agreed to in writing, software
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// distributed under the License is distributed on an "AS IS" BASIS,
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// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
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// See the License for the specific language governing permissions and
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// limitations under the License.
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package s2
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import (
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"math"
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"github.com/golang/geo/r1"
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"github.com/golang/geo/r3"
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"github.com/golang/geo/s1"
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)
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// RectBounder is used to compute a bounding rectangle that contains all edges
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// defined by a vertex chain (v0, v1, v2, ...). All vertices must be unit length.
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// Note that the bounding rectangle of an edge can be larger than the bounding
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// rectangle of its endpoints, e.g. consider an edge that passes through the North Pole.
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//
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// The bounds are calculated conservatively to account for numerical errors
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// when points are converted to LatLngs. More precisely, this function
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// guarantees the following:
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// Let L be a closed edge chain (Loop) such that the interior of the loop does
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// not contain either pole. Now if P is any point such that L.ContainsPoint(P),
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// then RectBound(L).ContainsPoint(LatLngFromPoint(P)).
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type RectBounder struct {
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// The previous vertex in the chain.
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a Point
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// The previous vertex latitude longitude.
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aLL LatLng
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bound Rect
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}
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// NewRectBounder returns a new instance of a RectBounder.
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func NewRectBounder() *RectBounder {
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return &RectBounder{
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bound: EmptyRect(),
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}
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}
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// maxErrorForTests returns the maximum error in RectBound provided that the
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// result does not include either pole. It is only used for testing purposes
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func (r *RectBounder) maxErrorForTests() LatLng {
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// The maximum error in the latitude calculation is
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// 3.84 * dblEpsilon for the PointCross calculation
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// 0.96 * dblEpsilon for the Latitude calculation
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// 5 * dblEpsilon added by AddPoint/RectBound to compensate for error
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// -----------------
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// 9.80 * dblEpsilon maximum error in result
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//
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// The maximum error in the longitude calculation is dblEpsilon. RectBound
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// does not do any expansion because this isn't necessary in order to
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// bound the *rounded* longitudes of contained points.
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return LatLng{10 * dblEpsilon * s1.Radian, 1 * dblEpsilon * s1.Radian}
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}
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// AddPoint adds the given point to the chain. The Point must be unit length.
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func (r *RectBounder) AddPoint(b Point) {
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bLL := LatLngFromPoint(b)
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if r.bound.IsEmpty() {
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r.a = b
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r.aLL = bLL
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r.bound = r.bound.AddPoint(bLL)
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return
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}
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// First compute the cross product N = A x B robustly. This is the normal
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// to the great circle through A and B. We don't use RobustSign
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// since that method returns an arbitrary vector orthogonal to A if the two
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// vectors are proportional, and we want the zero vector in that case.
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n := r.a.Sub(b.Vector).Cross(r.a.Add(b.Vector)) // N = 2 * (A x B)
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// The relative error in N gets large as its norm gets very small (i.e.,
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// when the two points are nearly identical or antipodal). We handle this
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// by choosing a maximum allowable error, and if the error is greater than
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// this we fall back to a different technique. Since it turns out that
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// the other sources of error in converting the normal to a maximum
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// latitude add up to at most 1.16 * dblEpsilon, and it is desirable to
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// have the total error be a multiple of dblEpsilon, we have chosen to
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// limit the maximum error in the normal to be 3.84 * dblEpsilon.
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// It is possible to show that the error is less than this when
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//
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// n.Norm() >= 8 * sqrt(3) / (3.84 - 0.5 - sqrt(3)) * dblEpsilon
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// = 1.91346e-15 (about 8.618 * dblEpsilon)
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nNorm := n.Norm()
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if nNorm < 1.91346e-15 {
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// A and B are either nearly identical or nearly antipodal (to within
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// 4.309 * dblEpsilon, or about 6 nanometers on the earth's surface).
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if r.a.Dot(b.Vector) < 0 {
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// The two points are nearly antipodal. The easiest solution is to
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// assume that the edge between A and B could go in any direction
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// around the sphere.
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r.bound = FullRect()
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} else {
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// The two points are nearly identical (to within 4.309 * dblEpsilon).
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// In this case we can just use the bounding rectangle of the points,
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// since after the expansion done by GetBound this Rect is
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// guaranteed to include the (lat,lng) values of all points along AB.
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r.bound = r.bound.Union(RectFromLatLng(r.aLL).AddPoint(bLL))
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}
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r.a = b
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r.aLL = bLL
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return
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}
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// Compute the longitude range spanned by AB.
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lngAB := s1.EmptyInterval().AddPoint(r.aLL.Lng.Radians()).AddPoint(bLL.Lng.Radians())
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if lngAB.Length() >= math.Pi-2*dblEpsilon {
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// The points lie on nearly opposite lines of longitude to within the
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// maximum error of the calculation. The easiest solution is to assume
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// that AB could go on either side of the pole.
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lngAB = s1.FullInterval()
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}
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// Next we compute the latitude range spanned by the edge AB. We start
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// with the range spanning the two endpoints of the edge:
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latAB := r1.IntervalFromPoint(r.aLL.Lat.Radians()).AddPoint(bLL.Lat.Radians())
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// This is the desired range unless the edge AB crosses the plane
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// through N and the Z-axis (which is where the great circle through A
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// and B attains its minimum and maximum latitudes). To test whether AB
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// crosses this plane, we compute a vector M perpendicular to this
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// plane and then project A and B onto it.
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m := n.Cross(r3.Vector{0, 0, 1})
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mA := m.Dot(r.a.Vector)
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mB := m.Dot(b.Vector)
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// We want to test the signs of "mA" and "mB", so we need to bound
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// the error in these calculations. It is possible to show that the
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// total error is bounded by
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//
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// (1 + sqrt(3)) * dblEpsilon * nNorm + 8 * sqrt(3) * (dblEpsilon**2)
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// = 6.06638e-16 * nNorm + 6.83174e-31
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mError := 6.06638e-16*nNorm + 6.83174e-31
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if mA*mB < 0 || math.Abs(mA) <= mError || math.Abs(mB) <= mError {
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// Minimum/maximum latitude *may* occur in the edge interior.
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//
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// The maximum latitude is 90 degrees minus the latitude of N. We
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// compute this directly using atan2 in order to get maximum accuracy
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// near the poles.
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//
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// Our goal is compute a bound that contains the computed latitudes of
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// all S2Points P that pass the point-in-polygon containment test.
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// There are three sources of error we need to consider:
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// - the directional error in N (at most 3.84 * dblEpsilon)
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// - converting N to a maximum latitude
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// - computing the latitude of the test point P
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// The latter two sources of error are at most 0.955 * dblEpsilon
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// individually, but it is possible to show by a more complex analysis
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// that together they can add up to at most 1.16 * dblEpsilon, for a
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// total error of 5 * dblEpsilon.
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//
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// We add 3 * dblEpsilon to the bound here, and GetBound() will pad
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// the bound by another 2 * dblEpsilon.
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maxLat := math.Min(
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math.Atan2(math.Sqrt(n.X*n.X+n.Y*n.Y), math.Abs(n.Z))+3*dblEpsilon,
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math.Pi/2)
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// In order to get tight bounds when the two points are close together,
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// we also bound the min/max latitude relative to the latitudes of the
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// endpoints A and B. First we compute the distance between A and B,
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// and then we compute the maximum change in latitude between any two
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// points along the great circle that are separated by this distance.
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// This gives us a latitude change "budget". Some of this budget must
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// be spent getting from A to B; the remainder bounds the round-trip
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// distance (in latitude) from A or B to the min or max latitude
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// attained along the edge AB.
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latBudget := 2 * math.Asin(0.5*(r.a.Sub(b.Vector)).Norm()*math.Sin(maxLat))
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maxDelta := 0.5*(latBudget-latAB.Length()) + dblEpsilon
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// Test whether AB passes through the point of maximum latitude or
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// minimum latitude. If the dot product(s) are small enough then the
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// result may be ambiguous.
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if mA <= mError && mB >= -mError {
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latAB.Hi = math.Min(maxLat, latAB.Hi+maxDelta)
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}
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if mB <= mError && mA >= -mError {
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latAB.Lo = math.Max(-maxLat, latAB.Lo-maxDelta)
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}
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}
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r.a = b
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r.aLL = bLL
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r.bound = r.bound.Union(Rect{latAB, lngAB})
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}
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// RectBound returns the bounding rectangle of the edge chain that connects the
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// vertices defined so far. This bound satisfies the guarantee made
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// above, i.e. if the edge chain defines a Loop, then the bound contains
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// the LatLng coordinates of all Points contained by the loop.
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func (r *RectBounder) RectBound() Rect {
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return r.bound.expanded(LatLng{s1.Angle(2 * dblEpsilon), 0}).PolarClosure()
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}
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// ExpandForSubregions expands a bounding Rect so that it is guaranteed to
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// contain the bounds of any subregion whose bounds are computed using
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// ComputeRectBound. For example, consider a loop L that defines a square.
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// GetBound ensures that if a point P is contained by this square, then
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// LatLngFromPoint(P) is contained by the bound. But now consider a diamond
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// shaped loop S contained by L. It is possible that GetBound returns a
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// *larger* bound for S than it does for L, due to rounding errors. This
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// method expands the bound for L so that it is guaranteed to contain the
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// bounds of any subregion S.
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//
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// More precisely, if L is a loop that does not contain either pole, and S
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// is a loop such that L.Contains(S), then
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//
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// ExpandForSubregions(L.RectBound).Contains(S.RectBound).
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//
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func ExpandForSubregions(bound Rect) Rect {
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// Empty bounds don't need expansion.
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if bound.IsEmpty() {
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return bound
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}
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// First we need to check whether the bound B contains any nearly-antipodal
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// points (to within 4.309 * dblEpsilon). If so then we need to return
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// FullRect, since the subregion might have an edge between two
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// such points, and AddPoint returns Full for such edges. Note that
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// this can happen even if B is not Full for example, consider a loop
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// that defines a 10km strip straddling the equator extending from
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// longitudes -100 to +100 degrees.
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//
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// It is easy to check whether B contains any antipodal points, but checking
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// for nearly-antipodal points is trickier. Essentially we consider the
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// original bound B and its reflection through the origin B', and then test
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// whether the minimum distance between B and B' is less than 4.309 * dblEpsilon.
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// lngGap is a lower bound on the longitudinal distance between B and its
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// reflection B'. (2.5 * dblEpsilon is the maximum combined error of the
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// endpoint longitude calculations and the Length call.)
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lngGap := math.Max(0, math.Pi-bound.Lng.Length()-2.5*dblEpsilon)
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// minAbsLat is the minimum distance from B to the equator (if zero or
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// negative, then B straddles the equator).
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minAbsLat := math.Max(bound.Lat.Lo, -bound.Lat.Hi)
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// latGapSouth and latGapNorth measure the minimum distance from B to the
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// south and north poles respectively.
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latGapSouth := math.Pi/2 + bound.Lat.Lo
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latGapNorth := math.Pi/2 - bound.Lat.Hi
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if minAbsLat >= 0 {
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// The bound B does not straddle the equator. In this case the minimum
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// distance is between one endpoint of the latitude edge in B closest to
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// the equator and the other endpoint of that edge in B'. The latitude
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// distance between these two points is 2*minAbsLat, and the longitude
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// distance is lngGap. We could compute the distance exactly using the
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// Haversine formula, but then we would need to bound the errors in that
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// calculation. Since we only need accuracy when the distance is very
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// small (close to 4.309 * dblEpsilon), we substitute the Euclidean
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// distance instead. This gives us a right triangle XYZ with two edges of
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// length x = 2*minAbsLat and y ~= lngGap. The desired distance is the
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// length of the third edge z, and we have
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//
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// z ~= sqrt(x^2 + y^2) >= (x + y) / sqrt(2)
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//
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// Therefore the region may contain nearly antipodal points only if
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//
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// 2*minAbsLat + lngGap < sqrt(2) * 4.309 * dblEpsilon
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// ~= 1.354e-15
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//
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// Note that because the given bound B is conservative, minAbsLat and
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// lngGap are both lower bounds on their true values so we do not need
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// to make any adjustments for their errors.
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if 2*minAbsLat+lngGap < 1.354e-15 {
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return FullRect()
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}
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} else if lngGap >= math.Pi/2 {
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// B spans at most Pi/2 in longitude. The minimum distance is always
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// between one corner of B and the diagonally opposite corner of B'. We
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// use the same distance approximation that we used above; in this case
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// we have an obtuse triangle XYZ with two edges of length x = latGapSouth
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// and y = latGapNorth, and angle Z >= Pi/2 between them. We then have
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//
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// z >= sqrt(x^2 + y^2) >= (x + y) / sqrt(2)
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//
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// Unlike the case above, latGapSouth and latGapNorth are not lower bounds
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// (because of the extra addition operation, and because math.Pi/2 is not
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// exactly equal to Pi/2); they can exceed their true values by up to
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// 0.75 * dblEpsilon. Putting this all together, the region may contain
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// nearly antipodal points only if
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//
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// latGapSouth + latGapNorth < (sqrt(2) * 4.309 + 1.5) * dblEpsilon
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// ~= 1.687e-15
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if latGapSouth+latGapNorth < 1.687e-15 {
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return FullRect()
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}
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} else {
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// Otherwise we know that (1) the bound straddles the equator and (2) its
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// width in longitude is at least Pi/2. In this case the minimum
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// distance can occur either between a corner of B and the diagonally
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// opposite corner of B' (as in the case above), or between a corner of B
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// and the opposite longitudinal edge reflected in B'. It is sufficient
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// to only consider the corner-edge case, since this distance is also a
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// lower bound on the corner-corner distance when that case applies.
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// Consider the spherical triangle XYZ where X is a corner of B with
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// minimum absolute latitude, Y is the closest pole to X, and Z is the
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// point closest to X on the opposite longitudinal edge of B'. This is a
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// right triangle (Z = Pi/2), and from the spherical law of sines we have
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//
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// sin(z) / sin(Z) = sin(y) / sin(Y)
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// sin(maxLatGap) / 1 = sin(dMin) / sin(lngGap)
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// sin(dMin) = sin(maxLatGap) * sin(lngGap)
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//
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// where "maxLatGap" = max(latGapSouth, latGapNorth) and "dMin" is the
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// desired minimum distance. Now using the facts that sin(t) >= (2/Pi)*t
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// for 0 <= t <= Pi/2, that we only need an accurate approximation when
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// at least one of "maxLatGap" or lngGap is extremely small (in which
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// case sin(t) ~= t), and recalling that "maxLatGap" has an error of up
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// to 0.75 * dblEpsilon, we want to test whether
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//
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// maxLatGap * lngGap < (4.309 + 0.75) * (Pi/2) * dblEpsilon
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// ~= 1.765e-15
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if math.Max(latGapSouth, latGapNorth)*lngGap < 1.765e-15 {
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return FullRect()
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}
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}
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// Next we need to check whether the subregion might contain any edges that
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// span (math.Pi - 2 * dblEpsilon) radians or more in longitude, since AddPoint
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// sets the longitude bound to Full in that case. This corresponds to
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// testing whether (lngGap <= 0) in lngExpansion below.
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// Otherwise, the maximum latitude error in AddPoint is 4.8 * dblEpsilon.
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// In the worst case, the errors when computing the latitude bound for a
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// subregion could go in the opposite direction as the errors when computing
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// the bound for the original region, so we need to double this value.
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// (More analysis shows that it's okay to round down to a multiple of
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// dblEpsilon.)
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//
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// For longitude, we rely on the fact that atan2 is correctly rounded and
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// therefore no additional bounds expansion is necessary.
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latExpansion := 9 * dblEpsilon
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lngExpansion := 0.0
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if lngGap <= 0 {
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lngExpansion = math.Pi
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}
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return bound.expanded(LatLng{s1.Angle(latExpansion), s1.Angle(lngExpansion)}).PolarClosure()
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}
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