mirror of
https://github.com/superseriousbusiness/gotosocial.git
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150 lines
6.3 KiB
Go
150 lines
6.3 KiB
Go
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// Copyright 2018 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/s1"
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)
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// PointArea returns the area of triangle ABC. This method combines two different
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// algorithms to get accurate results for both large and small triangles.
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// The maximum error is about 5e-15 (about 0.25 square meters on the Earth's
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// surface), the same as GirardArea below, but unlike that method it is
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// also accurate for small triangles. Example: when the true area is 100
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// square meters, PointArea yields an error about 1 trillion times smaller than
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// GirardArea.
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//
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// All points should be unit length, and no two points should be antipodal.
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// The area is always positive.
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func PointArea(a, b, c Point) float64 {
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// This method is based on l'Huilier's theorem,
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//
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// tan(E/4) = sqrt(tan(s/2) tan((s-a)/2) tan((s-b)/2) tan((s-c)/2))
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//
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// where E is the spherical excess of the triangle (i.e. its area),
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// a, b, c are the side lengths, and
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// s is the semiperimeter (a + b + c) / 2.
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//
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// The only significant source of error using l'Huilier's method is the
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// cancellation error of the terms (s-a), (s-b), (s-c). This leads to a
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// *relative* error of about 1e-16 * s / min(s-a, s-b, s-c). This compares
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// to a relative error of about 1e-15 / E using Girard's formula, where E is
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// the true area of the triangle. Girard's formula can be even worse than
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// this for very small triangles, e.g. a triangle with a true area of 1e-30
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// might evaluate to 1e-5.
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//
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// So, we prefer l'Huilier's formula unless dmin < s * (0.1 * E), where
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// dmin = min(s-a, s-b, s-c). This basically includes all triangles
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// except for extremely long and skinny ones.
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//
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// Since we don't know E, we would like a conservative upper bound on
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// the triangle area in terms of s and dmin. It's possible to show that
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// E <= k1 * s * sqrt(s * dmin), where k1 = 2*sqrt(3)/Pi (about 1).
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// Using this, it's easy to show that we should always use l'Huilier's
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// method if dmin >= k2 * s^5, where k2 is about 1e-2. Furthermore,
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// if dmin < k2 * s^5, the triangle area is at most k3 * s^4, where
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// k3 is about 0.1. Since the best case error using Girard's formula
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// is about 1e-15, this means that we shouldn't even consider it unless
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// s >= 3e-4 or so.
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sa := float64(b.Angle(c.Vector))
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sb := float64(c.Angle(a.Vector))
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sc := float64(a.Angle(b.Vector))
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s := 0.5 * (sa + sb + sc)
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if s >= 3e-4 {
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// Consider whether Girard's formula might be more accurate.
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dmin := s - math.Max(sa, math.Max(sb, sc))
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if dmin < 1e-2*s*s*s*s*s {
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// This triangle is skinny enough to use Girard's formula.
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area := GirardArea(a, b, c)
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if dmin < s*0.1*area {
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return area
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}
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}
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}
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// Use l'Huilier's formula.
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return 4 * math.Atan(math.Sqrt(math.Max(0.0, math.Tan(0.5*s)*math.Tan(0.5*(s-sa))*
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math.Tan(0.5*(s-sb))*math.Tan(0.5*(s-sc)))))
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}
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// GirardArea returns the area of the triangle computed using Girard's formula.
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// All points should be unit length, and no two points should be antipodal.
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//
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// This method is about twice as fast as PointArea() but has poor relative
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// accuracy for small triangles. The maximum error is about 5e-15 (about
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// 0.25 square meters on the Earth's surface) and the average error is about
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// 1e-15. These bounds apply to triangles of any size, even as the maximum
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// edge length of the triangle approaches 180 degrees. But note that for
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// such triangles, tiny perturbations of the input points can change the
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// true mathematical area dramatically.
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func GirardArea(a, b, c Point) float64 {
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// This is equivalent to the usual Girard's formula but is slightly more
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// accurate, faster to compute, and handles a == b == c without a special
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// case. PointCross is necessary to get good accuracy when two of
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// the input points are very close together.
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ab := a.PointCross(b)
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bc := b.PointCross(c)
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ac := a.PointCross(c)
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area := float64(ab.Angle(ac.Vector) - ab.Angle(bc.Vector) + bc.Angle(ac.Vector))
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if area < 0 {
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area = 0
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}
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return area
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}
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// SignedArea returns a positive value for counterclockwise triangles and a negative
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// value otherwise (similar to PointArea).
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func SignedArea(a, b, c Point) float64 {
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return float64(RobustSign(a, b, c)) * PointArea(a, b, c)
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}
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// Angle returns the interior angle at the vertex B in the triangle ABC. The
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// return value is always in the range [0, pi]. All points should be
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// normalized. Ensures that Angle(a,b,c) == Angle(c,b,a) for all a,b,c.
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//
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// The angle is undefined if A or C is diametrically opposite from B, and
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// becomes numerically unstable as the length of edge AB or BC approaches
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// 180 degrees.
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func Angle(a, b, c Point) s1.Angle {
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// PointCross is necessary to get good accuracy when two of the input
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// points are very close together.
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return a.PointCross(b).Angle(c.PointCross(b).Vector)
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}
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// TurnAngle returns the exterior angle at vertex B in the triangle ABC. The
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// return value is positive if ABC is counterclockwise and negative otherwise.
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// If you imagine an ant walking from A to B to C, this is the angle that the
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// ant turns at vertex B (positive = left = CCW, negative = right = CW).
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// This quantity is also known as the "geodesic curvature" at B.
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//
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// Ensures that TurnAngle(a,b,c) == -TurnAngle(c,b,a) for all distinct
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// a,b,c. The result is undefined if (a == b || b == c), but is either
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// -Pi or Pi if (a == c). All points should be normalized.
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func TurnAngle(a, b, c Point) s1.Angle {
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// We use PointCross to get good accuracy when two points are very
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// close together, and RobustSign to ensure that the sign is correct for
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// turns that are close to 180 degrees.
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angle := a.PointCross(b).Angle(b.PointCross(c).Vector)
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// Don't return RobustSign * angle because it is legal to have (a == c).
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if RobustSign(a, b, c) == CounterClockwise {
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return angle
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}
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return -angle
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}
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