mirror of
https://github.com/superseriousbusiness/gotosocial
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98263a7de6
* start fixing up tests * fix up tests + automate with drone * fiddle with linting * messing about with drone.yml * some more fiddling * hmmm * add cache * add vendor directory * verbose * ci updates * update some little things * update sig
701 lines
26 KiB
Go
701 lines
26 KiB
Go
// Copyright 2016 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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// This file contains various predicates that are guaranteed to produce
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// correct, consistent results. They are also relatively efficient. This is
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// achieved by computing conservative error bounds and falling back to high
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// precision or even exact arithmetic when the result is uncertain. Such
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// predicates are useful in implementing robust algorithms.
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//
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// See also EdgeCrosser, which implements various exact
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// edge-crossing predicates more efficiently than can be done here.
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import (
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"math"
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"math/big"
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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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const (
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// If any other machine architectures need to be suppported, these next three
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// values will need to be updated.
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// epsilon is a small number that represents a reasonable level of noise between two
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// values that can be considered to be equal.
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epsilon = 1e-15
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// dblEpsilon is a smaller number for values that require more precision.
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// This is the C++ DBL_EPSILON equivalent.
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dblEpsilon = 2.220446049250313e-16
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// dblError is the C++ value for S2 rounding_epsilon().
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dblError = 1.110223024625156e-16
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// maxDeterminantError is the maximum error in computing (AxB).C where all vectors
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// are unit length. Using standard inequalities, it can be shown that
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//
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// fl(AxB) = AxB + D where |D| <= (|AxB| + (2/sqrt(3))*|A|*|B|) * e
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//
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// where "fl()" denotes a calculation done in floating-point arithmetic,
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// |x| denotes either absolute value or the L2-norm as appropriate, and
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// e is a reasonably small value near the noise level of floating point
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// number accuracy. Similarly,
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//
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// fl(B.C) = B.C + d where |d| <= (|B.C| + 2*|B|*|C|) * e .
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//
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// Applying these bounds to the unit-length vectors A,B,C and neglecting
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// relative error (which does not affect the sign of the result), we get
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//
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// fl((AxB).C) = (AxB).C + d where |d| <= (3 + 2/sqrt(3)) * e
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maxDeterminantError = 1.8274 * dblEpsilon
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// detErrorMultiplier is the factor to scale the magnitudes by when checking
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// for the sign of set of points with certainty. Using a similar technique to
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// the one used for maxDeterminantError, the error is at most:
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//
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// |d| <= (3 + 6/sqrt(3)) * |A-C| * |B-C| * e
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//
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// If the determinant magnitude is larger than this value then we know
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// its sign with certainty.
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detErrorMultiplier = 3.2321 * dblEpsilon
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)
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// Direction is an indication of the ordering of a set of points.
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type Direction int
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// These are the three options for the direction of a set of points.
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const (
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Clockwise Direction = -1
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Indeterminate Direction = 0
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CounterClockwise Direction = 1
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)
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// newBigFloat constructs a new big.Float with maximum precision.
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func newBigFloat() *big.Float { return new(big.Float).SetPrec(big.MaxPrec) }
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// Sign returns true if the points A, B, C are strictly counterclockwise,
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// and returns false if the points are clockwise or collinear (i.e. if they are all
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// contained on some great circle).
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//
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// Due to numerical errors, situations may arise that are mathematically
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// impossible, e.g. ABC may be considered strictly CCW while BCA is not.
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// However, the implementation guarantees the following:
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//
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// If Sign(a,b,c), then !Sign(c,b,a) for all a,b,c.
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func Sign(a, b, c Point) bool {
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// NOTE(dnadasi): In the C++ API the equivalent method here was known as "SimpleSign".
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// We compute the signed volume of the parallelepiped ABC. The usual
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// formula for this is (A ⨯ B) · C, but we compute it here using (C ⨯ A) · B
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// in order to ensure that ABC and CBA are not both CCW. This follows
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// from the following identities (which are true numerically, not just
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// mathematically):
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//
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// (1) x ⨯ y == -(y ⨯ x)
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// (2) -x · y == -(x · y)
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return c.Cross(a.Vector).Dot(b.Vector) > 0
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}
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// RobustSign returns a Direction representing the ordering of the points.
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// CounterClockwise is returned if the points are in counter-clockwise order,
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// Clockwise for clockwise, and Indeterminate if any two points are the same (collinear),
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// or the sign could not completely be determined.
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//
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// This function has additional logic to make sure that the above properties hold even
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// when the three points are coplanar, and to deal with the limitations of
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// floating-point arithmetic.
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//
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// RobustSign satisfies the following conditions:
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//
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// (1) RobustSign(a,b,c) == Indeterminate if and only if a == b, b == c, or c == a
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// (2) RobustSign(b,c,a) == RobustSign(a,b,c) for all a,b,c
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// (3) RobustSign(c,b,a) == -RobustSign(a,b,c) for all a,b,c
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//
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// In other words:
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//
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// (1) The result is Indeterminate if and only if two points are the same.
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// (2) Rotating the order of the arguments does not affect the result.
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// (3) Exchanging any two arguments inverts the result.
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//
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// On the other hand, note that it is not true in general that
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// RobustSign(-a,b,c) == -RobustSign(a,b,c), or any similar identities
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// involving antipodal points.
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func RobustSign(a, b, c Point) Direction {
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sign := triageSign(a, b, c)
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if sign == Indeterminate {
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sign = expensiveSign(a, b, c)
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}
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return sign
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}
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// stableSign reports the direction sign of the points in a numerically stable way.
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// Unlike triageSign, this method can usually compute the correct determinant sign
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// even when all three points are as collinear as possible. For example if three
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// points are spaced 1km apart along a random line on the Earth's surface using
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// the nearest representable points, there is only a 0.4% chance that this method
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// will not be able to find the determinant sign. The probability of failure
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// decreases as the points get closer together; if the collinear points are 1 meter
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// apart, the failure rate drops to 0.0004%.
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//
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// This method could be extended to also handle nearly-antipodal points, but antipodal
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// points are rare in practice so it seems better to simply fall back to
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// exact arithmetic in that case.
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func stableSign(a, b, c Point) Direction {
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ab := b.Sub(a.Vector)
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ab2 := ab.Norm2()
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bc := c.Sub(b.Vector)
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bc2 := bc.Norm2()
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ca := a.Sub(c.Vector)
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ca2 := ca.Norm2()
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// Now compute the determinant ((A-C)x(B-C)).C, where the vertices have been
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// cyclically permuted if necessary so that AB is the longest edge. (This
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// minimizes the magnitude of cross product.) At the same time we also
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// compute the maximum error in the determinant.
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// The two shortest edges, pointing away from their common point.
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var e1, e2, op r3.Vector
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if ab2 >= bc2 && ab2 >= ca2 {
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// AB is the longest edge.
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e1, e2, op = ca, bc, c.Vector
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} else if bc2 >= ca2 {
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// BC is the longest edge.
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e1, e2, op = ab, ca, a.Vector
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} else {
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// CA is the longest edge.
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e1, e2, op = bc, ab, b.Vector
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}
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det := -e1.Cross(e2).Dot(op)
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maxErr := detErrorMultiplier * math.Sqrt(e1.Norm2()*e2.Norm2())
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// If the determinant isn't zero, within maxErr, we know definitively the point ordering.
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if det > maxErr {
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return CounterClockwise
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}
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if det < -maxErr {
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return Clockwise
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}
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return Indeterminate
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}
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// triageSign returns the direction sign of the points. It returns Indeterminate if two
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// points are identical or the result is uncertain. Uncertain cases can be resolved, if
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// desired, by calling expensiveSign.
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//
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// The purpose of this method is to allow additional cheap tests to be done without
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// calling expensiveSign.
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func triageSign(a, b, c Point) Direction {
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det := a.Cross(b.Vector).Dot(c.Vector)
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if det > maxDeterminantError {
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return CounterClockwise
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}
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if det < -maxDeterminantError {
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return Clockwise
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}
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return Indeterminate
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}
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// expensiveSign reports the direction sign of the points. It returns Indeterminate
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// if two of the input points are the same. It uses multiple-precision arithmetic
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// to ensure that its results are always self-consistent.
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func expensiveSign(a, b, c Point) Direction {
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// Return Indeterminate if and only if two points are the same.
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// This ensures RobustSign(a,b,c) == Indeterminate if and only if a == b, b == c, or c == a.
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// ie. Property 1 of RobustSign.
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if a == b || b == c || c == a {
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return Indeterminate
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}
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// Next we try recomputing the determinant still using floating-point
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// arithmetic but in a more precise way. This is more expensive than the
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// simple calculation done by triageSign, but it is still *much* cheaper
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// than using arbitrary-precision arithmetic. This optimization is able to
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// compute the correct determinant sign in virtually all cases except when
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// the three points are truly collinear (e.g., three points on the equator).
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detSign := stableSign(a, b, c)
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if detSign != Indeterminate {
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return detSign
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}
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// Otherwise fall back to exact arithmetic and symbolic permutations.
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return exactSign(a, b, c, true)
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}
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// exactSign reports the direction sign of the points computed using high-precision
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// arithmetic and/or symbolic perturbations.
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func exactSign(a, b, c Point, perturb bool) Direction {
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// Sort the three points in lexicographic order, keeping track of the sign
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// of the permutation. (Each exchange inverts the sign of the determinant.)
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permSign := CounterClockwise
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pa := &a
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pb := &b
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pc := &c
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if pa.Cmp(pb.Vector) > 0 {
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pa, pb = pb, pa
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permSign = -permSign
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}
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if pb.Cmp(pc.Vector) > 0 {
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pb, pc = pc, pb
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permSign = -permSign
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}
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if pa.Cmp(pb.Vector) > 0 {
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pa, pb = pb, pa
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permSign = -permSign
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}
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// Construct multiple-precision versions of the sorted points and compute
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// their precise 3x3 determinant.
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xa := r3.PreciseVectorFromVector(pa.Vector)
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xb := r3.PreciseVectorFromVector(pb.Vector)
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xc := r3.PreciseVectorFromVector(pc.Vector)
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xbCrossXc := xb.Cross(xc)
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det := xa.Dot(xbCrossXc)
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// The precision of big.Float is high enough that the result should always
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// be exact enough (no rounding was performed).
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// If the exact determinant is non-zero, we're done.
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detSign := Direction(det.Sign())
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if detSign == Indeterminate && perturb {
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// Otherwise, we need to resort to symbolic perturbations to resolve the
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// sign of the determinant.
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detSign = symbolicallyPerturbedSign(xa, xb, xc, xbCrossXc)
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}
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return permSign * detSign
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}
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// symbolicallyPerturbedSign reports the sign of the determinant of three points
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// A, B, C under a model where every possible Point is slightly perturbed by
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// a unique infinitesmal amount such that no three perturbed points are
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// collinear and no four points are coplanar. The perturbations are so small
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// that they do not change the sign of any determinant that was non-zero
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// before the perturbations, and therefore can be safely ignored unless the
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// determinant of three points is exactly zero (using multiple-precision
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// arithmetic). This returns CounterClockwise or Clockwise according to the
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// sign of the determinant after the symbolic perturbations are taken into account.
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//
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// Since the symbolic perturbation of a given point is fixed (i.e., the
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// perturbation is the same for all calls to this method and does not depend
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// on the other two arguments), the results of this method are always
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// self-consistent. It will never return results that would correspond to an
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// impossible configuration of non-degenerate points.
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//
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// This requires that the 3x3 determinant of A, B, C must be exactly zero.
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// And the points must be distinct, with A < B < C in lexicographic order.
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//
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// Reference:
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// "Simulation of Simplicity" (Edelsbrunner and Muecke, ACM Transactions on
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// Graphics, 1990).
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//
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func symbolicallyPerturbedSign(a, b, c, bCrossC r3.PreciseVector) Direction {
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// This method requires that the points are sorted in lexicographically
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// increasing order. This is because every possible Point has its own
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// symbolic perturbation such that if A < B then the symbolic perturbation
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// for A is much larger than the perturbation for B.
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//
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// Alternatively, we could sort the points in this method and keep track of
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// the sign of the permutation, but it is more efficient to do this before
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// converting the inputs to the multi-precision representation, and this
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// also lets us re-use the result of the cross product B x C.
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//
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// Every input coordinate x[i] is assigned a symbolic perturbation dx[i].
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// We then compute the sign of the determinant of the perturbed points,
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// i.e.
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// | a.X+da.X a.Y+da.Y a.Z+da.Z |
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// | b.X+db.X b.Y+db.Y b.Z+db.Z |
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// | c.X+dc.X c.Y+dc.Y c.Z+dc.Z |
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//
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// The perturbations are chosen such that
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//
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// da.Z > da.Y > da.X > db.Z > db.Y > db.X > dc.Z > dc.Y > dc.X
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//
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// where each perturbation is so much smaller than the previous one that we
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// don't even need to consider it unless the coefficients of all previous
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// perturbations are zero. In fact, it is so small that we don't need to
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// consider it unless the coefficient of all products of the previous
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// perturbations are zero. For example, we don't need to consider the
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// coefficient of db.Y unless the coefficient of db.Z *da.X is zero.
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//
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// The follow code simply enumerates the coefficients of the perturbations
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// (and products of perturbations) that appear in the determinant above, in
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// order of decreasing perturbation magnitude. The first non-zero
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// coefficient determines the sign of the result. The easiest way to
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// enumerate the coefficients in the correct order is to pretend that each
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// perturbation is some tiny value "eps" raised to a power of two:
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//
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// eps** 1 2 4 8 16 32 64 128 256
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// da.Z da.Y da.X db.Z db.Y db.X dc.Z dc.Y dc.X
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//
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// Essentially we can then just count in binary and test the corresponding
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// subset of perturbations at each step. So for example, we must test the
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// coefficient of db.Z*da.X before db.Y because eps**12 > eps**16.
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//
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// Of course, not all products of these perturbations appear in the
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// determinant above, since the determinant only contains the products of
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// elements in distinct rows and columns. Thus we don't need to consider
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// da.Z*da.Y, db.Y *da.Y, etc. Furthermore, sometimes different pairs of
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// perturbations have the same coefficient in the determinant; for example,
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// da.Y*db.X and db.Y*da.X have the same coefficient (c.Z). Therefore
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// we only need to test this coefficient the first time we encounter it in
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// the binary order above (which will be db.Y*da.X).
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//
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// The sequence of tests below also appears in Table 4-ii of the paper
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// referenced above, if you just want to look it up, with the following
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// translations: [a,b,c] -> [i,j,k] and [0,1,2] -> [1,2,3]. Also note that
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// some of the signs are different because the opposite cross product is
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// used (e.g., B x C rather than C x B).
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detSign := bCrossC.Z.Sign() // da.Z
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = bCrossC.Y.Sign() // da.Y
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = bCrossC.X.Sign() // da.X
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = newBigFloat().Sub(newBigFloat().Mul(c.X, a.Y), newBigFloat().Mul(c.Y, a.X)).Sign() // db.Z
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = c.X.Sign() // db.Z * da.Y
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = -(c.Y.Sign()) // db.Z * da.X
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = newBigFloat().Sub(newBigFloat().Mul(c.Z, a.X), newBigFloat().Mul(c.X, a.Z)).Sign() // db.Y
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = c.Z.Sign() // db.Y * da.X
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if detSign != 0 {
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return Direction(detSign)
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}
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// The following test is listed in the paper, but it is redundant because
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// the previous tests guarantee that C == (0, 0, 0).
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// (c.Y*a.Z - c.Z*a.Y).Sign() // db.X
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detSign = newBigFloat().Sub(newBigFloat().Mul(a.X, b.Y), newBigFloat().Mul(a.Y, b.X)).Sign() // dc.Z
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = -(b.X.Sign()) // dc.Z * da.Y
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = b.Y.Sign() // dc.Z * da.X
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if detSign != 0 {
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return Direction(detSign)
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}
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detSign = a.X.Sign() // dc.Z * db.Y
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if detSign != 0 {
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return Direction(detSign)
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}
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return CounterClockwise // dc.Z * db.Y * da.X
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}
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// CompareDistances returns -1, 0, or +1 according to whether AX < BX, A == B,
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// or AX > BX respectively. Distances are measured with respect to the positions
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// of X, A, and B as though they were reprojected to lie exactly on the surface of
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// the unit sphere. Furthermore, this method uses symbolic perturbations to
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// ensure that the result is non-zero whenever A != B, even when AX == BX
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// exactly, or even when A and B project to the same point on the sphere.
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// Such results are guaranteed to be self-consistent, i.e. if AB < BC and
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// BC < AC, then AB < AC.
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func CompareDistances(x, a, b Point) int {
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// We start by comparing distances using dot products (i.e., cosine of the
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// angle), because (1) this is the cheapest technique, and (2) it is valid
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// over the entire range of possible angles. (We can only use the sin^2
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// technique if both angles are less than 90 degrees or both angles are
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// greater than 90 degrees.)
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sign := triageCompareCosDistances(x, a, b)
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if sign != 0 {
|
||
return sign
|
||
}
|
||
|
||
// Optimization for (a == b) to avoid falling back to exact arithmetic.
|
||
if a == b {
|
||
return 0
|
||
}
|
||
|
||
// It is much better numerically to compare distances using cos(angle) if
|
||
// the distances are near 90 degrees and sin^2(angle) if the distances are
|
||
// near 0 or 180 degrees. We only need to check one of the two angles when
|
||
// making this decision because the fact that the test above failed means
|
||
// that angles "a" and "b" are very close together.
|
||
cosAX := a.Dot(x.Vector)
|
||
if cosAX > 1/math.Sqrt2 {
|
||
// Angles < 45 degrees.
|
||
sign = triageCompareSin2Distances(x, a, b)
|
||
} else if cosAX < -1/math.Sqrt2 {
|
||
// Angles > 135 degrees. sin^2(angle) is decreasing in this range.
|
||
sign = -triageCompareSin2Distances(x, a, b)
|
||
}
|
||
// C++ adds an additional check here using 80-bit floats.
|
||
// This is skipped in Go because we only have 32 and 64 bit floats.
|
||
|
||
if sign != 0 {
|
||
return sign
|
||
}
|
||
|
||
sign = exactCompareDistances(r3.PreciseVectorFromVector(x.Vector), r3.PreciseVectorFromVector(a.Vector), r3.PreciseVectorFromVector(b.Vector))
|
||
if sign != 0 {
|
||
return sign
|
||
}
|
||
return symbolicCompareDistances(x, a, b)
|
||
}
|
||
|
||
// cosDistance returns cos(XY) where XY is the angle between X and Y, and the
|
||
// maximum error amount in the result. This requires X and Y be normalized.
|
||
func cosDistance(x, y Point) (cos, err float64) {
|
||
cos = x.Dot(y.Vector)
|
||
return cos, 9.5*dblError*math.Abs(cos) + 1.5*dblError
|
||
}
|
||
|
||
// sin2Distance returns sin**2(XY), where XY is the angle between X and Y,
|
||
// and the maximum error amount in the result. This requires X and Y be normalized.
|
||
func sin2Distance(x, y Point) (sin2, err float64) {
|
||
// The (x-y).Cross(x+y) trick eliminates almost all of error due to x
|
||
// and y being not quite unit length. This method is extremely accurate
|
||
// for small distances; the *relative* error in the result is O(dblError) for
|
||
// distances as small as dblError.
|
||
n := x.Sub(y.Vector).Cross(x.Add(y.Vector))
|
||
sin2 = 0.25 * n.Norm2()
|
||
err = ((21+4*math.Sqrt(3))*dblError*sin2 +
|
||
32*math.Sqrt(3)*dblError*dblError*math.Sqrt(sin2) +
|
||
768*dblError*dblError*dblError*dblError)
|
||
return sin2, err
|
||
}
|
||
|
||
// triageCompareCosDistances returns -1, 0, or +1 according to whether AX < BX,
|
||
// A == B, or AX > BX by comparing the distances between them using cosDistance.
|
||
func triageCompareCosDistances(x, a, b Point) int {
|
||
cosAX, cosAXerror := cosDistance(a, x)
|
||
cosBX, cosBXerror := cosDistance(b, x)
|
||
diff := cosAX - cosBX
|
||
err := cosAXerror + cosBXerror
|
||
if diff > err {
|
||
return -1
|
||
}
|
||
if diff < -err {
|
||
return 1
|
||
}
|
||
return 0
|
||
}
|
||
|
||
// triageCompareSin2Distances returns -1, 0, or +1 according to whether AX < BX,
|
||
// A == B, or AX > BX by comparing the distances between them using sin2Distance.
|
||
func triageCompareSin2Distances(x, a, b Point) int {
|
||
sin2AX, sin2AXerror := sin2Distance(a, x)
|
||
sin2BX, sin2BXerror := sin2Distance(b, x)
|
||
diff := sin2AX - sin2BX
|
||
err := sin2AXerror + sin2BXerror
|
||
if diff > err {
|
||
return 1
|
||
}
|
||
if diff < -err {
|
||
return -1
|
||
}
|
||
return 0
|
||
}
|
||
|
||
// exactCompareDistances returns -1, 0, or 1 after comparing using the values as
|
||
// PreciseVectors.
|
||
func exactCompareDistances(x, a, b r3.PreciseVector) int {
|
||
// This code produces the same result as though all points were reprojected
|
||
// to lie exactly on the surface of the unit sphere. It is based on testing
|
||
// whether x.Dot(a.Normalize()) < x.Dot(b.Normalize()), reformulated
|
||
// so that it can be evaluated using exact arithmetic.
|
||
cosAX := x.Dot(a)
|
||
cosBX := x.Dot(b)
|
||
|
||
// If the two values have different signs, we need to handle that case now
|
||
// before squaring them below.
|
||
aSign := cosAX.Sign()
|
||
bSign := cosBX.Sign()
|
||
if aSign != bSign {
|
||
// If cos(AX) > cos(BX), then AX < BX.
|
||
if aSign > bSign {
|
||
return -1
|
||
}
|
||
return 1
|
||
}
|
||
cosAX2 := newBigFloat().Mul(cosAX, cosAX)
|
||
cosBX2 := newBigFloat().Mul(cosBX, cosBX)
|
||
cmp := newBigFloat().Sub(cosBX2.Mul(cosBX2, a.Norm2()), cosAX2.Mul(cosAX2, b.Norm2()))
|
||
return aSign * cmp.Sign()
|
||
}
|
||
|
||
// symbolicCompareDistances returns -1, 0, or +1 given three points such that AX == BX
|
||
// (exactly) according to whether AX < BX, AX == BX, or AX > BX after symbolic
|
||
// perturbations are taken into account.
|
||
func symbolicCompareDistances(x, a, b Point) int {
|
||
// Our symbolic perturbation strategy is based on the following model.
|
||
// Similar to "simulation of simplicity", we assign a perturbation to every
|
||
// point such that if A < B, then the symbolic perturbation for A is much,
|
||
// much larger than the symbolic perturbation for B. We imagine that
|
||
// rather than projecting every point to lie exactly on the unit sphere,
|
||
// instead each point is positioned on its own tiny pedestal that raises it
|
||
// just off the surface of the unit sphere. This means that the distance AX
|
||
// is actually the true distance AX plus the (symbolic) heights of the
|
||
// pedestals for A and X. The pedestals are infinitesmally thin, so they do
|
||
// not affect distance measurements except at the two endpoints. If several
|
||
// points project to exactly the same point on the unit sphere, we imagine
|
||
// that they are placed on separate pedestals placed close together, where
|
||
// the distance between pedestals is much, much less than the height of any
|
||
// pedestal. (There are a finite number of Points, and therefore a finite
|
||
// number of pedestals, so this is possible.)
|
||
//
|
||
// If A < B, then A is on a higher pedestal than B, and therefore AX > BX.
|
||
switch a.Cmp(b.Vector) {
|
||
case -1:
|
||
return 1
|
||
case 1:
|
||
return -1
|
||
default:
|
||
return 0
|
||
}
|
||
}
|
||
|
||
var (
|
||
// ca45Degrees is a predefined ChordAngle representing (approximately) 45 degrees.
|
||
ca45Degrees = s1.ChordAngleFromSquaredLength(2 - math.Sqrt2)
|
||
)
|
||
|
||
// CompareDistance returns -1, 0, or +1 according to whether the distance XY is
|
||
// respectively less than, equal to, or greater than the provided chord angle. Distances are measured
|
||
// with respect to the positions of all points as though they are projected to lie
|
||
// exactly on the surface of the unit sphere.
|
||
func CompareDistance(x, y Point, r s1.ChordAngle) int {
|
||
// As with CompareDistances, we start by comparing dot products because
|
||
// the sin^2 method is only valid when the distance XY and the limit "r" are
|
||
// both less than 90 degrees.
|
||
sign := triageCompareCosDistance(x, y, float64(r))
|
||
if sign != 0 {
|
||
return sign
|
||
}
|
||
|
||
// Unlike with CompareDistances, it's not worth using the sin^2 method
|
||
// when the distance limit is near 180 degrees because the ChordAngle
|
||
// representation itself has has a rounding error of up to 2e-8 radians for
|
||
// distances near 180 degrees.
|
||
if r < ca45Degrees {
|
||
sign = triageCompareSin2Distance(x, y, float64(r))
|
||
if sign != 0 {
|
||
return sign
|
||
}
|
||
}
|
||
return exactCompareDistance(r3.PreciseVectorFromVector(x.Vector), r3.PreciseVectorFromVector(y.Vector), big.NewFloat(float64(r)).SetPrec(big.MaxPrec))
|
||
}
|
||
|
||
// triageCompareCosDistance returns -1, 0, or +1 according to whether the distance XY is
|
||
// less than, equal to, or greater than r2 respectively using cos distance.
|
||
func triageCompareCosDistance(x, y Point, r2 float64) int {
|
||
cosXY, cosXYError := cosDistance(x, y)
|
||
cosR := 1.0 - 0.5*r2
|
||
cosRError := 2.0 * dblError * cosR
|
||
diff := cosXY - cosR
|
||
err := cosXYError + cosRError
|
||
if diff > err {
|
||
return -1
|
||
}
|
||
if diff < -err {
|
||
return 1
|
||
}
|
||
return 0
|
||
}
|
||
|
||
// triageCompareSin2Distance returns -1, 0, or +1 according to whether the distance XY is
|
||
// less than, equal to, or greater than r2 respectively using sin^2 distance.
|
||
func triageCompareSin2Distance(x, y Point, r2 float64) int {
|
||
// Only valid for distance limits < 90 degrees.
|
||
sin2XY, sin2XYError := sin2Distance(x, y)
|
||
sin2R := r2 * (1.0 - 0.25*r2)
|
||
sin2RError := 3.0 * dblError * sin2R
|
||
diff := sin2XY - sin2R
|
||
err := sin2XYError + sin2RError
|
||
if diff > err {
|
||
return 1
|
||
}
|
||
if diff < -err {
|
||
return -1
|
||
}
|
||
return 0
|
||
}
|
||
|
||
var (
|
||
bigOne = big.NewFloat(1.0).SetPrec(big.MaxPrec)
|
||
bigHalf = big.NewFloat(0.5).SetPrec(big.MaxPrec)
|
||
)
|
||
|
||
// exactCompareDistance returns -1, 0, or +1 after comparing using PreciseVectors.
|
||
func exactCompareDistance(x, y r3.PreciseVector, r2 *big.Float) int {
|
||
// This code produces the same result as though all points were reprojected
|
||
// to lie exactly on the surface of the unit sphere. It is based on
|
||
// comparing the cosine of the angle XY (when both points are projected to
|
||
// lie exactly on the sphere) to the given threshold.
|
||
cosXY := x.Dot(y)
|
||
cosR := newBigFloat().Sub(bigOne, newBigFloat().Mul(bigHalf, r2))
|
||
|
||
// If the two values have different signs, we need to handle that case now
|
||
// before squaring them below.
|
||
xySign := cosXY.Sign()
|
||
rSign := cosR.Sign()
|
||
if xySign != rSign {
|
||
if xySign > rSign {
|
||
return -1
|
||
}
|
||
return 1 // If cos(XY) > cos(r), then XY < r.
|
||
}
|
||
cmp := newBigFloat().Sub(
|
||
newBigFloat().Mul(
|
||
newBigFloat().Mul(cosR, cosR), newBigFloat().Mul(x.Norm2(), y.Norm2())),
|
||
newBigFloat().Mul(cosXY, cosXY))
|
||
return xySign * cmp.Sign()
|
||
}
|
||
|
||
// TODO(roberts): Differences from C++
|
||
// CompareEdgeDistance
|
||
// CompareEdgeDirections
|
||
// EdgeCircumcenterSign
|
||
// GetVoronoiSiteExclusion
|
||
// GetClosestVertex
|
||
// TriageCompareLineSin2Distance
|
||
// TriageCompareLineCos2Distance
|
||
// TriageCompareLineDistance
|
||
// TriageCompareEdgeDistance
|
||
// ExactCompareLineDistance
|
||
// ExactCompareEdgeDistance
|
||
// TriageCompareEdgeDirections
|
||
// ExactCompareEdgeDirections
|
||
// ArePointsAntipodal
|
||
// ArePointsLinearlyDependent
|
||
// GetCircumcenter
|
||
// TriageEdgeCircumcenterSign
|
||
// ExactEdgeCircumcenterSign
|
||
// UnperturbedSign
|
||
// SymbolicEdgeCircumcenterSign
|
||
// ExactVoronoiSiteExclusion
|