/**
* @license
* Cesium - https://github.com/CesiumGS/cesium
* Version 1.99
*
* Copyright 2011-2022 Cesium Contributors
*
* Licensed under the Apache License, Version 2.0 (the "License");
* you may not use this file except in compliance with the License.
* You may obtain a copy of the License at
*
* http://www.apache.org/licenses/LICENSE-2.0
*
* Unless required by applicable law or agreed to in writing, software
* distributed under the License is distributed on an "AS IS" BASIS,
* WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
* See the License for the specific language governing permissions and
* limitations under the License.
*
* Columbus View (Pat. Pend.)
*
* Portions licensed separately.
* See https://github.com/CesiumGS/cesium/blob/main/LICENSE.md for full licensing details.
*/
define(['exports', './Matrix3-ea964448', './defaultValue-135942ca', './Check-40d84a28', './Transforms-ac2d28a9', './Math-efde0c7b'], (function (exports, Matrix3, defaultValue, Check, Transforms, Math$1) { 'use strict';
/**
* Defines functions for 2nd order polynomial functions of one variable with only real coefficients.
*
* @namespace QuadraticRealPolynomial
*/
const QuadraticRealPolynomial = {};
/**
* Provides the discriminant of the quadratic equation from the supplied coefficients.
*
* @param {Number} a The coefficient of the 2nd order monomial.
* @param {Number} b The coefficient of the 1st order monomial.
* @param {Number} c The coefficient of the 0th order monomial.
* @returns {Number} The value of the discriminant.
*/
QuadraticRealPolynomial.computeDiscriminant = function (a, b, c) {
//>>includeStart('debug', pragmas.debug);
if (typeof a !== "number") {
throw new Check.DeveloperError("a is a required number.");
}
if (typeof b !== "number") {
throw new Check.DeveloperError("b is a required number.");
}
if (typeof c !== "number") {
throw new Check.DeveloperError("c is a required number.");
}
//>>includeEnd('debug');
const discriminant = b * b - 4.0 * a * c;
return discriminant;
};
function addWithCancellationCheck$1(left, right, tolerance) {
const difference = left + right;
if (
Math$1.CesiumMath.sign(left) !== Math$1.CesiumMath.sign(right) &&
Math.abs(difference / Math.max(Math.abs(left), Math.abs(right))) < tolerance
) {
return 0.0;
}
return difference;
}
/**
* Provides the real valued roots of the quadratic polynomial with the provided coefficients.
*
* @param {Number} a The coefficient of the 2nd order monomial.
* @param {Number} b The coefficient of the 1st order monomial.
* @param {Number} c The coefficient of the 0th order monomial.
* @returns {Number[]} The real valued roots.
*/
QuadraticRealPolynomial.computeRealRoots = function (a, b, c) {
//>>includeStart('debug', pragmas.debug);
if (typeof a !== "number") {
throw new Check.DeveloperError("a is a required number.");
}
if (typeof b !== "number") {
throw new Check.DeveloperError("b is a required number.");
}
if (typeof c !== "number") {
throw new Check.DeveloperError("c is a required number.");
}
//>>includeEnd('debug');
let ratio;
if (a === 0.0) {
if (b === 0.0) {
// Constant function: c = 0.
return [];
}
// Linear function: b * x + c = 0.
return [-c / b];
} else if (b === 0.0) {
if (c === 0.0) {
// 2nd order monomial: a * x^2 = 0.
return [0.0, 0.0];
}
const cMagnitude = Math.abs(c);
const aMagnitude = Math.abs(a);
if (
cMagnitude < aMagnitude &&
cMagnitude / aMagnitude < Math$1.CesiumMath.EPSILON14
) {
// c ~= 0.0.
// 2nd order monomial: a * x^2 = 0.
return [0.0, 0.0];
} else if (
cMagnitude > aMagnitude &&
aMagnitude / cMagnitude < Math$1.CesiumMath.EPSILON14
) {
// a ~= 0.0.
// Constant function: c = 0.
return [];
}
// a * x^2 + c = 0
ratio = -c / a;
if (ratio < 0.0) {
// Both roots are complex.
return [];
}
// Both roots are real.
const root = Math.sqrt(ratio);
return [-root, root];
} else if (c === 0.0) {
// a * x^2 + b * x = 0
ratio = -b / a;
if (ratio < 0.0) {
return [ratio, 0.0];
}
return [0.0, ratio];
}
// a * x^2 + b * x + c = 0
const b2 = b * b;
const four_ac = 4.0 * a * c;
const radicand = addWithCancellationCheck$1(b2, -four_ac, Math$1.CesiumMath.EPSILON14);
if (radicand < 0.0) {
// Both roots are complex.
return [];
}
const q =
-0.5 *
addWithCancellationCheck$1(
b,
Math$1.CesiumMath.sign(b) * Math.sqrt(radicand),
Math$1.CesiumMath.EPSILON14
);
if (b > 0.0) {
return [q / a, c / q];
}
return [c / q, q / a];
};
var QuadraticRealPolynomial$1 = QuadraticRealPolynomial;
/**
* Defines functions for 3rd order polynomial functions of one variable with only real coefficients.
*
* @namespace CubicRealPolynomial
*/
const CubicRealPolynomial = {};
/**
* Provides the discriminant of the cubic equation from the supplied coefficients.
*
* @param {Number} a The coefficient of the 3rd order monomial.
* @param {Number} b The coefficient of the 2nd order monomial.
* @param {Number} c The coefficient of the 1st order monomial.
* @param {Number} d The coefficient of the 0th order monomial.
* @returns {Number} The value of the discriminant.
*/
CubicRealPolynomial.computeDiscriminant = function (a, b, c, d) {
//>>includeStart('debug', pragmas.debug);
if (typeof a !== "number") {
throw new Check.DeveloperError("a is a required number.");
}
if (typeof b !== "number") {
throw new Check.DeveloperError("b is a required number.");
}
if (typeof c !== "number") {
throw new Check.DeveloperError("c is a required number.");
}
if (typeof d !== "number") {
throw new Check.DeveloperError("d is a required number.");
}
//>>includeEnd('debug');
const a2 = a * a;
const b2 = b * b;
const c2 = c * c;
const d2 = d * d;
const discriminant =
18.0 * a * b * c * d +
b2 * c2 -
27.0 * a2 * d2 -
4.0 * (a * c2 * c + b2 * b * d);
return discriminant;
};
function computeRealRoots(a, b, c, d) {
const A = a;
const B = b / 3.0;
const C = c / 3.0;
const D = d;
const AC = A * C;
const BD = B * D;
const B2 = B * B;
const C2 = C * C;
const delta1 = A * C - B2;
const delta2 = A * D - B * C;
const delta3 = B * D - C2;
const discriminant = 4.0 * delta1 * delta3 - delta2 * delta2;
let temp;
let temp1;
if (discriminant < 0.0) {
let ABar;
let CBar;
let DBar;
if (B2 * BD >= AC * C2) {
ABar = A;
CBar = delta1;
DBar = -2.0 * B * delta1 + A * delta2;
} else {
ABar = D;
CBar = delta3;
DBar = -D * delta2 + 2.0 * C * delta3;
}
const s = DBar < 0.0 ? -1.0 : 1.0; // This is not Math.Sign()!
const temp0 = -s * Math.abs(ABar) * Math.sqrt(-discriminant);
temp1 = -DBar + temp0;
const x = temp1 / 2.0;
const p = x < 0.0 ? -Math.pow(-x, 1.0 / 3.0) : Math.pow(x, 1.0 / 3.0);
const q = temp1 === temp0 ? -p : -CBar / p;
temp = CBar <= 0.0 ? p + q : -DBar / (p * p + q * q + CBar);
if (B2 * BD >= AC * C2) {
return [(temp - B) / A];
}
return [-D / (temp + C)];
}
const CBarA = delta1;
const DBarA = -2.0 * B * delta1 + A * delta2;
const CBarD = delta3;
const DBarD = -D * delta2 + 2.0 * C * delta3;
const squareRootOfDiscriminant = Math.sqrt(discriminant);
const halfSquareRootOf3 = Math.sqrt(3.0) / 2.0;
let theta = Math.abs(Math.atan2(A * squareRootOfDiscriminant, -DBarA) / 3.0);
temp = 2.0 * Math.sqrt(-CBarA);
let cosine = Math.cos(theta);
temp1 = temp * cosine;
let temp3 = temp * (-cosine / 2.0 - halfSquareRootOf3 * Math.sin(theta));
const numeratorLarge = temp1 + temp3 > 2.0 * B ? temp1 - B : temp3 - B;
const denominatorLarge = A;
const root1 = numeratorLarge / denominatorLarge;
theta = Math.abs(Math.atan2(D * squareRootOfDiscriminant, -DBarD) / 3.0);
temp = 2.0 * Math.sqrt(-CBarD);
cosine = Math.cos(theta);
temp1 = temp * cosine;
temp3 = temp * (-cosine / 2.0 - halfSquareRootOf3 * Math.sin(theta));
const numeratorSmall = -D;
const denominatorSmall = temp1 + temp3 < 2.0 * C ? temp1 + C : temp3 + C;
const root3 = numeratorSmall / denominatorSmall;
const E = denominatorLarge * denominatorSmall;
const F =
-numeratorLarge * denominatorSmall - denominatorLarge * numeratorSmall;
const G = numeratorLarge * numeratorSmall;
const root2 = (C * F - B * G) / (-B * F + C * E);
if (root1 <= root2) {
if (root1 <= root3) {
if (root2 <= root3) {
return [root1, root2, root3];
}
return [root1, root3, root2];
}
return [root3, root1, root2];
}
if (root1 <= root3) {
return [root2, root1, root3];
}
if (root2 <= root3) {
return [root2, root3, root1];
}
return [root3, root2, root1];
}
/**
* Provides the real valued roots of the cubic polynomial with the provided coefficients.
*
* @param {Number} a The coefficient of the 3rd order monomial.
* @param {Number} b The coefficient of the 2nd order monomial.
* @param {Number} c The coefficient of the 1st order monomial.
* @param {Number} d The coefficient of the 0th order monomial.
* @returns {Number[]} The real valued roots.
*/
CubicRealPolynomial.computeRealRoots = function (a, b, c, d) {
//>>includeStart('debug', pragmas.debug);
if (typeof a !== "number") {
throw new Check.DeveloperError("a is a required number.");
}
if (typeof b !== "number") {
throw new Check.DeveloperError("b is a required number.");
}
if (typeof c !== "number") {
throw new Check.DeveloperError("c is a required number.");
}
if (typeof d !== "number") {
throw new Check.DeveloperError("d is a required number.");
}
//>>includeEnd('debug');
let roots;
let ratio;
if (a === 0.0) {
// Quadratic function: b * x^2 + c * x + d = 0.
return QuadraticRealPolynomial$1.computeRealRoots(b, c, d);
} else if (b === 0.0) {
if (c === 0.0) {
if (d === 0.0) {
// 3rd order monomial: a * x^3 = 0.
return [0.0, 0.0, 0.0];
}
// a * x^3 + d = 0
ratio = -d / a;
const root =
ratio < 0.0 ? -Math.pow(-ratio, 1.0 / 3.0) : Math.pow(ratio, 1.0 / 3.0);
return [root, root, root];
} else if (d === 0.0) {
// x * (a * x^2 + c) = 0.
roots = QuadraticRealPolynomial$1.computeRealRoots(a, 0, c);
// Return the roots in ascending order.
if (roots.Length === 0) {
return [0.0];
}
return [roots[0], 0.0, roots[1]];
}
// Deflated cubic polynomial: a * x^3 + c * x + d= 0.
return computeRealRoots(a, 0, c, d);
} else if (c === 0.0) {
if (d === 0.0) {
// x^2 * (a * x + b) = 0.
ratio = -b / a;
if (ratio < 0.0) {
return [ratio, 0.0, 0.0];
}
return [0.0, 0.0, ratio];
}
// a * x^3 + b * x^2 + d = 0.
return computeRealRoots(a, b, 0, d);
} else if (d === 0.0) {
// x * (a * x^2 + b * x + c) = 0
roots = QuadraticRealPolynomial$1.computeRealRoots(a, b, c);
// Return the roots in ascending order.
if (roots.length === 0) {
return [0.0];
} else if (roots[1] <= 0.0) {
return [roots[0], roots[1], 0.0];
} else if (roots[0] >= 0.0) {
return [0.0, roots[0], roots[1]];
}
return [roots[0], 0.0, roots[1]];
}
return computeRealRoots(a, b, c, d);
};
var CubicRealPolynomial$1 = CubicRealPolynomial;
/**
* Defines functions for 4th order polynomial functions of one variable with only real coefficients.
*
* @namespace QuarticRealPolynomial
*/
const QuarticRealPolynomial = {};
/**
* Provides the discriminant of the quartic equation from the supplied coefficients.
*
* @param {Number} a The coefficient of the 4th order monomial.
* @param {Number} b The coefficient of the 3rd order monomial.
* @param {Number} c The coefficient of the 2nd order monomial.
* @param {Number} d The coefficient of the 1st order monomial.
* @param {Number} e The coefficient of the 0th order monomial.
* @returns {Number} The value of the discriminant.
*/
QuarticRealPolynomial.computeDiscriminant = function (a, b, c, d, e) {
//>>includeStart('debug', pragmas.debug);
if (typeof a !== "number") {
throw new Check.DeveloperError("a is a required number.");
}
if (typeof b !== "number") {
throw new Check.DeveloperError("b is a required number.");
}
if (typeof c !== "number") {
throw new Check.DeveloperError("c is a required number.");
}
if (typeof d !== "number") {
throw new Check.DeveloperError("d is a required number.");
}
if (typeof e !== "number") {
throw new Check.DeveloperError("e is a required number.");
}
//>>includeEnd('debug');
const a2 = a * a;
const a3 = a2 * a;
const b2 = b * b;
const b3 = b2 * b;
const c2 = c * c;
const c3 = c2 * c;
const d2 = d * d;
const d3 = d2 * d;
const e2 = e * e;
const e3 = e2 * e;
const discriminant =
b2 * c2 * d2 -
4.0 * b3 * d3 -
4.0 * a * c3 * d2 +
18 * a * b * c * d3 -
27.0 * a2 * d2 * d2 +
256.0 * a3 * e3 +
e *
(18.0 * b3 * c * d -
4.0 * b2 * c3 +
16.0 * a * c2 * c2 -
80.0 * a * b * c2 * d -
6.0 * a * b2 * d2 +
144.0 * a2 * c * d2) +
e2 *
(144.0 * a * b2 * c -
27.0 * b2 * b2 -
128.0 * a2 * c2 -
192.0 * a2 * b * d);
return discriminant;
};
function original(a3, a2, a1, a0) {
const a3Squared = a3 * a3;
const p = a2 - (3.0 * a3Squared) / 8.0;
const q = a1 - (a2 * a3) / 2.0 + (a3Squared * a3) / 8.0;
const r =
a0 -
(a1 * a3) / 4.0 +
(a2 * a3Squared) / 16.0 -
(3.0 * a3Squared * a3Squared) / 256.0;
// Find the roots of the cubic equations: h^6 + 2 p h^4 + (p^2 - 4 r) h^2 - q^2 = 0.
const cubicRoots = CubicRealPolynomial$1.computeRealRoots(
1.0,
2.0 * p,
p * p - 4.0 * r,
-q * q
);
if (cubicRoots.length > 0) {
const temp = -a3 / 4.0;
// Use the largest positive root.
const hSquared = cubicRoots[cubicRoots.length - 1];
if (Math.abs(hSquared) < Math$1.CesiumMath.EPSILON14) {
// y^4 + p y^2 + r = 0.
const roots = QuadraticRealPolynomial$1.computeRealRoots(1.0, p, r);
if (roots.length === 2) {
const root0 = roots[0];
const root1 = roots[1];
let y;
if (root0 >= 0.0 && root1 >= 0.0) {
const y0 = Math.sqrt(root0);
const y1 = Math.sqrt(root1);
return [temp - y1, temp - y0, temp + y0, temp + y1];
} else if (root0 >= 0.0 && root1 < 0.0) {
y = Math.sqrt(root0);
return [temp - y, temp + y];
} else if (root0 < 0.0 && root1 >= 0.0) {
y = Math.sqrt(root1);
return [temp - y, temp + y];
}
}
return [];
} else if (hSquared > 0.0) {
const h = Math.sqrt(hSquared);
const m = (p + hSquared - q / h) / 2.0;
const n = (p + hSquared + q / h) / 2.0;
// Now solve the two quadratic factors: (y^2 + h y + m)(y^2 - h y + n);
const roots1 = QuadraticRealPolynomial$1.computeRealRoots(1.0, h, m);
const roots2 = QuadraticRealPolynomial$1.computeRealRoots(1.0, -h, n);
if (roots1.length !== 0) {
roots1[0] += temp;
roots1[1] += temp;
if (roots2.length !== 0) {
roots2[0] += temp;
roots2[1] += temp;
if (roots1[1] <= roots2[0]) {
return [roots1[0], roots1[1], roots2[0], roots2[1]];
} else if (roots2[1] <= roots1[0]) {
return [roots2[0], roots2[1], roots1[0], roots1[1]];
} else if (roots1[0] >= roots2[0] && roots1[1] <= roots2[1]) {
return [roots2[0], roots1[0], roots1[1], roots2[1]];
} else if (roots2[0] >= roots1[0] && roots2[1] <= roots1[1]) {
return [roots1[0], roots2[0], roots2[1], roots1[1]];
} else if (roots1[0] > roots2[0] && roots1[0] < roots2[1]) {
return [roots2[0], roots1[0], roots2[1], roots1[1]];
}
return [roots1[0], roots2[0], roots1[1], roots2[1]];
}
return roots1;
}
if (roots2.length !== 0) {
roots2[0] += temp;
roots2[1] += temp;
return roots2;
}
return [];
}
}
return [];
}
function neumark(a3, a2, a1, a0) {
const a1Squared = a1 * a1;
const a2Squared = a2 * a2;
const a3Squared = a3 * a3;
const p = -2.0 * a2;
const q = a1 * a3 + a2Squared - 4.0 * a0;
const r = a3Squared * a0 - a1 * a2 * a3 + a1Squared;
const cubicRoots = CubicRealPolynomial$1.computeRealRoots(1.0, p, q, r);
if (cubicRoots.length > 0) {
// Use the most positive root
const y = cubicRoots[0];
const temp = a2 - y;
const tempSquared = temp * temp;
const g1 = a3 / 2.0;
const h1 = temp / 2.0;
const m = tempSquared - 4.0 * a0;
const mError = tempSquared + 4.0 * Math.abs(a0);
const n = a3Squared - 4.0 * y;
const nError = a3Squared + 4.0 * Math.abs(y);
let g2;
let h2;
if (y < 0.0 || m * nError < n * mError) {
const squareRootOfN = Math.sqrt(n);
g2 = squareRootOfN / 2.0;
h2 = squareRootOfN === 0.0 ? 0.0 : (a3 * h1 - a1) / squareRootOfN;
} else {
const squareRootOfM = Math.sqrt(m);
g2 = squareRootOfM === 0.0 ? 0.0 : (a3 * h1 - a1) / squareRootOfM;
h2 = squareRootOfM / 2.0;
}
let G;
let g;
if (g1 === 0.0 && g2 === 0.0) {
G = 0.0;
g = 0.0;
} else if (Math$1.CesiumMath.sign(g1) === Math$1.CesiumMath.sign(g2)) {
G = g1 + g2;
g = y / G;
} else {
g = g1 - g2;
G = y / g;
}
let H;
let h;
if (h1 === 0.0 && h2 === 0.0) {
H = 0.0;
h = 0.0;
} else if (Math$1.CesiumMath.sign(h1) === Math$1.CesiumMath.sign(h2)) {
H = h1 + h2;
h = a0 / H;
} else {
h = h1 - h2;
H = a0 / h;
}
// Now solve the two quadratic factors: (y^2 + G y + H)(y^2 + g y + h);
const roots1 = QuadraticRealPolynomial$1.computeRealRoots(1.0, G, H);
const roots2 = QuadraticRealPolynomial$1.computeRealRoots(1.0, g, h);
if (roots1.length !== 0) {
if (roots2.length !== 0) {
if (roots1[1] <= roots2[0]) {
return [roots1[0], roots1[1], roots2[0], roots2[1]];
} else if (roots2[1] <= roots1[0]) {
return [roots2[0], roots2[1], roots1[0], roots1[1]];
} else if (roots1[0] >= roots2[0] && roots1[1] <= roots2[1]) {
return [roots2[0], roots1[0], roots1[1], roots2[1]];
} else if (roots2[0] >= roots1[0] && roots2[1] <= roots1[1]) {
return [roots1[0], roots2[0], roots2[1], roots1[1]];
} else if (roots1[0] > roots2[0] && roots1[0] < roots2[1]) {
return [roots2[0], roots1[0], roots2[1], roots1[1]];
}
return [roots1[0], roots2[0], roots1[1], roots2[1]];
}
return roots1;
}
if (roots2.length !== 0) {
return roots2;
}
}
return [];
}
/**
* Provides the real valued roots of the quartic polynomial with the provided coefficients.
*
* @param {Number} a The coefficient of the 4th order monomial.
* @param {Number} b The coefficient of the 3rd order monomial.
* @param {Number} c The coefficient of the 2nd order monomial.
* @param {Number} d The coefficient of the 1st order monomial.
* @param {Number} e The coefficient of the 0th order monomial.
* @returns {Number[]} The real valued roots.
*/
QuarticRealPolynomial.computeRealRoots = function (a, b, c, d, e) {
//>>includeStart('debug', pragmas.debug);
if (typeof a !== "number") {
throw new Check.DeveloperError("a is a required number.");
}
if (typeof b !== "number") {
throw new Check.DeveloperError("b is a required number.");
}
if (typeof c !== "number") {
throw new Check.DeveloperError("c is a required number.");
}
if (typeof d !== "number") {
throw new Check.DeveloperError("d is a required number.");
}
if (typeof e !== "number") {
throw new Check.DeveloperError("e is a required number.");
}
//>>includeEnd('debug');
if (Math.abs(a) < Math$1.CesiumMath.EPSILON15) {
return CubicRealPolynomial$1.computeRealRoots(b, c, d, e);
}
const a3 = b / a;
const a2 = c / a;
const a1 = d / a;
const a0 = e / a;
let k = a3 < 0.0 ? 1 : 0;
k += a2 < 0.0 ? k + 1 : k;
k += a1 < 0.0 ? k + 1 : k;
k += a0 < 0.0 ? k + 1 : k;
switch (k) {
case 0:
return original(a3, a2, a1, a0);
case 1:
return neumark(a3, a2, a1, a0);
case 2:
return neumark(a3, a2, a1, a0);
case 3:
return original(a3, a2, a1, a0);
case 4:
return original(a3, a2, a1, a0);
case 5:
return neumark(a3, a2, a1, a0);
case 6:
return original(a3, a2, a1, a0);
case 7:
return original(a3, a2, a1, a0);
case 8:
return neumark(a3, a2, a1, a0);
case 9:
return original(a3, a2, a1, a0);
case 10:
return original(a3, a2, a1, a0);
case 11:
return neumark(a3, a2, a1, a0);
case 12:
return original(a3, a2, a1, a0);
case 13:
return original(a3, a2, a1, a0);
case 14:
return original(a3, a2, a1, a0);
case 15:
return original(a3, a2, a1, a0);
default:
return undefined;
}
};
var QuarticRealPolynomial$1 = QuarticRealPolynomial;
/**
* Represents a ray that extends infinitely from the provided origin in the provided direction.
* @alias Ray
* @constructor
*
* @param {Cartesian3} [origin=Cartesian3.ZERO] The origin of the ray.
* @param {Cartesian3} [direction=Cartesian3.ZERO] The direction of the ray.
*/
function Ray(origin, direction) {
direction = Matrix3.Cartesian3.clone(defaultValue.defaultValue(direction, Matrix3.Cartesian3.ZERO));
if (!Matrix3.Cartesian3.equals(direction, Matrix3.Cartesian3.ZERO)) {
Matrix3.Cartesian3.normalize(direction, direction);
}
/**
* The origin of the ray.
* @type {Cartesian3}
* @default {@link Cartesian3.ZERO}
*/
this.origin = Matrix3.Cartesian3.clone(defaultValue.defaultValue(origin, Matrix3.Cartesian3.ZERO));
/**
* The direction of the ray.
* @type {Cartesian3}
*/
this.direction = direction;
}
/**
* Duplicates a Ray instance.
*
* @param {Ray} ray The ray to duplicate.
* @param {Ray} [result] The object onto which to store the result.
* @returns {Ray} The modified result parameter or a new Ray instance if one was not provided. (Returns undefined if ray is undefined)
*/
Ray.clone = function (ray, result) {
if (!defaultValue.defined(ray)) {
return undefined;
}
if (!defaultValue.defined(result)) {
return new Ray(ray.origin, ray.direction);
}
result.origin = Matrix3.Cartesian3.clone(ray.origin);
result.direction = Matrix3.Cartesian3.clone(ray.direction);
return result;
};
/**
* Computes the point along the ray given by r(t) = o + t*d,
* where o is the origin of the ray and d is the direction.
*
* @param {Ray} ray The ray.
* @param {Number} t A scalar value.
* @param {Cartesian3} [result] The object in which the result will be stored.
* @returns {Cartesian3} The modified result parameter, or a new instance if none was provided.
*
* @example
* //Get the first intersection point of a ray and an ellipsoid.
* const intersection = Cesium.IntersectionTests.rayEllipsoid(ray, ellipsoid);
* const point = Cesium.Ray.getPoint(ray, intersection.start);
*/
Ray.getPoint = function (ray, t, result) {
//>>includeStart('debug', pragmas.debug);
Check.Check.typeOf.object("ray", ray);
Check.Check.typeOf.number("t", t);
//>>includeEnd('debug');
if (!defaultValue.defined(result)) {
result = new Matrix3.Cartesian3();
}
result = Matrix3.Cartesian3.multiplyByScalar(ray.direction, t, result);
return Matrix3.Cartesian3.add(ray.origin, result, result);
};
/**
* Functions for computing the intersection between geometries such as rays, planes, triangles, and ellipsoids.
*
* @namespace IntersectionTests
*/
const IntersectionTests = {};
/**
* Computes the intersection of a ray and a plane.
*
* @param {Ray} ray The ray.
* @param {Plane} plane The plane.
* @param {Cartesian3} [result] The object onto which to store the result.
* @returns {Cartesian3} The intersection point or undefined if there is no intersections.
*/
IntersectionTests.rayPlane = function (ray, plane, result) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(ray)) {
throw new Check.DeveloperError("ray is required.");
}
if (!defaultValue.defined(plane)) {
throw new Check.DeveloperError("plane is required.");
}
//>>includeEnd('debug');
if (!defaultValue.defined(result)) {
result = new Matrix3.Cartesian3();
}
const origin = ray.origin;
const direction = ray.direction;
const normal = plane.normal;
const denominator = Matrix3.Cartesian3.dot(normal, direction);
if (Math.abs(denominator) < Math$1.CesiumMath.EPSILON15) {
// Ray is parallel to plane. The ray may be in the polygon's plane.
return undefined;
}
const t = (-plane.distance - Matrix3.Cartesian3.dot(normal, origin)) / denominator;
if (t < 0) {
return undefined;
}
result = Matrix3.Cartesian3.multiplyByScalar(direction, t, result);
return Matrix3.Cartesian3.add(origin, result, result);
};
const scratchEdge0 = new Matrix3.Cartesian3();
const scratchEdge1 = new Matrix3.Cartesian3();
const scratchPVec = new Matrix3.Cartesian3();
const scratchTVec = new Matrix3.Cartesian3();
const scratchQVec = new Matrix3.Cartesian3();
/**
* Computes the intersection of a ray and a triangle as a parametric distance along the input ray. The result is negative when the triangle is behind the ray.
*
* Implements {@link https://cadxfem.org/inf/Fast%20MinimumStorage%20RayTriangle%20Intersection.pdf|
* Fast Minimum Storage Ray/Triangle Intersection} by Tomas Moller and Ben Trumbore.
*
* @memberof IntersectionTests
*
* @param {Ray} ray The ray.
* @param {Cartesian3} p0 The first vertex of the triangle.
* @param {Cartesian3} p1 The second vertex of the triangle.
* @param {Cartesian3} p2 The third vertex of the triangle.
* @param {Boolean} [cullBackFaces=false] If true
, will only compute an intersection with the front face of the triangle
* and return undefined for intersections with the back face.
* @returns {Number} The intersection as a parametric distance along the ray, or undefined if there is no intersection.
*/
IntersectionTests.rayTriangleParametric = function (
ray,
p0,
p1,
p2,
cullBackFaces
) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(ray)) {
throw new Check.DeveloperError("ray is required.");
}
if (!defaultValue.defined(p0)) {
throw new Check.DeveloperError("p0 is required.");
}
if (!defaultValue.defined(p1)) {
throw new Check.DeveloperError("p1 is required.");
}
if (!defaultValue.defined(p2)) {
throw new Check.DeveloperError("p2 is required.");
}
//>>includeEnd('debug');
cullBackFaces = defaultValue.defaultValue(cullBackFaces, false);
const origin = ray.origin;
const direction = ray.direction;
const edge0 = Matrix3.Cartesian3.subtract(p1, p0, scratchEdge0);
const edge1 = Matrix3.Cartesian3.subtract(p2, p0, scratchEdge1);
const p = Matrix3.Cartesian3.cross(direction, edge1, scratchPVec);
const det = Matrix3.Cartesian3.dot(edge0, p);
let tvec;
let q;
let u;
let v;
let t;
if (cullBackFaces) {
if (det < Math$1.CesiumMath.EPSILON6) {
return undefined;
}
tvec = Matrix3.Cartesian3.subtract(origin, p0, scratchTVec);
u = Matrix3.Cartesian3.dot(tvec, p);
if (u < 0.0 || u > det) {
return undefined;
}
q = Matrix3.Cartesian3.cross(tvec, edge0, scratchQVec);
v = Matrix3.Cartesian3.dot(direction, q);
if (v < 0.0 || u + v > det) {
return undefined;
}
t = Matrix3.Cartesian3.dot(edge1, q) / det;
} else {
if (Math.abs(det) < Math$1.CesiumMath.EPSILON6) {
return undefined;
}
const invDet = 1.0 / det;
tvec = Matrix3.Cartesian3.subtract(origin, p0, scratchTVec);
u = Matrix3.Cartesian3.dot(tvec, p) * invDet;
if (u < 0.0 || u > 1.0) {
return undefined;
}
q = Matrix3.Cartesian3.cross(tvec, edge0, scratchQVec);
v = Matrix3.Cartesian3.dot(direction, q) * invDet;
if (v < 0.0 || u + v > 1.0) {
return undefined;
}
t = Matrix3.Cartesian3.dot(edge1, q) * invDet;
}
return t;
};
/**
* Computes the intersection of a ray and a triangle as a Cartesian3 coordinate.
*
* Implements {@link https://cadxfem.org/inf/Fast%20MinimumStorage%20RayTriangle%20Intersection.pdf|
* Fast Minimum Storage Ray/Triangle Intersection} by Tomas Moller and Ben Trumbore.
*
* @memberof IntersectionTests
*
* @param {Ray} ray The ray.
* @param {Cartesian3} p0 The first vertex of the triangle.
* @param {Cartesian3} p1 The second vertex of the triangle.
* @param {Cartesian3} p2 The third vertex of the triangle.
* @param {Boolean} [cullBackFaces=false] If true
, will only compute an intersection with the front face of the triangle
* and return undefined for intersections with the back face.
* @param {Cartesian3} [result] The Cartesian3
onto which to store the result.
* @returns {Cartesian3} The intersection point or undefined if there is no intersections.
*/
IntersectionTests.rayTriangle = function (
ray,
p0,
p1,
p2,
cullBackFaces,
result
) {
const t = IntersectionTests.rayTriangleParametric(
ray,
p0,
p1,
p2,
cullBackFaces
);
if (!defaultValue.defined(t) || t < 0.0) {
return undefined;
}
if (!defaultValue.defined(result)) {
result = new Matrix3.Cartesian3();
}
Matrix3.Cartesian3.multiplyByScalar(ray.direction, t, result);
return Matrix3.Cartesian3.add(ray.origin, result, result);
};
const scratchLineSegmentTriangleRay = new Ray();
/**
* Computes the intersection of a line segment and a triangle.
* @memberof IntersectionTests
*
* @param {Cartesian3} v0 The an end point of the line segment.
* @param {Cartesian3} v1 The other end point of the line segment.
* @param {Cartesian3} p0 The first vertex of the triangle.
* @param {Cartesian3} p1 The second vertex of the triangle.
* @param {Cartesian3} p2 The third vertex of the triangle.
* @param {Boolean} [cullBackFaces=false] If true
, will only compute an intersection with the front face of the triangle
* and return undefined for intersections with the back face.
* @param {Cartesian3} [result] The Cartesian3
onto which to store the result.
* @returns {Cartesian3} The intersection point or undefined if there is no intersections.
*/
IntersectionTests.lineSegmentTriangle = function (
v0,
v1,
p0,
p1,
p2,
cullBackFaces,
result
) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(v0)) {
throw new Check.DeveloperError("v0 is required.");
}
if (!defaultValue.defined(v1)) {
throw new Check.DeveloperError("v1 is required.");
}
if (!defaultValue.defined(p0)) {
throw new Check.DeveloperError("p0 is required.");
}
if (!defaultValue.defined(p1)) {
throw new Check.DeveloperError("p1 is required.");
}
if (!defaultValue.defined(p2)) {
throw new Check.DeveloperError("p2 is required.");
}
//>>includeEnd('debug');
const ray = scratchLineSegmentTriangleRay;
Matrix3.Cartesian3.clone(v0, ray.origin);
Matrix3.Cartesian3.subtract(v1, v0, ray.direction);
Matrix3.Cartesian3.normalize(ray.direction, ray.direction);
const t = IntersectionTests.rayTriangleParametric(
ray,
p0,
p1,
p2,
cullBackFaces
);
if (!defaultValue.defined(t) || t < 0.0 || t > Matrix3.Cartesian3.distance(v0, v1)) {
return undefined;
}
if (!defaultValue.defined(result)) {
result = new Matrix3.Cartesian3();
}
Matrix3.Cartesian3.multiplyByScalar(ray.direction, t, result);
return Matrix3.Cartesian3.add(ray.origin, result, result);
};
function solveQuadratic(a, b, c, result) {
const det = b * b - 4.0 * a * c;
if (det < 0.0) {
return undefined;
} else if (det > 0.0) {
const denom = 1.0 / (2.0 * a);
const disc = Math.sqrt(det);
const root0 = (-b + disc) * denom;
const root1 = (-b - disc) * denom;
if (root0 < root1) {
result.root0 = root0;
result.root1 = root1;
} else {
result.root0 = root1;
result.root1 = root0;
}
return result;
}
const root = -b / (2.0 * a);
if (root === 0.0) {
return undefined;
}
result.root0 = result.root1 = root;
return result;
}
const raySphereRoots = {
root0: 0.0,
root1: 0.0,
};
function raySphere(ray, sphere, result) {
if (!defaultValue.defined(result)) {
result = new Transforms.Interval();
}
const origin = ray.origin;
const direction = ray.direction;
const center = sphere.center;
const radiusSquared = sphere.radius * sphere.radius;
const diff = Matrix3.Cartesian3.subtract(origin, center, scratchPVec);
const a = Matrix3.Cartesian3.dot(direction, direction);
const b = 2.0 * Matrix3.Cartesian3.dot(direction, diff);
const c = Matrix3.Cartesian3.magnitudeSquared(diff) - radiusSquared;
const roots = solveQuadratic(a, b, c, raySphereRoots);
if (!defaultValue.defined(roots)) {
return undefined;
}
result.start = roots.root0;
result.stop = roots.root1;
return result;
}
/**
* Computes the intersection points of a ray with a sphere.
* @memberof IntersectionTests
*
* @param {Ray} ray The ray.
* @param {BoundingSphere} sphere The sphere.
* @param {Interval} [result] The result onto which to store the result.
* @returns {Interval} The interval containing scalar points along the ray or undefined if there are no intersections.
*/
IntersectionTests.raySphere = function (ray, sphere, result) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(ray)) {
throw new Check.DeveloperError("ray is required.");
}
if (!defaultValue.defined(sphere)) {
throw new Check.DeveloperError("sphere is required.");
}
//>>includeEnd('debug');
result = raySphere(ray, sphere, result);
if (!defaultValue.defined(result) || result.stop < 0.0) {
return undefined;
}
result.start = Math.max(result.start, 0.0);
return result;
};
const scratchLineSegmentRay = new Ray();
/**
* Computes the intersection points of a line segment with a sphere.
* @memberof IntersectionTests
*
* @param {Cartesian3} p0 An end point of the line segment.
* @param {Cartesian3} p1 The other end point of the line segment.
* @param {BoundingSphere} sphere The sphere.
* @param {Interval} [result] The result onto which to store the result.
* @returns {Interval} The interval containing scalar points along the ray or undefined if there are no intersections.
*/
IntersectionTests.lineSegmentSphere = function (p0, p1, sphere, result) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(p0)) {
throw new Check.DeveloperError("p0 is required.");
}
if (!defaultValue.defined(p1)) {
throw new Check.DeveloperError("p1 is required.");
}
if (!defaultValue.defined(sphere)) {
throw new Check.DeveloperError("sphere is required.");
}
//>>includeEnd('debug');
const ray = scratchLineSegmentRay;
Matrix3.Cartesian3.clone(p0, ray.origin);
const direction = Matrix3.Cartesian3.subtract(p1, p0, ray.direction);
const maxT = Matrix3.Cartesian3.magnitude(direction);
Matrix3.Cartesian3.normalize(direction, direction);
result = raySphere(ray, sphere, result);
if (!defaultValue.defined(result) || result.stop < 0.0 || result.start > maxT) {
return undefined;
}
result.start = Math.max(result.start, 0.0);
result.stop = Math.min(result.stop, maxT);
return result;
};
const scratchQ = new Matrix3.Cartesian3();
const scratchW = new Matrix3.Cartesian3();
/**
* Computes the intersection points of a ray with an ellipsoid.
*
* @param {Ray} ray The ray.
* @param {Ellipsoid} ellipsoid The ellipsoid.
* @returns {Interval} The interval containing scalar points along the ray or undefined if there are no intersections.
*/
IntersectionTests.rayEllipsoid = function (ray, ellipsoid) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(ray)) {
throw new Check.DeveloperError("ray is required.");
}
if (!defaultValue.defined(ellipsoid)) {
throw new Check.DeveloperError("ellipsoid is required.");
}
//>>includeEnd('debug');
const inverseRadii = ellipsoid.oneOverRadii;
const q = Matrix3.Cartesian3.multiplyComponents(inverseRadii, ray.origin, scratchQ);
const w = Matrix3.Cartesian3.multiplyComponents(
inverseRadii,
ray.direction,
scratchW
);
const q2 = Matrix3.Cartesian3.magnitudeSquared(q);
const qw = Matrix3.Cartesian3.dot(q, w);
let difference, w2, product, discriminant, temp;
if (q2 > 1.0) {
// Outside ellipsoid.
if (qw >= 0.0) {
// Looking outward or tangent (0 intersections).
return undefined;
}
// qw < 0.0.
const qw2 = qw * qw;
difference = q2 - 1.0; // Positively valued.
w2 = Matrix3.Cartesian3.magnitudeSquared(w);
product = w2 * difference;
if (qw2 < product) {
// Imaginary roots (0 intersections).
return undefined;
} else if (qw2 > product) {
// Distinct roots (2 intersections).
discriminant = qw * qw - product;
temp = -qw + Math.sqrt(discriminant); // Avoid cancellation.
const root0 = temp / w2;
const root1 = difference / temp;
if (root0 < root1) {
return new Transforms.Interval(root0, root1);
}
return {
start: root1,
stop: root0,
};
}
// qw2 == product. Repeated roots (2 intersections).
const root = Math.sqrt(difference / w2);
return new Transforms.Interval(root, root);
} else if (q2 < 1.0) {
// Inside ellipsoid (2 intersections).
difference = q2 - 1.0; // Negatively valued.
w2 = Matrix3.Cartesian3.magnitudeSquared(w);
product = w2 * difference; // Negatively valued.
discriminant = qw * qw - product;
temp = -qw + Math.sqrt(discriminant); // Positively valued.
return new Transforms.Interval(0.0, temp / w2);
}
// q2 == 1.0. On ellipsoid.
if (qw < 0.0) {
// Looking inward.
w2 = Matrix3.Cartesian3.magnitudeSquared(w);
return new Transforms.Interval(0.0, -qw / w2);
}
// qw >= 0.0. Looking outward or tangent.
return undefined;
};
function addWithCancellationCheck(left, right, tolerance) {
const difference = left + right;
if (
Math$1.CesiumMath.sign(left) !== Math$1.CesiumMath.sign(right) &&
Math.abs(difference / Math.max(Math.abs(left), Math.abs(right))) < tolerance
) {
return 0.0;
}
return difference;
}
function quadraticVectorExpression(A, b, c, x, w) {
const xSquared = x * x;
const wSquared = w * w;
const l2 = (A[Matrix3.Matrix3.COLUMN1ROW1] - A[Matrix3.Matrix3.COLUMN2ROW2]) * wSquared;
const l1 =
w *
(x *
addWithCancellationCheck(
A[Matrix3.Matrix3.COLUMN1ROW0],
A[Matrix3.Matrix3.COLUMN0ROW1],
Math$1.CesiumMath.EPSILON15
) +
b.y);
const l0 =
A[Matrix3.Matrix3.COLUMN0ROW0] * xSquared +
A[Matrix3.Matrix3.COLUMN2ROW2] * wSquared +
x * b.x +
c;
const r1 =
wSquared *
addWithCancellationCheck(
A[Matrix3.Matrix3.COLUMN2ROW1],
A[Matrix3.Matrix3.COLUMN1ROW2],
Math$1.CesiumMath.EPSILON15
);
const r0 =
w *
(x *
addWithCancellationCheck(A[Matrix3.Matrix3.COLUMN2ROW0], A[Matrix3.Matrix3.COLUMN0ROW2]) +
b.z);
let cosines;
const solutions = [];
if (r0 === 0.0 && r1 === 0.0) {
cosines = QuadraticRealPolynomial$1.computeRealRoots(l2, l1, l0);
if (cosines.length === 0) {
return solutions;
}
const cosine0 = cosines[0];
const sine0 = Math.sqrt(Math.max(1.0 - cosine0 * cosine0, 0.0));
solutions.push(new Matrix3.Cartesian3(x, w * cosine0, w * -sine0));
solutions.push(new Matrix3.Cartesian3(x, w * cosine0, w * sine0));
if (cosines.length === 2) {
const cosine1 = cosines[1];
const sine1 = Math.sqrt(Math.max(1.0 - cosine1 * cosine1, 0.0));
solutions.push(new Matrix3.Cartesian3(x, w * cosine1, w * -sine1));
solutions.push(new Matrix3.Cartesian3(x, w * cosine1, w * sine1));
}
return solutions;
}
const r0Squared = r0 * r0;
const r1Squared = r1 * r1;
const l2Squared = l2 * l2;
const r0r1 = r0 * r1;
const c4 = l2Squared + r1Squared;
const c3 = 2.0 * (l1 * l2 + r0r1);
const c2 = 2.0 * l0 * l2 + l1 * l1 - r1Squared + r0Squared;
const c1 = 2.0 * (l0 * l1 - r0r1);
const c0 = l0 * l0 - r0Squared;
if (c4 === 0.0 && c3 === 0.0 && c2 === 0.0 && c1 === 0.0) {
return solutions;
}
cosines = QuarticRealPolynomial$1.computeRealRoots(c4, c3, c2, c1, c0);
const length = cosines.length;
if (length === 0) {
return solutions;
}
for (let i = 0; i < length; ++i) {
const cosine = cosines[i];
const cosineSquared = cosine * cosine;
const sineSquared = Math.max(1.0 - cosineSquared, 0.0);
const sine = Math.sqrt(sineSquared);
//const left = l2 * cosineSquared + l1 * cosine + l0;
let left;
if (Math$1.CesiumMath.sign(l2) === Math$1.CesiumMath.sign(l0)) {
left = addWithCancellationCheck(
l2 * cosineSquared + l0,
l1 * cosine,
Math$1.CesiumMath.EPSILON12
);
} else if (Math$1.CesiumMath.sign(l0) === Math$1.CesiumMath.sign(l1 * cosine)) {
left = addWithCancellationCheck(
l2 * cosineSquared,
l1 * cosine + l0,
Math$1.CesiumMath.EPSILON12
);
} else {
left = addWithCancellationCheck(
l2 * cosineSquared + l1 * cosine,
l0,
Math$1.CesiumMath.EPSILON12
);
}
const right = addWithCancellationCheck(
r1 * cosine,
r0,
Math$1.CesiumMath.EPSILON15
);
const product = left * right;
if (product < 0.0) {
solutions.push(new Matrix3.Cartesian3(x, w * cosine, w * sine));
} else if (product > 0.0) {
solutions.push(new Matrix3.Cartesian3(x, w * cosine, w * -sine));
} else if (sine !== 0.0) {
solutions.push(new Matrix3.Cartesian3(x, w * cosine, w * -sine));
solutions.push(new Matrix3.Cartesian3(x, w * cosine, w * sine));
++i;
} else {
solutions.push(new Matrix3.Cartesian3(x, w * cosine, w * sine));
}
}
return solutions;
}
const firstAxisScratch = new Matrix3.Cartesian3();
const secondAxisScratch = new Matrix3.Cartesian3();
const thirdAxisScratch = new Matrix3.Cartesian3();
const referenceScratch = new Matrix3.Cartesian3();
const bCart = new Matrix3.Cartesian3();
const bScratch = new Matrix3.Matrix3();
const btScratch = new Matrix3.Matrix3();
const diScratch = new Matrix3.Matrix3();
const dScratch = new Matrix3.Matrix3();
const cScratch = new Matrix3.Matrix3();
const tempMatrix = new Matrix3.Matrix3();
const aScratch = new Matrix3.Matrix3();
const sScratch = new Matrix3.Cartesian3();
const closestScratch = new Matrix3.Cartesian3();
const surfPointScratch = new Matrix3.Cartographic();
/**
* Provides the point along the ray which is nearest to the ellipsoid.
*
* @param {Ray} ray The ray.
* @param {Ellipsoid} ellipsoid The ellipsoid.
* @returns {Cartesian3} The nearest planetodetic point on the ray.
*/
IntersectionTests.grazingAltitudeLocation = function (ray, ellipsoid) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(ray)) {
throw new Check.DeveloperError("ray is required.");
}
if (!defaultValue.defined(ellipsoid)) {
throw new Check.DeveloperError("ellipsoid is required.");
}
//>>includeEnd('debug');
const position = ray.origin;
const direction = ray.direction;
if (!Matrix3.Cartesian3.equals(position, Matrix3.Cartesian3.ZERO)) {
const normal = ellipsoid.geodeticSurfaceNormal(position, firstAxisScratch);
if (Matrix3.Cartesian3.dot(direction, normal) >= 0.0) {
// The location provided is the closest point in altitude
return position;
}
}
const intersects = defaultValue.defined(this.rayEllipsoid(ray, ellipsoid));
// Compute the scaled direction vector.
const f = ellipsoid.transformPositionToScaledSpace(
direction,
firstAxisScratch
);
// Constructs a basis from the unit scaled direction vector. Construct its rotation and transpose.
const firstAxis = Matrix3.Cartesian3.normalize(f, f);
const reference = Matrix3.Cartesian3.mostOrthogonalAxis(f, referenceScratch);
const secondAxis = Matrix3.Cartesian3.normalize(
Matrix3.Cartesian3.cross(reference, firstAxis, secondAxisScratch),
secondAxisScratch
);
const thirdAxis = Matrix3.Cartesian3.normalize(
Matrix3.Cartesian3.cross(firstAxis, secondAxis, thirdAxisScratch),
thirdAxisScratch
);
const B = bScratch;
B[0] = firstAxis.x;
B[1] = firstAxis.y;
B[2] = firstAxis.z;
B[3] = secondAxis.x;
B[4] = secondAxis.y;
B[5] = secondAxis.z;
B[6] = thirdAxis.x;
B[7] = thirdAxis.y;
B[8] = thirdAxis.z;
const B_T = Matrix3.Matrix3.transpose(B, btScratch);
// Get the scaling matrix and its inverse.
const D_I = Matrix3.Matrix3.fromScale(ellipsoid.radii, diScratch);
const D = Matrix3.Matrix3.fromScale(ellipsoid.oneOverRadii, dScratch);
const C = cScratch;
C[0] = 0.0;
C[1] = -direction.z;
C[2] = direction.y;
C[3] = direction.z;
C[4] = 0.0;
C[5] = -direction.x;
C[6] = -direction.y;
C[7] = direction.x;
C[8] = 0.0;
const temp = Matrix3.Matrix3.multiply(
Matrix3.Matrix3.multiply(B_T, D, tempMatrix),
C,
tempMatrix
);
const A = Matrix3.Matrix3.multiply(
Matrix3.Matrix3.multiply(temp, D_I, aScratch),
B,
aScratch
);
const b = Matrix3.Matrix3.multiplyByVector(temp, position, bCart);
// Solve for the solutions to the expression in standard form:
const solutions = quadraticVectorExpression(
A,
Matrix3.Cartesian3.negate(b, firstAxisScratch),
0.0,
0.0,
1.0
);
let s;
let altitude;
const length = solutions.length;
if (length > 0) {
let closest = Matrix3.Cartesian3.clone(Matrix3.Cartesian3.ZERO, closestScratch);
let maximumValue = Number.NEGATIVE_INFINITY;
for (let i = 0; i < length; ++i) {
s = Matrix3.Matrix3.multiplyByVector(
D_I,
Matrix3.Matrix3.multiplyByVector(B, solutions[i], sScratch),
sScratch
);
const v = Matrix3.Cartesian3.normalize(
Matrix3.Cartesian3.subtract(s, position, referenceScratch),
referenceScratch
);
const dotProduct = Matrix3.Cartesian3.dot(v, direction);
if (dotProduct > maximumValue) {
maximumValue = dotProduct;
closest = Matrix3.Cartesian3.clone(s, closest);
}
}
const surfacePoint = ellipsoid.cartesianToCartographic(
closest,
surfPointScratch
);
maximumValue = Math$1.CesiumMath.clamp(maximumValue, 0.0, 1.0);
altitude =
Matrix3.Cartesian3.magnitude(
Matrix3.Cartesian3.subtract(closest, position, referenceScratch)
) * Math.sqrt(1.0 - maximumValue * maximumValue);
altitude = intersects ? -altitude : altitude;
surfacePoint.height = altitude;
return ellipsoid.cartographicToCartesian(surfacePoint, new Matrix3.Cartesian3());
}
return undefined;
};
const lineSegmentPlaneDifference = new Matrix3.Cartesian3();
/**
* Computes the intersection of a line segment and a plane.
*
* @param {Cartesian3} endPoint0 An end point of the line segment.
* @param {Cartesian3} endPoint1 The other end point of the line segment.
* @param {Plane} plane The plane.
* @param {Cartesian3} [result] The object onto which to store the result.
* @returns {Cartesian3} The intersection point or undefined if there is no intersection.
*
* @example
* const origin = Cesium.Cartesian3.fromDegrees(-75.59777, 40.03883);
* const normal = ellipsoid.geodeticSurfaceNormal(origin);
* const plane = Cesium.Plane.fromPointNormal(origin, normal);
*
* const p0 = new Cesium.Cartesian3(...);
* const p1 = new Cesium.Cartesian3(...);
*
* // find the intersection of the line segment from p0 to p1 and the tangent plane at origin.
* const intersection = Cesium.IntersectionTests.lineSegmentPlane(p0, p1, plane);
*/
IntersectionTests.lineSegmentPlane = function (
endPoint0,
endPoint1,
plane,
result
) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(endPoint0)) {
throw new Check.DeveloperError("endPoint0 is required.");
}
if (!defaultValue.defined(endPoint1)) {
throw new Check.DeveloperError("endPoint1 is required.");
}
if (!defaultValue.defined(plane)) {
throw new Check.DeveloperError("plane is required.");
}
//>>includeEnd('debug');
if (!defaultValue.defined(result)) {
result = new Matrix3.Cartesian3();
}
const difference = Matrix3.Cartesian3.subtract(
endPoint1,
endPoint0,
lineSegmentPlaneDifference
);
const normal = plane.normal;
const nDotDiff = Matrix3.Cartesian3.dot(normal, difference);
// check if the segment and plane are parallel
if (Math.abs(nDotDiff) < Math$1.CesiumMath.EPSILON6) {
return undefined;
}
const nDotP0 = Matrix3.Cartesian3.dot(normal, endPoint0);
const t = -(plane.distance + nDotP0) / nDotDiff;
// intersection only if t is in [0, 1]
if (t < 0.0 || t > 1.0) {
return undefined;
}
// intersection is endPoint0 + t * (endPoint1 - endPoint0)
Matrix3.Cartesian3.multiplyByScalar(difference, t, result);
Matrix3.Cartesian3.add(endPoint0, result, result);
return result;
};
/**
* Computes the intersection of a triangle and a plane
*
* @param {Cartesian3} p0 First point of the triangle
* @param {Cartesian3} p1 Second point of the triangle
* @param {Cartesian3} p2 Third point of the triangle
* @param {Plane} plane Intersection plane
* @returns {Object} An object with properties positions
and indices
, which are arrays that represent three triangles that do not cross the plane. (Undefined if no intersection exists)
*
* @example
* const origin = Cesium.Cartesian3.fromDegrees(-75.59777, 40.03883);
* const normal = ellipsoid.geodeticSurfaceNormal(origin);
* const plane = Cesium.Plane.fromPointNormal(origin, normal);
*
* const p0 = new Cesium.Cartesian3(...);
* const p1 = new Cesium.Cartesian3(...);
* const p2 = new Cesium.Cartesian3(...);
*
* // convert the triangle composed of points (p0, p1, p2) to three triangles that don't cross the plane
* const triangles = Cesium.IntersectionTests.trianglePlaneIntersection(p0, p1, p2, plane);
*/
IntersectionTests.trianglePlaneIntersection = function (p0, p1, p2, plane) {
//>>includeStart('debug', pragmas.debug);
if (!defaultValue.defined(p0) || !defaultValue.defined(p1) || !defaultValue.defined(p2) || !defaultValue.defined(plane)) {
throw new Check.DeveloperError("p0, p1, p2, and plane are required.");
}
//>>includeEnd('debug');
const planeNormal = plane.normal;
const planeD = plane.distance;
const p0Behind = Matrix3.Cartesian3.dot(planeNormal, p0) + planeD < 0.0;
const p1Behind = Matrix3.Cartesian3.dot(planeNormal, p1) + planeD < 0.0;
const p2Behind = Matrix3.Cartesian3.dot(planeNormal, p2) + planeD < 0.0;
// Given these dots products, the calls to lineSegmentPlaneIntersection
// always have defined results.
let numBehind = 0;
numBehind += p0Behind ? 1 : 0;
numBehind += p1Behind ? 1 : 0;
numBehind += p2Behind ? 1 : 0;
let u1, u2;
if (numBehind === 1 || numBehind === 2) {
u1 = new Matrix3.Cartesian3();
u2 = new Matrix3.Cartesian3();
}
if (numBehind === 1) {
if (p0Behind) {
IntersectionTests.lineSegmentPlane(p0, p1, plane, u1);
IntersectionTests.lineSegmentPlane(p0, p2, plane, u2);
return {
positions: [p0, p1, p2, u1, u2],
indices: [
// Behind
0,
3,
4,
// In front
1,
2,
4,
1,
4,
3,
],
};
} else if (p1Behind) {
IntersectionTests.lineSegmentPlane(p1, p2, plane, u1);
IntersectionTests.lineSegmentPlane(p1, p0, plane, u2);
return {
positions: [p0, p1, p2, u1, u2],
indices: [
// Behind
1,
3,
4,
// In front
2,
0,
4,
2,
4,
3,
],
};
} else if (p2Behind) {
IntersectionTests.lineSegmentPlane(p2, p0, plane, u1);
IntersectionTests.lineSegmentPlane(p2, p1, plane, u2);
return {
positions: [p0, p1, p2, u1, u2],
indices: [
// Behind
2,
3,
4,
// In front
0,
1,
4,
0,
4,
3,
],
};
}
} else if (numBehind === 2) {
if (!p0Behind) {
IntersectionTests.lineSegmentPlane(p1, p0, plane, u1);
IntersectionTests.lineSegmentPlane(p2, p0, plane, u2);
return {
positions: [p0, p1, p2, u1, u2],
indices: [
// Behind
1,
2,
4,
1,
4,
3,
// In front
0,
3,
4,
],
};
} else if (!p1Behind) {
IntersectionTests.lineSegmentPlane(p2, p1, plane, u1);
IntersectionTests.lineSegmentPlane(p0, p1, plane, u2);
return {
positions: [p0, p1, p2, u1, u2],
indices: [
// Behind
2,
0,
4,
2,
4,
3,
// In front
1,
3,
4,
],
};
} else if (!p2Behind) {
IntersectionTests.lineSegmentPlane(p0, p2, plane, u1);
IntersectionTests.lineSegmentPlane(p1, p2, plane, u2);
return {
positions: [p0, p1, p2, u1, u2],
indices: [
// Behind
0,
1,
4,
0,
4,
3,
// In front
2,
3,
4,
],
};
}
}
// if numBehind is 3, the triangle is completely behind the plane;
// otherwise, it is completely in front (numBehind is 0).
return undefined;
};
var IntersectionTests$1 = IntersectionTests;
exports.IntersectionTests = IntersectionTests$1;
exports.Ray = Ray;
}));