213 lines
6.1 KiB
JavaScript
213 lines
6.1 KiB
JavaScript
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"use strict";
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var _interopRequireDefault = require("@babel/runtime/helpers/interopRequireDefault");
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Object.defineProperty(exports, "__esModule", {
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value: true
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});
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exports.createUsolveAll = void 0;
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var _toConsumableArray2 = _interopRequireDefault(require("@babel/runtime/helpers/toConsumableArray"));
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var _factory = require("../../../utils/factory.js");
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var _solveValidation = require("./utils/solveValidation.js");
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var name = 'usolveAll';
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var dependencies = ['typed', 'matrix', 'divideScalar', 'multiplyScalar', 'subtract', 'equalScalar', 'DenseMatrix'];
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var createUsolveAll = /* #__PURE__ */(0, _factory.factory)(name, dependencies, function (_ref) {
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var typed = _ref.typed,
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matrix = _ref.matrix,
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divideScalar = _ref.divideScalar,
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multiplyScalar = _ref.multiplyScalar,
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subtract = _ref.subtract,
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equalScalar = _ref.equalScalar,
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DenseMatrix = _ref.DenseMatrix;
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var solveValidation = (0, _solveValidation.createSolveValidation)({
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DenseMatrix: DenseMatrix
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});
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/**
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* Finds all solutions of a linear equation system by backward substitution. Matrix must be an upper triangular matrix.
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*
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* `U * x = b`
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*
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* Syntax:
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*
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* math.usolveAll(U, b)
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*
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* Examples:
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*
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* const a = [[-2, 3], [2, 1]]
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* const b = [11, 9]
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* const x = usolveAll(a, b) // [ [[8], [9]] ]
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*
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* See also:
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*
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* usolve, lup, slu, usolve, lusolve
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*
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* @param {Matrix, Array} U A N x N matrix or array (U)
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* @param {Matrix, Array} b A column vector with the b values
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*
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* @return {DenseMatrix[] | Array[]} An array of affine-independent column vectors (x) that solve the linear system
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*/
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return typed(name, {
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'SparseMatrix, Array | Matrix': function SparseMatrixArrayMatrix(m, b) {
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return _sparseBackwardSubstitution(m, b);
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},
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'DenseMatrix, Array | Matrix': function DenseMatrixArrayMatrix(m, b) {
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return _denseBackwardSubstitution(m, b);
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},
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'Array, Array | Matrix': function ArrayArrayMatrix(a, b) {
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var m = matrix(a);
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var R = _denseBackwardSubstitution(m, b);
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return R.map(function (r) {
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return r.valueOf();
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});
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}
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});
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function _denseBackwardSubstitution(m, b_) {
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// the algorithm is derived from
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// https://www.overleaf.com/read/csvgqdxggyjv
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// array of right-hand sides
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var B = [solveValidation(m, b_, true)._data.map(function (e) {
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return e[0];
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})];
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var M = m._data;
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var rows = m._size[0];
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var columns = m._size[1]; // loop columns backwards
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for (var i = columns - 1; i >= 0; i--) {
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var L = B.length; // loop right-hand sides
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for (var k = 0; k < L; k++) {
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var b = B[k];
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if (!equalScalar(M[i][i], 0)) {
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// non-singular row
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b[i] = divideScalar(b[i], M[i][i]);
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for (var j = i - 1; j >= 0; j--) {
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// b[j] -= b[i] * M[j,i]
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b[j] = subtract(b[j], multiplyScalar(b[i], M[j][i]));
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}
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} else if (!equalScalar(b[i], 0)) {
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// singular row, nonzero RHS
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if (k === 0) {
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// There is no valid solution
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return [];
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} else {
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// This RHS is invalid but other solutions may still exist
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B.splice(k, 1);
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k -= 1;
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L -= 1;
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}
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} else if (k === 0) {
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// singular row, RHS is zero
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var bNew = (0, _toConsumableArray2.default)(b);
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bNew[i] = 1;
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for (var _j = i - 1; _j >= 0; _j--) {
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bNew[_j] = subtract(bNew[_j], M[_j][i]);
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}
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B.push(bNew);
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}
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}
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}
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return B.map(function (x) {
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return new DenseMatrix({
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data: x.map(function (e) {
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return [e];
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}),
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size: [rows, 1]
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});
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});
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}
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function _sparseBackwardSubstitution(m, b_) {
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// array of right-hand sides
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var B = [solveValidation(m, b_, true)._data.map(function (e) {
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return e[0];
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})];
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var rows = m._size[0];
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var columns = m._size[1];
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var values = m._values;
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var index = m._index;
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var ptr = m._ptr; // loop columns backwards
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for (var i = columns - 1; i >= 0; i--) {
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var L = B.length; // loop right-hand sides
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for (var k = 0; k < L; k++) {
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var b = B[k]; // values & indices (column i)
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var iValues = [];
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var iIndices = []; // first & last indeces in column
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var firstIndex = ptr[i];
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var lastIndex = ptr[i + 1]; // find the value at [i, i]
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var Mii = 0;
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for (var j = lastIndex - 1; j >= firstIndex; j--) {
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var J = index[j]; // check row
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if (J === i) {
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Mii = values[j];
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} else if (J < i) {
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// store upper triangular
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iValues.push(values[j]);
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iIndices.push(J);
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}
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}
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if (!equalScalar(Mii, 0)) {
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// non-singular row
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b[i] = divideScalar(b[i], Mii); // loop upper triangular
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for (var _j2 = 0, _lastIndex = iIndices.length; _j2 < _lastIndex; _j2++) {
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var _J = iIndices[_j2];
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b[_J] = subtract(b[_J], multiplyScalar(b[i], iValues[_j2]));
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}
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} else if (!equalScalar(b[i], 0)) {
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// singular row, nonzero RHS
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if (k === 0) {
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// There is no valid solution
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return [];
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} else {
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// This RHS is invalid but other solutions may still exist
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B.splice(k, 1);
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k -= 1;
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L -= 1;
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}
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} else if (k === 0) {
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// singular row, RHS is zero
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var bNew = (0, _toConsumableArray2.default)(b);
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bNew[i] = 1; // loop upper triangular
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for (var _j3 = 0, _lastIndex2 = iIndices.length; _j3 < _lastIndex2; _j3++) {
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var _J2 = iIndices[_j3];
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bNew[_J2] = subtract(bNew[_J2], iValues[_j3]);
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}
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B.push(bNew);
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}
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}
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}
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return B.map(function (x) {
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return new DenseMatrix({
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data: x.map(function (e) {
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return [e];
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}),
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size: [rows, 1]
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});
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});
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}
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});
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exports.createUsolveAll = createUsolveAll;
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