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https://github.com/Doodle3D/Doodle3D-Slicer.git
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85 lines
3.3 KiB
JavaScript
Executable File
85 lines
3.3 KiB
JavaScript
Executable File
/**
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* Hilbert Curve: Generates 2D-Coordinates in a very fast way.
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*
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* @author Dylan Grafmyre
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*
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* Based on work by:
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* @author Thomas Diewald
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* @link http://www.openprocessing.org/visuals/?visualID=15599
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*
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* Based on `examples/canvas_lines_colors.html`:
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* @author OpenShift guest
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* @link https://github.com/mrdoob/three.js/blob/8413a860aa95ed29c79cbb7f857c97d7880d260f/examples/canvas_lines_colors.html
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* @see Line 149 - 186
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*
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* @param center Center of Hilbert curve.
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* @param size Total width of Hilbert curve.
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* @param iterations Number of subdivisions.
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* @param v0 Corner index -X, +Y, -Z.
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* @param v1 Corner index -X, +Y, +Z.
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* @param v2 Corner index -X, -Y, +Z.
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* @param v3 Corner index -X, -Y, -Z.
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* @param v4 Corner index +X, -Y, -Z.
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* @param v5 Corner index +X, -Y, +Z.
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* @param v6 Corner index +X, +Y, +Z.
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* @param v7 Corner index +X, +Y, -Z.
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*/
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function hilbert3D(center, size, iterations, v0, v1, v2, v3, v4, v5, v6, v7) {
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// Default Vars
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var center = undefined !== center ? center : new THREE.Vector3(0, 0, 0),
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size = undefined !== size ? size : 10,
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half = size / 2,
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iterations = undefined !== iterations ? iterations : 1,
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v0 = undefined !== v0 ? v0 : 0,
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v1 = undefined !== v1 ? v1 : 1,
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v2 = undefined !== v2 ? v2 : 2,
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v3 = undefined !== v3 ? v3 : 3,
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v4 = undefined !== v4 ? v4 : 4,
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v5 = undefined !== v5 ? v5 : 5,
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v6 = undefined !== v6 ? v6 : 6,
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v7 = undefined !== v7 ? v7 : 7
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;
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var vec_s = [
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new THREE.Vector3( center.x - half, center.y + half, center.z - half ),
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new THREE.Vector3( center.x - half, center.y + half, center.z + half ),
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new THREE.Vector3( center.x - half, center.y - half, center.z + half ),
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new THREE.Vector3( center.x - half, center.y - half, center.z - half ),
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new THREE.Vector3( center.x + half, center.y - half, center.z - half ),
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new THREE.Vector3( center.x + half, center.y - half, center.z + half ),
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new THREE.Vector3( center.x + half, center.y + half, center.z + half ),
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new THREE.Vector3( center.x + half, center.y + half, center.z - half )
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];
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var vec = [
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vec_s[ v0 ],
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vec_s[ v1 ],
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vec_s[ v2 ],
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vec_s[ v3 ],
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vec_s[ v4 ],
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vec_s[ v5 ],
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vec_s[ v6 ],
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vec_s[ v7 ]
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];
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// Recurse iterations
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if ( -- iterations >= 0 ) {
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var tmp = [];
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Array.prototype.push.apply( tmp, hilbert3D ( vec[ 0 ], half, iterations, v0, v3, v4, v7, v6, v5, v2, v1 ) );
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Array.prototype.push.apply( tmp, hilbert3D ( vec[ 1 ], half, iterations, v0, v7, v6, v1, v2, v5, v4, v3 ) );
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Array.prototype.push.apply( tmp, hilbert3D ( vec[ 2 ], half, iterations, v0, v7, v6, v1, v2, v5, v4, v3 ) );
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Array.prototype.push.apply( tmp, hilbert3D ( vec[ 3 ], half, iterations, v2, v3, v0, v1, v6, v7, v4, v5 ) );
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Array.prototype.push.apply( tmp, hilbert3D ( vec[ 4 ], half, iterations, v2, v3, v0, v1, v6, v7, v4, v5 ) );
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Array.prototype.push.apply( tmp, hilbert3D ( vec[ 5 ], half, iterations, v4, v3, v2, v5, v6, v1, v0, v7 ) );
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Array.prototype.push.apply( tmp, hilbert3D ( vec[ 6 ], half, iterations, v4, v3, v2, v5, v6, v1, v0, v7 ) );
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Array.prototype.push.apply( tmp, hilbert3D ( vec[ 7 ], half, iterations, v6, v5, v2, v1, v0, v3, v4, v7 ) );
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// Return recursive call
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return tmp;
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}
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// Return complete Hilbert Curve.
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return vec;
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}
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