4poc/gist:9c67a8ff27b429559986

## gistfile1.d
/**
 * Simplex noise algorithm.
 *
 * This is a port of the public domain java implementation (see
 * original header) and is public domain aswell.
 * ported by Matthias Hecker <apoc.cc>.
 * Links:
 * http://webstaff.itn.liu.se/~stegu/simplexnoise/
 * http://stackoverflow.com/a/18516731
 */
/*
 * A speed-improved simplex noise algorithm for 2D, 3D and 4D in Java.
 *
 * Based on example code by Stefan Gustavson (stegu@itn.liu.se).
 * Optimisations by Peter Eastman (peastman@drizzle.stanford.edu).
 * Better rank ordering method by Stefan Gustavson in 2012.
 *
 * This could be speeded up even further, but it's useful as it is.
 *
 * Version 2012-03-09
 *
 * This code was placed in the public domain by its original author,
 * Stefan Gustavson. You may use it as you see fit, but
 * attribution is appreciated.
 *
 */

module utils.algorithms.simplex;

import std.random;
import std.math;

class SimplexNoise_octave {
    public static int RANDOMSEED = 0;
    private static int NUMBEROFSWAPS = 400;

    private static Grad grad3[] = [
        new Grad(1,1,0), new Grad(-1,1,0), new Grad(1,-1,0), new Grad(-1,-1,0),
        new Grad(1,0,1), new Grad(-1,0,1), new Grad(1,0,-1), new Grad(-1,0,-1),
        new Grad(0,1,1), new Grad(0,-1,1), new Grad(0,1,-1), new Grad(0,-1,-1)
    ];

    private static Grad grad4[] = [
        new Grad(0,1,1,1), new Grad(0,1,1,-1), new Grad(0,1,-1,1), new Grad(0,1,-1,-1),
        new Grad(0,-1,1,1), new Grad(0,-1,1,-1), new Grad(0,-1,-1,1), new Grad(0,-1,-1,-1),
        new Grad(1,0,1,1), new Grad(1,0,1,-1), new Grad(1,0,-1,1), new Grad(1,0,-1,-1),
        new Grad(-1,0,1,1), new Grad(-1,0,1,-1), new Grad(-1,0,-1,1), new Grad(-1,0,-1,-1),
        new Grad(1,1,0,1), new Grad(1,1,0,-1), new Grad(1,-1,0,1), new Grad(1,-1,0,-1),
        new Grad(-1,1,0,1), new Grad(-1,1,0,-1), new Grad(-1,-1,0,1), new Grad(-1,-1,0,-1),
        new Grad(1,1,1,0), new Grad(1,1,-1,0), new Grad(1,-1,1,0), new Grad(1,-1,-1,0),
        new Grad(-1,1,1,0), new Grad(-1,1,-1,0), new Grad(-1,-1,1,0), new Grad(-1,-1,-1,0)
    ];

    // this contains all the numbers between 0 and 255, these are
    // put in a random order depending upon the seed
    private static const short p_supply[] = [
        151,160,137,91,90,15,
        131,13,201,95,96,53,194,233,7,225,140,36,103,30,69,142,8,99,37,240,21,10,23,
        190, 6,148,247,120,234,75,0,26,197,62,94,252,219,203,117,35,11,32,57,177,33,
        88,237,149,56,87,174,20,125,136,171,168, 68,175,74,165,71,134,139,48,27,166,
        77,146,158,231,83,111,229,122,60,211,133,230,220,105,92,41,55,46,245,40,244,
        102,143,54, 65,25,63,161, 1,216,80,73,209,76,132,187,208, 89,18,169,200,196,
        135,130,116,188,159,86,164,100,109,198,173,186, 3,64,52,217,226,250,124,123,
        5,202,38,147,118,126,255,82,85,212,207,206,59,227,47,16,58,17,182,189,28,42,
        223,183,170,213,119,248,152, 2,44,154,163, 70,221,153,101,155,167, 43,172,9,
        129,22,39,253, 19,98,108,110,79,113,224,232,178,185, 112,104,218,246,97,228,
        251,34,242,193,238,210,144,12,191,179,162,241, 81,51,145,235,249,14,239,107,
        49,192,214, 31,181,199,106,157,184, 84,204,176,115,121,50,45,127, 4,150,254,
        138,236,205,93,222,114,67,29,24,72,243,141,128,195,78,66,215,61,156,180
    ];

    private short p[] = new short[p_supply.length];

    // To remove the need for index wrapping, double the permutation table length
    private short perm[] = new short[512];
    private short permMod12[] = new short[512];

    public this(int seed) {
        p[] = p_supply; // .clone();

        if (seed==RANDOMSEED){
            auto rand = new Random();
            seed = uniform!int(rand);
        }

        //the random for the swaps
        auto rand = new Random(seed);

        //the seed determines the swaps that occur between the default order and the order we're actually going to use
        for(int i=0; i < NUMBEROFSWAPS; i++) {
            int swapFrom = cast(int) uniform(0, p.length, rand);
            int swapTo = cast(int) uniform(0, p.length, rand);

            short temp = p[swapFrom];
            p[swapFrom] = p[swapTo];
            p[swapTo] = temp;
        }


        for(int i=0; i<512; i++) {
            perm[i]=p[i & 255];
            permMod12[i] = cast(short)(perm[i] % 12);
        }
    }

    // Skewing and unskewing factors for 2, 3, and 4 dimensions
    private static final double F2 = 0.5*(sqrt(3.0)-1.0);
    private static final double G2 = (3.0-sqrt(3.0))/6.0;
    private static final double F3 = 1.0/3.0;
    private static final double G3 = 1.0/6.0;
    private static final double F4 = (sqrt(5.0)-1.0)/4.0;
    private static final double G4 = (5.0-sqrt(5.0))/20.0;

    // This method is a *lot* faster than using (int)Math.floor(x)
    private static int fastfloor(double x) {
        int xi = cast(int)x;
        return x<xi ? xi-1 : xi;
    }

    private static double dot(Grad g, double x, double y) {
        return g.x*x + g.y*y; }

    private static double dot(Grad g, double x, double y, double z) {
        return g.x*x + g.y*y + g.z*z; }

    private static double dot(Grad g, double x, double y, double z, double w) {
        return g.x*x + g.y*y + g.z*z + g.w*w; }

    // 2D simplex noise
    public double noise(double xin, double yin) {
        double n0, n1, n2; // Noise contributions from the three corners
        // Skew the input space to determine which simplex cell we're in
        double s = (xin+yin)*F2; // Hairy factor for 2D
        int i = fastfloor(xin+s);
        int j = fastfloor(yin+s);
        double t = (i+j)*G2;
        double X0 = i-t; // Unskew the cell origin back to (x,y) space
        double Y0 = j-t;
        double x0 = xin-X0; // The x,y distances from the cell origin
        double y0 = yin-Y0;
        // For the 2D case, the simplex shape is an equilateral triangle.
        // Determine which simplex we are in.
        int i1, j1; // Offsets for second (middle) corner of simplex in (i,j) coords
        if(x0>y0) {i1=1; j1=0;} // lower triangle, XY order: (0,0)->(1,0)->(1,1)
        else {i1=0; j1=1;}      // upper triangle, YX order: (0,0)->(0,1)->(1,1)
        // A step of (1,0) in (i,j) means a step of (1-c,-c) in (x,y), and
        // a step of (0,1) in (i,j) means a step of (-c,1-c) in (x,y), where
        // c = (3-sqrt(3))/6
        double x1 = x0 - i1 + G2; // Offsets for middle corner in (x,y) unskewed coords
        double y1 = y0 - j1 + G2;
        double x2 = x0 - 1.0 + 2.0 * G2; // Offsets for last corner in (x,y) unskewed coords
        double y2 = y0 - 1.0 + 2.0 * G2;
        // Work out the hashed gradient indices of the three simplex corners
        int ii = i & 255;
        int jj = j & 255;
        int gi0 = permMod12[ii+perm[jj]];
        int gi1 = permMod12[ii+i1+perm[jj+j1]];
        int gi2 = permMod12[ii+1+perm[jj+1]];
        // Calculate the contribution from the three corners
        double t0 = 0.5 - x0*x0-y0*y0;
        if(t0<0) n0 = 0.0;
        else {
            t0 *= t0;
            n0 = t0 * t0 * dot(grad3[gi0], x0, y0);  // (x,y) of grad3 used for 2D gradient
        }
        double t1 = 0.5 - x1*x1-y1*y1;
        if(t1<0) n1 = 0.0;
        else {
            t1 *= t1;
            n1 = t1 * t1 * dot(grad3[gi1], x1, y1);
        }
        double t2 = 0.5 - x2*x2-y2*y2;
        if(t2<0) n2 = 0.0;
        else {
            t2 *= t2;
            n2 = t2 * t2 * dot(grad3[gi2], x2, y2);
        }
        // Add contributions from each corner to get the final noise value.
        // The result is scaled to return values in the interval [-1,1].
        return 70.0 * (n0 + n1 + n2);
    }


    // 3D simplex noise
    public double noise(double xin, double yin, double zin) {
        double n0, n1, n2, n3; // Noise contributions from the four corners
        // Skew the input space to determine which simplex cell we're in
        double s = (xin+yin+zin)*F3; // Very nice and simple skew factor for 3D
        int i = fastfloor(xin+s);
        int j = fastfloor(yin+s);
        int k = fastfloor(zin+s);
        double t = (i+j+k)*G3;
        double X0 = i-t; // Unskew the cell origin back to (x,y,z) space
        double Y0 = j-t;
        double Z0 = k-t;
        double x0 = xin-X0; // The x,y,z distances from the cell origin
        double y0 = yin-Y0;
        double z0 = zin-Z0;
        // For the 3D case, the simplex shape is a slightly irregular tetrahedron.
        // Determine which simplex we are in.
        int i1, j1, k1; // Offsets for second corner of simplex in (i,j,k) coords
        int i2, j2, k2; // Offsets for third corner of simplex in (i,j,k) coords
        if(x0>=y0) {
            if(y0>=z0)
            { i1=1; j1=0; k1=0; i2=1; j2=1; k2=0; } // X Y Z order
            else if(x0>=z0) { i1=1; j1=0; k1=0; i2=1; j2=0; k2=1; } // X Z Y order
            else { i1=0; j1=0; k1=1; i2=1; j2=0; k2=1; } // Z X Y order
        }
        else { // x0<y0
            if(y0<z0) { i1=0; j1=0; k1=1; i2=0; j2=1; k2=1; } // Z Y X order
            else if(x0<z0) { i1=0; j1=1; k1=0; i2=0; j2=1; k2=1; } // Y Z X order
            else { i1=0; j1=1; k1=0; i2=1; j2=1; k2=0; } // Y X Z order
        }
        // A step of (1,0,0) in (i,j,k) means a step of (1-c,-c,-c) in (x,y,z),
        // a step of (0,1,0) in (i,j,k) means a step of (-c,1-c,-c) in (x,y,z), and
        // a step of (0,0,1) in (i,j,k) means a step of (-c,-c,1-c) in (x,y,z), where
        // c = 1/6.
        double x1 = x0 - i1 + G3; // Offsets for second corner in (x,y,z) coords
        double y1 = y0 - j1 + G3;
        double z1 = z0 - k1 + G3;
        double x2 = x0 - i2 + 2.0*G3; // Offsets for third corner in (x,y,z) coords
        double y2 = y0 - j2 + 2.0*G3;
        double z2 = z0 - k2 + 2.0*G3;
        double x3 = x0 - 1.0 + 3.0*G3; // Offsets for last corner in (x,y,z) coords
        double y3 = y0 - 1.0 + 3.0*G3;
        double z3 = z0 - 1.0 + 3.0*G3;
        // Work out the hashed gradient indices of the four simplex corners
        int ii = i & 255;
        int jj = j & 255;
        int kk = k & 255;
        int gi0 = permMod12[ii+perm[jj+perm[kk]]];
        int gi1 = permMod12[ii+i1+perm[jj+j1+perm[kk+k1]]];
        int gi2 = permMod12[ii+i2+perm[jj+j2+perm[kk+k2]]];
        int gi3 = permMod12[ii+1+perm[jj+1+perm[kk+1]]];
        // Calculate the contribution from the four corners
        double t0 = 0.6 - x0*x0 - y0*y0 - z0*z0;
        if(t0<0) n0 = 0.0;
        else {
            t0 *= t0;
            n0 = t0 * t0 * dot(grad3[gi0], x0, y0, z0);
        }
        double t1 = 0.6 - x1*x1 - y1*y1 - z1*z1;
        if(t1<0) n1 = 0.0;
        else {
            t1 *= t1;
            n1 = t1 * t1 * dot(grad3[gi1], x1, y1, z1);
        }
        double t2 = 0.6 - x2*x2 - y2*y2 - z2*z2;
        if(t2<0) n2 = 0.0;
        else {
            t2 *= t2;
            n2 = t2 * t2 * dot(grad3[gi2], x2, y2, z2);
        }
        double t3 = 0.6 - x3*x3 - y3*y3 - z3*z3;
        if(t3<0) n3 = 0.0;
        else {
            t3 *= t3;
            n3 = t3 * t3 * dot(grad3[gi3], x3, y3, z3);
        }
        // Add contributions from each corner to get the final noise value.
        // The result is scaled to stay just inside [-1,1]
        return 32.0*(n0 + n1 + n2 + n3);
    }


    // 4D simplex noise, better simplex rank ordering method 2012-03-09
    public double noise(double x, double y, double z, double w) {

        double n0, n1, n2, n3, n4; // Noise contributions from the five corners
        // Skew the (x,y,z,w) space to determine which cell of 24 simplices we're in
        double s = (x + y + z + w) * F4; // Factor for 4D skewing
        int i = fastfloor(x + s);
        int j = fastfloor(y + s);
        int k = fastfloor(z + s);
        int l = fastfloor(w + s);
        double t = (i + j + k + l) * G4; // Factor for 4D unskewing
        double X0 = i - t; // Unskew the cell origin back to (x,y,z,w) space
        double Y0 = j - t;
        double Z0 = k - t;
        double W0 = l - t;
        double x0 = x - X0;  // The x,y,z,w distances from the cell origin
        double y0 = y - Y0;
        double z0 = z - Z0;
        double w0 = w - W0;
        // For the 4D case, the simplex is a 4D shape I won't even try to describe.
        // To find out which of the 24 possible simplices we're in, we need to
        // determine the magnitude ordering of x0, y0, z0 and w0.
        // Six pair-wise comparisons are performed between each possible pair
        // of the four coordinates, and the results are used to rank the numbers.
        int rankx = 0;
        int ranky = 0;
        int rankz = 0;
        int rankw = 0;
        if(x0 > y0) rankx++; else ranky++;
        if(x0 > z0) rankx++; else rankz++;
        if(x0 > w0) rankx++; else rankw++;
        if(y0 > z0) ranky++; else rankz++;
        if(y0 > w0) ranky++; else rankw++;
        if(z0 > w0) rankz++; else rankw++;
        int i1, j1, k1, l1; // The integer offsets for the second simplex corner
        int i2, j2, k2, l2; // The integer offsets for the third simplex corner
        int i3, j3, k3, l3; // The integer offsets for the fourth simplex corner
        // simplex[c] is a 4-vector with the numbers 0, 1, 2 and 3 in some order.
        // Many values of c will never occur, since e.g. x>y>z>w makes x<z, y<w and x<w
        // impossible. Only the 24 indices which have non-zero entries make any sense.
        // We use a thresholding to set the coordinates in turn from the largest magnitude.
        // Rank 3 denotes the largest coordinate.
        i1 = rankx >= 3 ? 1 : 0;
        j1 = ranky >= 3 ? 1 : 0;
        k1 = rankz >= 3 ? 1 : 0;
        l1 = rankw >= 3 ? 1 : 0;
        // Rank 2 denotes the second largest coordinate.
        i2 = rankx >= 2 ? 1 : 0;
        j2 = ranky >= 2 ? 1 : 0;
        k2 = rankz >= 2 ? 1 : 0;
        l2 = rankw >= 2 ? 1 : 0;
        // Rank 1 denotes the second smallest coordinate.
        i3 = rankx >= 1 ? 1 : 0;
        j3 = ranky >= 1 ? 1 : 0;
        k3 = rankz >= 1 ? 1 : 0;
        l3 = rankw >= 1 ? 1 : 0;
        // The fifth corner has all coordinate offsets = 1, so no need to compute that.
        double x1 = x0 - i1 + G4; // Offsets for second corner in (x,y,z,w) coords
        double y1 = y0 - j1 + G4;
        double z1 = z0 - k1 + G4;
        double w1 = w0 - l1 + G4;
        double x2 = x0 - i2 + 2.0*G4; // Offsets for third corner in (x,y,z,w) coords
        double y2 = y0 - j2 + 2.0*G4;
        double z2 = z0 - k2 + 2.0*G4;
        double w2 = w0 - l2 + 2.0*G4;
        double x3 = x0 - i3 + 3.0*G4; // Offsets for fourth corner in (x,y,z,w) coords
        double y3 = y0 - j3 + 3.0*G4;
        double z3 = z0 - k3 + 3.0*G4;
        double w3 = w0 - l3 + 3.0*G4;
        double x4 = x0 - 1.0 + 4.0*G4; // Offsets for last corner in (x,y,z,w) coords
        double y4 = y0 - 1.0 + 4.0*G4;
        double z4 = z0 - 1.0 + 4.0*G4;
        double w4 = w0 - 1.0 + 4.0*G4;
        // Work out the hashed gradient indices of the five simplex corners
        int ii = i & 255;
        int jj = j & 255;
        int kk = k & 255;
        int ll = l & 255;
        int gi0 = perm[ii+perm[jj+perm[kk+perm[ll]]]] % 32;
        int gi1 = perm[ii+i1+perm[jj+j1+perm[kk+k1+perm[ll+l1]]]] % 32;
        int gi2 = perm[ii+i2+perm[jj+j2+perm[kk+k2+perm[ll+l2]]]] % 32;
        int gi3 = perm[ii+i3+perm[jj+j3+perm[kk+k3+perm[ll+l3]]]] % 32;
        int gi4 = perm[ii+1+perm[jj+1+perm[kk+1+perm[ll+1]]]] % 32;
        // Calculate the contribution from the five corners
        double t0 = 0.6 - x0*x0 - y0*y0 - z0*z0 - w0*w0;
        if(t0<0) n0 = 0.0;
        else {
            t0 *= t0;
            n0 = t0 * t0 * dot(grad4[gi0], x0, y0, z0, w0);
        }
        double t1 = 0.6 - x1*x1 - y1*y1 - z1*z1 - w1*w1;
        if(t1<0) n1 = 0.0;
        else {
            t1 *= t1;
            n1 = t1 * t1 * dot(grad4[gi1], x1, y1, z1, w1);
        }
        double t2 = 0.6 - x2*x2 - y2*y2 - z2*z2 - w2*w2;
        if(t2<0) n2 = 0.0;
        else {
            t2 *= t2;
            n2 = t2 * t2 * dot(grad4[gi2], x2, y2, z2, w2);
        }
        double t3 = 0.6 - x3*x3 - y3*y3 - z3*z3 - w3*w3;
        if(t3<0) n3 = 0.0;
        else {
            t3 *= t3;
            n3 = t3 * t3 * dot(grad4[gi3], x3, y3, z3, w3);
        }
        double t4 = 0.6 - x4*x4 - y4*y4 - z4*z4 - w4*w4;
        if(t4<0) n4 = 0.0;
        else {
            t4 *= t4;
            n4 = t4 * t4 * dot(grad4[gi4], x4, y4, z4, w4);
        }
        // Sum up and scale the result to cover the range [-1,1]
        return 27.0 * (n0 + n1 + n2 + n3 + n4);
    }

    // Inner class to speed upp gradient computations
    // (array access is a lot slower than member access)
    private static class Grad {
        double x, y, z, w;

        this(double x, double y, double z) {
            this.x = x;
            this.y = y;
            this.z = z;
        }

        this(double x, double y, double z, double w) {
            this.x = x;
            this.y = y;
            this.z = z;
            this.w = w;
        }
    }
}
	/**
	* Simplex noise algorithm.
	*
	* This is a port of the public domain java implementation (see
	* original header) and is public domain aswell.
	* ported by Matthias Hecker <apoc.cc>.
	* Links:
	* http://webstaff.itn.liu.se/~stegu/simplexnoise/
	* http://stackoverflow.com/a/18516731
	*/
	/*
	* A speed-improved simplex noise algorithm for 2D, 3D and 4D in Java.
	*
	* Based on example code by Stefan Gustavson (stegu@itn.liu.se).
	* Optimisations by Peter Eastman (peastman@drizzle.stanford.edu).
	* Better rank ordering method by Stefan Gustavson in 2012.
	*
	* This could be speeded up even further, but it's useful as it is.
	*
	* Version 2012-03-09
	*
	* This code was placed in the public domain by its original author,
	* Stefan Gustavson. You may use it as you see fit, but
	* attribution is appreciated.
	*
	*/

	module utils.algorithms.simplex;

	import std.random;
	import std.math;

	class SimplexNoise_octave {
	public static int RANDOMSEED = 0;
	private static int NUMBEROFSWAPS = 400;

	private static Grad grad3[] = [
	new Grad(1,1,0), new Grad(-1,1,0), new Grad(1,-1,0), new Grad(-1,-1,0),
	new Grad(1,0,1), new Grad(-1,0,1), new Grad(1,0,-1), new Grad(-1,0,-1),
	new Grad(0,1,1), new Grad(0,-1,1), new Grad(0,1,-1), new Grad(0,-1,-1)
	];

	private static Grad grad4[] = [
	new Grad(0,1,1,1), new Grad(0,1,1,-1), new Grad(0,1,-1,1), new Grad(0,1,-1,-1),
	new Grad(0,-1,1,1), new Grad(0,-1,1,-1), new Grad(0,-1,-1,1), new Grad(0,-1,-1,-1),
	new Grad(1,0,1,1), new Grad(1,0,1,-1), new Grad(1,0,-1,1), new Grad(1,0,-1,-1),
	new Grad(-1,0,1,1), new Grad(-1,0,1,-1), new Grad(-1,0,-1,1), new Grad(-1,0,-1,-1),
	new Grad(1,1,0,1), new Grad(1,1,0,-1), new Grad(1,-1,0,1), new Grad(1,-1,0,-1),
	new Grad(-1,1,0,1), new Grad(-1,1,0,-1), new Grad(-1,-1,0,1), new Grad(-1,-1,0,-1),
	new Grad(1,1,1,0), new Grad(1,1,-1,0), new Grad(1,-1,1,0), new Grad(1,-1,-1,0),
	new Grad(-1,1,1,0), new Grad(-1,1,-1,0), new Grad(-1,-1,1,0), new Grad(-1,-1,-1,0)
	];

	// this contains all the numbers between 0 and 255, these are
	// put in a random order depending upon the seed
	private static const short p_supply[] = [
	151,160,137,91,90,15,
	131,13,201,95,96,53,194,233,7,225,140,36,103,30,69,142,8,99,37,240,21,10,23,
	190, 6,148,247,120,234,75,0,26,197,62,94,252,219,203,117,35,11,32,57,177,33,
	88,237,149,56,87,174,20,125,136,171,168, 68,175,74,165,71,134,139,48,27,166,
	77,146,158,231,83,111,229,122,60,211,133,230,220,105,92,41,55,46,245,40,244,
	102,143,54, 65,25,63,161, 1,216,80,73,209,76,132,187,208, 89,18,169,200,196,
	135,130,116,188,159,86,164,100,109,198,173,186, 3,64,52,217,226,250,124,123,
	5,202,38,147,118,126,255,82,85,212,207,206,59,227,47,16,58,17,182,189,28,42,
	223,183,170,213,119,248,152, 2,44,154,163, 70,221,153,101,155,167, 43,172,9,
	129,22,39,253, 19,98,108,110,79,113,224,232,178,185, 112,104,218,246,97,228,
	251,34,242,193,238,210,144,12,191,179,162,241, 81,51,145,235,249,14,239,107,
	49,192,214, 31,181,199,106,157,184, 84,204,176,115,121,50,45,127, 4,150,254,
	138,236,205,93,222,114,67,29,24,72,243,141,128,195,78,66,215,61,156,180
	];

	private short p[] = new short[p_supply.length];

	// To remove the need for index wrapping, double the permutation table length
	private short perm[] = new short[512];
	private short permMod12[] = new short[512];

	public this(int seed) {
	p[] = p_supply; // .clone();

	if (seed==RANDOMSEED){
	auto rand = new Random();
	seed = uniform!int(rand);
	}

	//the random for the swaps
	auto rand = new Random(seed);

	//the seed determines the swaps that occur between the default order and the order we're actually going to use
	for(int i=0; i < NUMBEROFSWAPS; i++) {
	int swapFrom = cast(int) uniform(0, p.length, rand);
	int swapTo = cast(int) uniform(0, p.length, rand);

	short temp = p[swapFrom];
	p[swapFrom] = p[swapTo];
	p[swapTo] = temp;
	}


	for(int i=0; i<512; i++) {
	perm[i]=p[i & 255];
	permMod12[i] = cast(short)(perm[i] % 12);
	}
	}

	// Skewing and unskewing factors for 2, 3, and 4 dimensions
	private static final double F2 = 0.5*(sqrt(3.0)-1.0);
	private static final double G2 = (3.0-sqrt(3.0))/6.0;
	private static final double F3 = 1.0/3.0;
	private static final double G3 = 1.0/6.0;
	private static final double F4 = (sqrt(5.0)-1.0)/4.0;
	private static final double G4 = (5.0-sqrt(5.0))/20.0;

	// This method is a lot faster than using (int)Math.floor(x)
	private static int fastfloor(double x) {
	int xi = cast(int)x;
	return x<xi ? xi-1 : xi;
	}

	private static double dot(Grad g, double x, double y) {
	return g.xx + g.yy; }

	private static double dot(Grad g, double x, double y, double z) {
	return g.xx + g.yy + g.z*z; }

	private static double dot(Grad g, double x, double y, double z, double w) {
	return g.xx + g.yy + g.zz + g.ww; }

	// 2D simplex noise
	public double noise(double xin, double yin) {
	double n0, n1, n2; // Noise contributions from the three corners
	// Skew the input space to determine which simplex cell we're in
	double s = (xin+yin)*F2; // Hairy factor for 2D
	int i = fastfloor(xin+s);
	int j = fastfloor(yin+s);
	double t = (i+j)*G2;
	double X0 = i-t; // Unskew the cell origin back to (x,y) space
	double Y0 = j-t;
	double x0 = xin-X0; // The x,y distances from the cell origin
	double y0 = yin-Y0;
	// For the 2D case, the simplex shape is an equilateral triangle.
	// Determine which simplex we are in.
	int i1, j1; // Offsets for second (middle) corner of simplex in (i,j) coords
	if(x0>y0) {i1=1; j1=0;} // lower triangle, XY order: (0,0)->(1,0)->(1,1)
	else {i1=0; j1=1;} // upper triangle, YX order: (0,0)->(0,1)->(1,1)
	// A step of (1,0) in (i,j) means a step of (1-c,-c) in (x,y), and
	// a step of (0,1) in (i,j) means a step of (-c,1-c) in (x,y), where
	// c = (3-sqrt(3))/6
	double x1 = x0 - i1 + G2; // Offsets for middle corner in (x,y) unskewed coords
	double y1 = y0 - j1 + G2;
	double x2 = x0 - 1.0 + 2.0 * G2; // Offsets for last corner in (x,y) unskewed coords
	double y2 = y0 - 1.0 + 2.0 * G2;
	// Work out the hashed gradient indices of the three simplex corners
	int ii = i & 255;
	int jj = j & 255;
	int gi0 = permMod12[ii+perm[jj]];
	int gi1 = permMod12[ii+i1+perm[jj+j1]];
	int gi2 = permMod12[ii+1+perm[jj+1]];
	// Calculate the contribution from the three corners
	double t0 = 0.5 - x0x0-y0y0;
	if(t0<0) n0 = 0.0;
	else {
	t0 *= t0;
	n0 = t0 * t0 * dot(grad3[gi0], x0, y0); // (x,y) of grad3 used for 2D gradient
	}
	double t1 = 0.5 - x1x1-y1y1;
	if(t1<0) n1 = 0.0;
	else {
	t1 *= t1;
	n1 = t1 * t1 * dot(grad3[gi1], x1, y1);
	}
	double t2 = 0.5 - x2x2-y2y2;
	if(t2<0) n2 = 0.0;
	else {
	t2 *= t2;
	n2 = t2 * t2 * dot(grad3[gi2], x2, y2);
	}
	// Add contributions from each corner to get the final noise value.
	// The result is scaled to return values in the interval [-1,1].
	return 70.0 * (n0 + n1 + n2);
	}


	// 3D simplex noise
	public double noise(double xin, double yin, double zin) {
	double n0, n1, n2, n3; // Noise contributions from the four corners
	// Skew the input space to determine which simplex cell we're in
	double s = (xin+yin+zin)*F3; // Very nice and simple skew factor for 3D
	int i = fastfloor(xin+s);
	int j = fastfloor(yin+s);
	int k = fastfloor(zin+s);
	double t = (i+j+k)*G3;
	double X0 = i-t; // Unskew the cell origin back to (x,y,z) space
	double Y0 = j-t;
	double Z0 = k-t;
	double x0 = xin-X0; // The x,y,z distances from the cell origin
	double y0 = yin-Y0;
	double z0 = zin-Z0;
	// For the 3D case, the simplex shape is a slightly irregular tetrahedron.
	// Determine which simplex we are in.
	int i1, j1, k1; // Offsets for second corner of simplex in (i,j,k) coords
	int i2, j2, k2; // Offsets for third corner of simplex in (i,j,k) coords
	if(x0>=y0) {
	if(y0>=z0)
	{ i1=1; j1=0; k1=0; i2=1; j2=1; k2=0; } // X Y Z order
	else if(x0>=z0) { i1=1; j1=0; k1=0; i2=1; j2=0; k2=1; } // X Z Y order
	else { i1=0; j1=0; k1=1; i2=1; j2=0; k2=1; } // Z X Y order
	}
	else { // x0<y0
	if(y0<z0) { i1=0; j1=0; k1=1; i2=0; j2=1; k2=1; } // Z Y X order
	else if(x0<z0) { i1=0; j1=1; k1=0; i2=0; j2=1; k2=1; } // Y Z X order
	else { i1=0; j1=1; k1=0; i2=1; j2=1; k2=0; } // Y X Z order
	}
	// A step of (1,0,0) in (i,j,k) means a step of (1-c,-c,-c) in (x,y,z),
	// a step of (0,1,0) in (i,j,k) means a step of (-c,1-c,-c) in (x,y,z), and
	// a step of (0,0,1) in (i,j,k) means a step of (-c,-c,1-c) in (x,y,z), where
	// c = 1/6.
	double x1 = x0 - i1 + G3; // Offsets for second corner in (x,y,z) coords
	double y1 = y0 - j1 + G3;
	double z1 = z0 - k1 + G3;
	double x2 = x0 - i2 + 2.0*G3; // Offsets for third corner in (x,y,z) coords
	double y2 = y0 - j2 + 2.0*G3;
	double z2 = z0 - k2 + 2.0*G3;
	double x3 = x0 - 1.0 + 3.0*G3; // Offsets for last corner in (x,y,z) coords
	double y3 = y0 - 1.0 + 3.0*G3;
	double z3 = z0 - 1.0 + 3.0*G3;
	// Work out the hashed gradient indices of the four simplex corners
	int ii = i & 255;
	int jj = j & 255;
	int kk = k & 255;
	int gi0 = permMod12[ii+perm[jj+perm[kk]]];
	int gi1 = permMod12[ii+i1+perm[jj+j1+perm[kk+k1]]];
	int gi2 = permMod12[ii+i2+perm[jj+j2+perm[kk+k2]]];
	int gi3 = permMod12[ii+1+perm[jj+1+perm[kk+1]]];
	// Calculate the contribution from the four corners
	double t0 = 0.6 - x0x0 - y0y0 - z0*z0;
	if(t0<0) n0 = 0.0;
	else {
	t0 *= t0;
	n0 = t0 * t0 * dot(grad3[gi0], x0, y0, z0);
	}
	double t1 = 0.6 - x1x1 - y1y1 - z1*z1;
	if(t1<0) n1 = 0.0;
	else {
	t1 *= t1;
	n1 = t1 * t1 * dot(grad3[gi1], x1, y1, z1);
	}
	double t2 = 0.6 - x2x2 - y2y2 - z2*z2;
	if(t2<0) n2 = 0.0;
	else {
	t2 *= t2;
	n2 = t2 * t2 * dot(grad3[gi2], x2, y2, z2);
	}
	double t3 = 0.6 - x3x3 - y3y3 - z3*z3;
	if(t3<0) n3 = 0.0;
	else {
	t3 *= t3;
	n3 = t3 * t3 * dot(grad3[gi3], x3, y3, z3);
	}
	// Add contributions from each corner to get the final noise value.
	// The result is scaled to stay just inside [-1,1]
	return 32.0*(n0 + n1 + n2 + n3);
	}


	// 4D simplex noise, better simplex rank ordering method 2012-03-09
	public double noise(double x, double y, double z, double w) {

	double n0, n1, n2, n3, n4; // Noise contributions from the five corners
	// Skew the (x,y,z,w) space to determine which cell of 24 simplices we're in
	double s = (x + y + z + w) * F4; // Factor for 4D skewing
	int i = fastfloor(x + s);
	int j = fastfloor(y + s);
	int k = fastfloor(z + s);
	int l = fastfloor(w + s);
	double t = (i + j + k + l) * G4; // Factor for 4D unskewing
	double X0 = i - t; // Unskew the cell origin back to (x,y,z,w) space
	double Y0 = j - t;
	double Z0 = k - t;
	double W0 = l - t;
	double x0 = x - X0; // The x,y,z,w distances from the cell origin
	double y0 = y - Y0;
	double z0 = z - Z0;
	double w0 = w - W0;
	// For the 4D case, the simplex is a 4D shape I won't even try to describe.
	// To find out which of the 24 possible simplices we're in, we need to
	// determine the magnitude ordering of x0, y0, z0 and w0.
	// Six pair-wise comparisons are performed between each possible pair
	// of the four coordinates, and the results are used to rank the numbers.
	int rankx = 0;
	int ranky = 0;
	int rankz = 0;
	int rankw = 0;
	if(x0 > y0) rankx++; else ranky++;
	if(x0 > z0) rankx++; else rankz++;
	if(x0 > w0) rankx++; else rankw++;
	if(y0 > z0) ranky++; else rankz++;
	if(y0 > w0) ranky++; else rankw++;
	if(z0 > w0) rankz++; else rankw++;
	int i1, j1, k1, l1; // The integer offsets for the second simplex corner
	int i2, j2, k2, l2; // The integer offsets for the third simplex corner
	int i3, j3, k3, l3; // The integer offsets for the fourth simplex corner
	// simplex[c] is a 4-vector with the numbers 0, 1, 2 and 3 in some order.
	// Many values of c will never occur, since e.g. x>y>z>w makes x<z, y<w and x<w
	// impossible. Only the 24 indices which have non-zero entries make any sense.
	// We use a thresholding to set the coordinates in turn from the largest magnitude.
	// Rank 3 denotes the largest coordinate.
	i1 = rankx >= 3 ? 1 : 0;
	j1 = ranky >= 3 ? 1 : 0;
	k1 = rankz >= 3 ? 1 : 0;
	l1 = rankw >= 3 ? 1 : 0;
	// Rank 2 denotes the second largest coordinate.
	i2 = rankx >= 2 ? 1 : 0;
	j2 = ranky >= 2 ? 1 : 0;
	k2 = rankz >= 2 ? 1 : 0;
	l2 = rankw >= 2 ? 1 : 0;
	// Rank 1 denotes the second smallest coordinate.
	i3 = rankx >= 1 ? 1 : 0;
	j3 = ranky >= 1 ? 1 : 0;
	k3 = rankz >= 1 ? 1 : 0;
	l3 = rankw >= 1 ? 1 : 0;
	// The fifth corner has all coordinate offsets = 1, so no need to compute that.
	double x1 = x0 - i1 + G4; // Offsets for second corner in (x,y,z,w) coords
	double y1 = y0 - j1 + G4;
	double z1 = z0 - k1 + G4;
	double w1 = w0 - l1 + G4;
	double x2 = x0 - i2 + 2.0*G4; // Offsets for third corner in (x,y,z,w) coords
	double y2 = y0 - j2 + 2.0*G4;
	double z2 = z0 - k2 + 2.0*G4;
	double w2 = w0 - l2 + 2.0*G4;
	double x3 = x0 - i3 + 3.0*G4; // Offsets for fourth corner in (x,y,z,w) coords
	double y3 = y0 - j3 + 3.0*G4;
	double z3 = z0 - k3 + 3.0*G4;
	double w3 = w0 - l3 + 3.0*G4;
	double x4 = x0 - 1.0 + 4.0*G4; // Offsets for last corner in (x,y,z,w) coords
	double y4 = y0 - 1.0 + 4.0*G4;
	double z4 = z0 - 1.0 + 4.0*G4;
	double w4 = w0 - 1.0 + 4.0*G4;
	// Work out the hashed gradient indices of the five simplex corners
	int ii = i & 255;
	int jj = j & 255;
	int kk = k & 255;
	int ll = l & 255;
	int gi0 = perm[ii+perm[jj+perm[kk+perm[ll]]]] % 32;
	int gi1 = perm[ii+i1+perm[jj+j1+perm[kk+k1+perm[ll+l1]]]] % 32;
	int gi2 = perm[ii+i2+perm[jj+j2+perm[kk+k2+perm[ll+l2]]]] % 32;
	int gi3 = perm[ii+i3+perm[jj+j3+perm[kk+k3+perm[ll+l3]]]] % 32;
	int gi4 = perm[ii+1+perm[jj+1+perm[kk+1+perm[ll+1]]]] % 32;
	// Calculate the contribution from the five corners
	double t0 = 0.6 - x0x0 - y0y0 - z0z0 - w0w0;
	if(t0<0) n0 = 0.0;
	else {
	t0 *= t0;
	n0 = t0 * t0 * dot(grad4[gi0], x0, y0, z0, w0);
	}
	double t1 = 0.6 - x1x1 - y1y1 - z1z1 - w1w1;
	if(t1<0) n1 = 0.0;
	else {
	t1 *= t1;
	n1 = t1 * t1 * dot(grad4[gi1], x1, y1, z1, w1);
	}
	double t2 = 0.6 - x2x2 - y2y2 - z2z2 - w2w2;
	if(t2<0) n2 = 0.0;
	else {
	t2 *= t2;
	n2 = t2 * t2 * dot(grad4[gi2], x2, y2, z2, w2);
	}
	double t3 = 0.6 - x3x3 - y3y3 - z3z3 - w3w3;
	if(t3<0) n3 = 0.0;
	else {
	t3 *= t3;
	n3 = t3 * t3 * dot(grad4[gi3], x3, y3, z3, w3);
	}
	double t4 = 0.6 - x4x4 - y4y4 - z4z4 - w4w4;
	if(t4<0) n4 = 0.0;
	else {
	t4 *= t4;
	n4 = t4 * t4 * dot(grad4[gi4], x4, y4, z4, w4);
	}
	// Sum up and scale the result to cover the range [-1,1]
	return 27.0 * (n0 + n1 + n2 + n3 + n4);
	}

	// Inner class to speed upp gradient computations
	// (array access is a lot slower than member access)
	private static class Grad {
	double x, y, z, w;

	this(double x, double y, double z) {
	this.x = x;
	this.y = y;
	this.z = z;
	}

	this(double x, double y, double z, double w) {
	this.x = x;
	this.y = y;
	this.z = z;
	this.w = w;
	}
	}
	}