programming-examples/java/Computational_Geometry_Problems/Java Program to Construct K-D Tree for 2 Dimensional Data (assume static data).java

/*This is a Java Program to implement 2D KD Tree and print the various traversals. In computer science, a k-d tree (short for k-dimensional tree) is a space-partitioning data structure for organizing points in a k-dimensional space. k-d trees are a useful data structure for several applications, such as searches involving a multidimensional search key (e.g. range searches and nearest neighbor searches). k-d trees are a special case of binary space partitioning trees.*/

//This is a java program to construct a KD tree for two dimensional static data
import java.io.IOException;

class KD2DNode
{
    int axis;
    double[] x;
    int id;
    boolean checked;
    boolean orientation;

    KD2DNode Parent;
    KD2DNode Left;
    KD2DNode Right;

    public KD2DNode(double[] x0, int axis0)
    {
        x = new double[2];
        axis = axis0;
        for (int k = 0; k < 2; k++)
            x[k] = x0[k];
        Left = Right = Parent = null;
        checked = false;
        id = 0;
    }

    public KD2DNode FindParent(double[] x0)
    {
        KD2DNode parent = null;
        KD2DNode next = this;
        int split;
        while (next != null)
            {
                split = next.axis;
                parent = next;
                if (x0[split] > next.x[split])
                    next = next.Right;
                else
                    next = next.Left;
            }
        return parent;
    }

    public KD2DNode Insert(double[] p)
    {
        x = new double[2];
        KD2DNode parent = FindParent(p);
        if (equal(p, parent.x, 2) == true)
            return null;
        KD2DNode newNode = new KD2DNode(p,
                                        parent.axis + 1 < 2 ? parent.axis + 1 : 0);
        newNode.Parent = parent;
        if (p[parent.axis] > parent.x[parent.axis])
            {
                parent.Right = newNode;
                newNode.orientation = true; //
            }
        else
            {
                parent.Left = newNode;
                newNode.orientation = false; //
            }
        return newNode;
    }

    boolean equal(double[] x1, double[] x2, int dim)
    {
        for (int k = 0; k < dim; k++)
            {
                if (x1[k] != x2[k])
                    return false;
            }
        return true;
    }

    double distance2(double[] x1, double[] x2, int dim)
    {
        double S = 0;
        for (int k = 0; k < dim; k++)
            S += (x1[k] - x2[k]) * (x1[k] - x2[k]);
        return S;
    }
}

class KD2DTree
{
    KD2DNode Root;

    int TimeStart, TimeFinish;
    int CounterFreq;

    double d_min;
    KD2DNode nearest_neighbour;

    int KD_id;

    int nList;

    KD2DNode CheckedNodes[];
    int checked_nodes;
    KD2DNode List[];

    double x_min[], x_max[];
    boolean max_boundary[], min_boundary[];
    int n_boundary;

    public KD2DTree(int i)
    {
        Root = null;
        KD_id = 1;
        nList = 0;
        List = new KD2DNode[i];
        CheckedNodes = new KD2DNode[i];
        max_boundary = new boolean[2];
        min_boundary = new boolean[2];
        x_min = new double[2];
        x_max = new double[2];
    }

    public boolean add(double[] x)
    {
        if (nList >= 2000000 - 1)
            return false; // can't add more points
        if (Root == null)
            {
                Root = new KD2DNode(x, 0);
                Root.id = KD_id++;
                List[nList++] = Root;
            }
        else
            {
                KD2DNode pNode;
                if ((pNode = Root.Insert(x)) != null)
                    {
                        pNode.id = KD_id++;
                        List[nList++] = pNode;
                    }
            }
        return true;
    }

    public KD2DNode find_nearest(double[] x)
    {
        if (Root == null)
            return null;
        checked_nodes = 0;
        KD2DNode parent = Root.FindParent(x);
        nearest_neighbour = parent;
        d_min = Root.distance2(x, parent.x, 2);
        ;
        if (parent.equal(x, parent.x, 2) == true)
            return nearest_neighbour;
        search_parent(parent, x);
        uncheck();
        return nearest_neighbour;
    }

    public void check_subtree(KD2DNode node, double[] x)
    {
        if ((node == null) || node.checked)
            return;
        CheckedNodes[checked_nodes++] = node;
        node.checked = true;
        set_bounding_cube(node, x);
        int dim = node.axis;
        double d = node.x[dim] - x[dim];
        if (d * d > d_min)
            {
                if (node.x[dim] > x[dim])
                    check_subtree(node.Left, x);
                else
                    check_subtree(node.Right, x);
            }
        else
            {
                check_subtree(node.Left, x);
                check_subtree(node.Right, x);
            }
    }

    public void set_bounding_cube(KD2DNode node, double[] x)
    {
        if (node == null)
            return;
        int d = 0;
        double dx;
        for (int k = 0; k < 2; k++)
            {
                dx = node.x[k] - x[k];
                if (dx > 0)
                    {
                        dx *= dx;
                        if (!max_boundary[k])
                            {
                                if (dx > x_max[k])
                                    x_max[k] = dx;
                                if (x_max[k] > d_min)
                                    {
                                        max_boundary[k] = true;
                                        n_boundary++;
                                    }
                            }
                    }
                else
                    {
                        dx *= dx;
                        if (!min_boundary[k])
                            {
                                if (dx > x_min[k])
                                    x_min[k] = dx;
                                if (x_min[k] > d_min)
                                    {
                                        min_boundary[k] = true;
                                        n_boundary++;
                                    }
                            }
                    }
                d += dx;
                if (d > d_min)
                    return;
            }
        if (d < d_min)
            {
                d_min = d;
                nearest_neighbour = node;
            }
    }

    public KD2DNode search_parent(KD2DNode parent, double[] x)
    {
        for (int k = 0; k < 2; k++)
            {
                x_min[k] = x_max[k] = 0;
                max_boundary[k] = min_boundary[k] = false; //
            }
        n_boundary = 0;
        KD2DNode search_root = parent;
        while (parent != null && (n_boundary != 2 * 2))
            {
                check_subtree(parent, x);
                search_root = parent;
                parent = parent.Parent;
            }
        return search_root;
    }

    public void uncheck()
    {
        for (int n = 0; n < checked_nodes; n++)
            CheckedNodes[n].checked = false;
    }

    public void inorder()
    {
        inorder(Root);
    }

    private void inorder(KD2DNode root)
    {
        if (root != null)
            {
                inorder(root.Left);
                System.out.print("(" + root.x[0] + ", " + root.x[1] + ")  ");
                inorder(root.Right);
            }
    }

    public void preorder()
    {
        preorder(Root);
    }

    private void preorder(KD2DNode root)
    {
        if (root != null)
            {
                System.out.print("(" + root.x[0] + ", " + root.x[1] + ")  ");
                inorder(root.Left);
                inorder(root.Right);
            }
    }

    public void postorder()
    {
        postorder(Root);
    }

    private void postorder(KD2DNode root)
    {
        if (root != null)
            {
                inorder(root.Left);
                inorder(root.Right);
                System.out.print("(" + root.x[0] + ", " + root.x[1] + ")  ");
            }
    }
}

public class KDTree_TwoD_Data
{
    public static void main(String args[]) throws IOException
    {
        int numpoints = 5;
        KD2DTree kdt = new KD2DTree(numpoints);
        double x[] = new double[2];
        x[0] = 0.0;
        x[1] = 0.0;
        kdt.add(x);
        x[0] = 3.3;
        x[1] = 1.5;
        kdt.add(x);
        x[0] = 4.7;
        x[1] = 11.1;
        kdt.add(x);
        x[0] = 5.0;
        x[1] = 12.3;
        kdt.add(x);
        x[0] = 5.1;
        x[1] = 1.2;
        kdt.add(x);
        System.out.println("Inorder of 2D Kd tree: ");
        kdt.inorder();
        System.out.println("\nPreorder of 2D Kd tree: ");
        kdt.preorder();
        System.out.println("\nPostorder of 2D Kd tree: ");
        kdt.postorder();
    }
}

/*

Inorder of 2D Kd tree:
(0.0, 0.0)  (5.1, 1.2)  (3.3, 1.5)  (4.7, 11.1)  (5.0, 12.3)
Preorder of 2D Kd tree:
(0.0, 0.0)  (5.1, 1.2)  (3.3, 1.5)  (4.7, 11.1)  (5.0, 12.3)
Postorder of 2D Kd tree:
(5.1, 1.2)  (3.3, 1.5)  (4.7, 11.1)  (5.0, 12.3)  (0.0, 0.0)
Initial commit 2019-11-15 12:59:38 +01:00			`/This is a Java Program to implement 2D KD Tree and print the various traversals. In computer science, a k-d tree (short for k-dimensional tree) is a space-partitioning data structure for organizing points in a k-dimensional space. k-d trees are a useful data structure for several applications, such as searches involving a multidimensional search key (e.g. range searches and nearest neighbor searches). k-d trees are a special case of binary space partitioning trees./`

			`//This is a java program to construct a KD tree for two dimensional static data`
			`import java.io.IOException;`

			`class KD2DNode`
			`{`
			`int axis;`
			`double[] x;`
			`int id;`
			`boolean checked;`
			`boolean orientation;`

			`KD2DNode Parent;`
			`KD2DNode Left;`
			`KD2DNode Right;`

			`public KD2DNode(double[] x0, int axis0)`
			`{`
			`x = new double[2];`
			`axis = axis0;`
			`for (int k = 0; k < 2; k++)`
			`x[k] = x0[k];`
			`Left = Right = Parent = null;`
			`checked = false;`
			`id = 0;`
			`}`

			`public KD2DNode FindParent(double[] x0)`
			`{`
			`KD2DNode parent = null;`
			`KD2DNode next = this;`
			`int split;`
			`while (next != null)`
			`{`
			`split = next.axis;`
			`parent = next;`
			`if (x0[split] > next.x[split])`
			`next = next.Right;`
			`else`
			`next = next.Left;`
			`}`
			`return parent;`
			`}`

			`public KD2DNode Insert(double[] p)`
			`{`
			`x = new double[2];`
			`KD2DNode parent = FindParent(p);`
			`if (equal(p, parent.x, 2) == true)`
			`return null;`
			`KD2DNode newNode = new KD2DNode(p,`
			`parent.axis + 1 < 2 ? parent.axis + 1 : 0);`
			`newNode.Parent = parent;`
			`if (p[parent.axis] > parent.x[parent.axis])`
			`{`
			`parent.Right = newNode;`
			`newNode.orientation = true; //`
			`}`
			`else`
			`{`
			`parent.Left = newNode;`
			`newNode.orientation = false; //`
			`}`
			`return newNode;`
			`}`

			`boolean equal(double[] x1, double[] x2, int dim)`
			`{`
			`for (int k = 0; k < dim; k++)`
			`{`
			`if (x1[k] != x2[k])`
			`return false;`
			`}`
			`return true;`
			`}`

			`double distance2(double[] x1, double[] x2, int dim)`
			`{`
			`double S = 0;`
			`for (int k = 0; k < dim; k++)`
			`S += (x1[k] - x2[k]) * (x1[k] - x2[k]);`
			`return S;`
			`}`
			`}`

			`class KD2DTree`
			`{`
			`KD2DNode Root;`

			`int TimeStart, TimeFinish;`
			`int CounterFreq;`

			`double d_min;`
			`KD2DNode nearest_neighbour;`

			`int KD_id;`

			`int nList;`

			`KD2DNode CheckedNodes[];`
			`int checked_nodes;`
			`KD2DNode List[];`

			`double x_min[], x_max[];`
			`boolean max_boundary[], min_boundary[];`
			`int n_boundary;`

			`public KD2DTree(int i)`
			`{`
			`Root = null;`
			`KD_id = 1;`
			`nList = 0;`
			`List = new KD2DNode[i];`
			`CheckedNodes = new KD2DNode[i];`
			`max_boundary = new boolean[2];`
			`min_boundary = new boolean[2];`
			`x_min = new double[2];`
			`x_max = new double[2];`
			`}`

			`public boolean add(double[] x)`
			`{`
			`if (nList >= 2000000 - 1)`
			`return false; // can't add more points`
			`if (Root == null)`
			`{`
			`Root = new KD2DNode(x, 0);`
			`Root.id = KD_id++;`
			`List[nList++] = Root;`
			`}`
			`else`
			`{`
			`KD2DNode pNode;`
			`if ((pNode = Root.Insert(x)) != null)`
			`{`
			`pNode.id = KD_id++;`
			`List[nList++] = pNode;`
			`}`
			`}`
			`return true;`
			`}`

			`public KD2DNode find_nearest(double[] x)`
			`{`
			`if (Root == null)`
			`return null;`
			`checked_nodes = 0;`
			`KD2DNode parent = Root.FindParent(x);`
			`nearest_neighbour = parent;`
			`d_min = Root.distance2(x, parent.x, 2);`
			`;`
			`if (parent.equal(x, parent.x, 2) == true)`
			`return nearest_neighbour;`
			`search_parent(parent, x);`
			`uncheck();`
			`return nearest_neighbour;`
			`}`

			`public void check_subtree(KD2DNode node, double[] x)`
			`{`
			`if ((node == null) \|\| node.checked)`
			`return;`
			`CheckedNodes[checked_nodes++] = node;`
			`node.checked = true;`
			`set_bounding_cube(node, x);`
			`int dim = node.axis;`
			`double d = node.x[dim] - x[dim];`
			`if (d * d > d_min)`
			`{`
			`if (node.x[dim] > x[dim])`
			`check_subtree(node.Left, x);`
			`else`
			`check_subtree(node.Right, x);`
			`}`
			`else`
			`{`
			`check_subtree(node.Left, x);`
			`check_subtree(node.Right, x);`
			`}`
			`}`

			`public void set_bounding_cube(KD2DNode node, double[] x)`
			`{`
			`if (node == null)`
			`return;`
			`int d = 0;`
			`double dx;`
			`for (int k = 0; k < 2; k++)`
			`{`
			`dx = node.x[k] - x[k];`
			`if (dx > 0)`
			`{`
			`dx *= dx;`
			`if (!max_boundary[k])`
			`{`
			`if (dx > x_max[k])`
			`x_max[k] = dx;`
			`if (x_max[k] > d_min)`
			`{`
			`max_boundary[k] = true;`
			`n_boundary++;`
			`}`
			`}`
			`}`
			`else`
			`{`
			`dx *= dx;`
			`if (!min_boundary[k])`
			`{`
			`if (dx > x_min[k])`
			`x_min[k] = dx;`
			`if (x_min[k] > d_min)`
			`{`
			`min_boundary[k] = true;`
			`n_boundary++;`
			`}`
			`}`
			`}`
			`d += dx;`
			`if (d > d_min)`
			`return;`
			`}`
			`if (d < d_min)`
			`{`
			`d_min = d;`
			`nearest_neighbour = node;`
			`}`
			`}`

			`public KD2DNode search_parent(KD2DNode parent, double[] x)`
			`{`
			`for (int k = 0; k < 2; k++)`
			`{`
			`x_min[k] = x_max[k] = 0;`
			`max_boundary[k] = min_boundary[k] = false; //`
			`}`
			`n_boundary = 0;`
			`KD2DNode search_root = parent;`
			`while (parent != null && (n_boundary != 2 * 2))`
			`{`
			`check_subtree(parent, x);`
			`search_root = parent;`
			`parent = parent.Parent;`
			`}`
			`return search_root;`
			`}`

			`public void uncheck()`
			`{`
			`for (int n = 0; n < checked_nodes; n++)`
			`CheckedNodes[n].checked = false;`
			`}`

			`public void inorder()`
			`{`
			`inorder(Root);`
			`}`

			`private void inorder(KD2DNode root)`
			`{`
			`if (root != null)`
			`{`
			`inorder(root.Left);`
			`System.out.print("(" + root.x[0] + ", " + root.x[1] + ") ");`
			`inorder(root.Right);`
			`}`
			`}`

			`public void preorder()`
			`{`
			`preorder(Root);`
			`}`

			`private void preorder(KD2DNode root)`
			`{`
			`if (root != null)`
			`{`
			`System.out.print("(" + root.x[0] + ", " + root.x[1] + ") ");`
			`inorder(root.Left);`
			`inorder(root.Right);`
			`}`
			`}`

			`public void postorder()`
			`{`
			`postorder(Root);`
			`}`

			`private void postorder(KD2DNode root)`
			`{`
			`if (root != null)`
			`{`
			`inorder(root.Left);`
			`inorder(root.Right);`
			`System.out.print("(" + root.x[0] + ", " + root.x[1] + ") ");`
			`}`
			`}`
			`}`

			`public class KDTree_TwoD_Data`
			`{`
			`public static void main(String args[]) throws IOException`
			`{`
			`int numpoints = 5;`
			`KD2DTree kdt = new KD2DTree(numpoints);`
			`double x[] = new double[2];`
			`x[0] = 0.0;`
			`x[1] = 0.0;`
			`kdt.add(x);`
			`x[0] = 3.3;`
			`x[1] = 1.5;`
			`kdt.add(x);`
			`x[0] = 4.7;`
			`x[1] = 11.1;`
			`kdt.add(x);`
			`x[0] = 5.0;`
			`x[1] = 12.3;`
			`kdt.add(x);`
			`x[0] = 5.1;`
			`x[1] = 1.2;`
			`kdt.add(x);`
			`System.out.println("Inorder of 2D Kd tree: ");`
			`kdt.inorder();`
			`System.out.println("\nPreorder of 2D Kd tree: ");`
			`kdt.preorder();`
			`System.out.println("\nPostorder of 2D Kd tree: ");`
			`kdt.postorder();`
			`}`
			`}`

			`/*`

			`Inorder of 2D Kd tree:`
			`(0.0, 0.0) (5.1, 1.2) (3.3, 1.5) (4.7, 11.1) (5.0, 12.3)`
			`Preorder of 2D Kd tree:`
			`(0.0, 0.0) (5.1, 1.2) (3.3, 1.5) (4.7, 11.1) (5.0, 12.3)`
			`Postorder of 2D Kd tree:`
			`(5.1, 1.2) (3.3, 1.5) (4.7, 11.1) (5.0, 12.3) (0.0, 0.0)`