CS 2210a Data Structures and Algorithms Assignment 4 Representing Figures with Binary Search Trees

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Overview
In this assignment you will write code for manipulating graphical figures, or simply figures, where a graphical
figure is just a set of pixels forming an image. We are interested in displaying the figures and moving them
around, detecting collisions when they occur.
The program that displays the figures will receive as input a file containing a list of names of image files,
each corresponding to a figure. The figures will be rendered on a window and the user will move some them
around using the keyboard. Figures cannot overlap, so your program will allow a figure to move only when
its movement would not cause it to overlap with other figures or with the borders of the window. For this
assignment, there will be four kinds of figures:
• fixed figures, which cannot move
• figures that can be moved by the user
• figures that are moved by the computer
• target figures, that disappear when the user-controlled figures run into them.
These figures will be part of a “pac-man”-like game. Figures moved by the computer will chase the
user controlled ones. These latter in turn will try to get rid of the target figures. Fixed figures constrain the
movement of the mobile ones.
We will provide code for reading the input file, for displaying the figures and for reading the user input.
You will have to write code for storing the figures and for detecting overlaps between them.
2 The Figures
As stated above, each figure consists of a set of pixels. Each pixel is defined by 3 values x, y, and c; (x, y)
are the coordinates of the pixel and c is its color. We will think that each figure f is enclosed in a rectangle rf
(so all the pixels are inside this rectangle and no smaller rectangle contains all the pixels; see Figure 1 below).
The width and height of this rectangle are the width and height of the figure. To determine the position where
a figure should be displayed, we need to give the coordinates (ux, uy) of the upper-left corner of its enclosing
rectangle; (ux, uy) is called the offset of the figure.
For specifying coordinates, we assume that the upper-left corner of the window ω where the figures are
displayed has coordinates (0, 0). The coordinates of the lower-right corner of ω are (W, H), where W is the
width and H is the height of ω.
Each figure will have an identifier; this is just an integer number that is used to distinguish a figure from
another, as two figures might be identical (but they cannot be in the same position).
The pixels of a figure f will be stored in a binary search tree. Each node in the tree stores a data item of the
form (location,color) representing one pixel, where location = (x, y) contains the coordinates of the
pixel relative to the upper-left corner of the rectangle rf enclosing the figure. For example, the coordinates
of the black dot in Figure 1 below are (20, 10), so this black dot corresponds to the pixel ((20, 10),black).
As shown in Figure 1, the offset of figure f1 is (40, 25), so when rendering f1 inside the window ω the actual
position of the black dot is (20 + 40, 10 + 25) = (60, 35).
x
y
W
H
ω
height
width
10
40
25
20 f
1
Figure
Enclosing rectangle r f
Figure 1 Window ω.
Note that by storing the pixels in the binary search tree with coordinates relative to the figure’s enclosing
rectangle, the data stored in the tree does not need to change when the figure moves: The only thing that needs
to change is the offset of the figure.
For each data item (location,color) stored in the tree, the attribute location is used as the key. To
compare two locations (x, y) and (x

, y′
) we use column order. In column order, (x, y) < (x

, y′
) if either
• x < x′
, or
• x = x

and y < y′
So, for example, (1, 4) < (2, 3) and (5, 3) < (5, 7). 3 Moving Figures As stated above, two figures cannot overlap and a figure cannot go outside the window ω. Hence, when the user tries to move a figure, we need to verify that such a movement would not cause it to cross the boundaries of the window or to overlap another figure. A movement can be represented as a pair (dx, dy), where dx is the distance to move horizontally and dy is the distance to move vertically. To check whether a movement (dx, dy) on figure f with offset (xf , yf ), width wf and height hf is valid, we first update the offset of f to (xf + dx, yf + dy) and then check whether this new position for f would cause an overlap with another figure or with the window’s borders. To do this efficiently we proceed as follows: • Check whether the enclosing rectangle rf of f crosses the borders of the window ω. For example, to check whether rf crosses the right border of ω we test if xf + dx + wf ≥ W; recall that W is the width of ω. • If rf does not cross the borders of ω, then we check whether rf intersects the enclosing rectangle rf ′ of another figure f ′ . If there is no such intersection then f does not intersect other figures or the window’s borders, so the movement (dx, dy) is valid. 2 • On the other hand, if rf intersects the enclosing rectangles of some set S of figures, then for each figure f ′ ∈ S we check whether f and f ′ overlap and if so, then this movement should not be allowed. Note that for f and f ′ to overlap, f must have at least one pixel ((x, y), c) and f ′ must have a pixel ((x ′ , y′ ), c′ ) that would be displayed at precisely the same position on ω, or in other words, x + xf = x ′ + xf ′ and y + yf = y ′ + yf ′, where (xf ′, yf ′) is the offset of f ′ . Observe that if these pixels exist then x + xf − xf ′ = x ′ and y + yf − yf ′ = y ′ . Therefore, to test whether f and f ′ overlap we can use the following algorithm: For each data item ((x, y), c) stored in the binary search tree tf storing the pixels of f do (1) if in the tree tf ′ storing the pixels of f ′ there is a data item ((x ′ , y′ ), c′ ) with key (x ′ , y′ ) = (x + xf − xf ′, y + yf − yf ′), then the figures overlap. if Condition (1) is never satisfied, then the figures do not overlap. In the for loop above, to consider all the data items ((x, y), c) stored in the nodes of the tree tf we can use the binary search tree operations smallest() and successor(). 4 Classes to Implement You need to implement the following Java classes: Location, Pixel, BinarySearchTree, BinaryNode, GraphicalFigure, DuplicatedKeyException, InexistentKeyException, and EmptyTreeException. You can implement more classes if you need to. You must write all the code yourself. You cannot use code from the textbook, the Internet, or any other sources: however, you may implement the algorithms discussed in class. 4.1 Location This class represents the position (x, y) of a pixel. For this class you must implement all and only the following public methods: • public Location(int x, int y): A constructor that initializes this Location object with the specified coordinates. • public int xCoord(): Returns the x coordinate of this Location. • public int yCoord(): Returns the y coordinate of this Location. • public int compareTo (Location p): Compares this Location with p using column order (defined above): – if this > p return 1;
– if this = p return 0;
– if this < p return -1.
You can implement any other methods that you want to in this class, but they must be declared as private
methods (i.e. not accessible to other classes).
4.2 Pixel
This class represents the data items to be stored in the binary search tree. Each data item consists of two parts:
a Location and an int color. For this class you must implement all and only the following public methods:
• public Pixel(Location p, int color): A constructor which initializes the new Pixel with the
specified coordinates and color. Location p is the key for the Pixel.
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• public Location getLocation(): Returns the Location of the Pixel.
• public int getColor(): Returns the color of the Pixel.
You can implement any other methods that you want to in this class, but they must be declared as private
methods.
4.3 BinaryNode
This class represents the nodes of the binary search tree. Each node will store an object of the class Pixel
and it will have references to its left child, its right child, and its parent. For this class you must implement all
and only the following public methods:
• public BinaryNode (Pixel value, BinaryNode left, BinaryNode right, BinaryNode parent):
A constructor for the class. Stores the Pixel in the node and sets left child, right child, and parent to
the specified values.
• public BinaryNode (): A constructor for the class that initializes a leaf node. The data, children
and parent are set to null.
• public BinaryNode getParent(): Returns the parent of this node.
• public void setParent(BinaryNode parent): Sets the parent of this node to the specified
value.
• public void setLeft (BinaryNode p): Sets the left child of this node to the specified value.
• public void setRight (BinaryNode p): Sets the right child of this node to the specified value.
• public void setData (Pixel value): Stores the given Pixel in this node.
• public boolean isLeaf(): Returns true if this node is a leaf; returns false otherwise.
• public Pixel getData (): Returns the Pixel object stored in this node.
• public BinaryNode getLeft(): Returns the left child of this node.
• public BinaryNode getRight(): Returns the right child of this node.
You can implement any other methods that you want to in this class, but they must be declared as private
methods.
4.4 BinarySearchTree
This class implements an ordered dictionary using a binary search tree. Each node of the tree will store a
Pixel object; the attribute Location of the Pixel will be its key. In your binary search tree only the
internal nodes will store information. The leaves are nodes (leaves are not null) that do not store
any data.
The constructor for the BinarySearchTree class must be of the form
public BinarySearchTree()
This will create a tree whose root is a leaf node. Besides the constructor, the only other public methods in
this class are specified in the BinarySearchTreeADT interface and described below. In all these methods,
parameter r is the root of the tree.
• public Pixel get (BinaryNode r, Location key): Returns the Pixel storing the given key, if
the key is stored in the tree; returns null otherwise.
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• public void put (BinaryNode r, Pixel data) throws DuplicatedKeyException: Inserts
the given data in the tree if no data item with the same key is already there. If a node already stores the
same key, the algorithm throws a DuplicatedKeyException.
• public void remove (BinaryNode r, Location key) throws InexistentKeyException:
Removes the data item with the given key, if the key is stored in the tree; throws an InexistentKeyException otherwise.
• public Pixel successor (BinaryNode r, Location key): Returns the Pixel with the smallest
key larger than the given one (note that the tree does not need to store a node with the given key).
Returns null if the given key has no successor.
• public Pixel predecessor (BinaryNode r, Location key): Returns the Pixel with the
largest key smaller than the given one (note that the tree does not need to store a node with the given
key). Returns null if the given key has no predecessor.
• public Pixel smallest(BinaryNode r) throws EmptyTreeException: Returns the Pixel
with the smallest key. Throws an EmptyTreeException if the tree does not contain any data.
• public Pixel largest(BinaryNode r) throws EmptyTreeException: Returns the Pixel with
the largest key. Throws an EmptyTreeException if the tree does not contain any data.
• public BinaryNode getRoot(): Returns the root of the binary search tree.
You can download BinarySearchTreeADT.java from the course’s website. To implement this interface,
you need to declare your BinarySearchTree class as follows:
public class BinarySearchTree implements BinarySearchTreeADT
You can implement any other methods that you want to in this class, but they must be declared as private
methods.
4.5 Exception Classes
These are the classes implementing the exceptions thrown by the insert, remove, smallest and largest
methods of BinarySearchTree. See exception classes from last asignment to see how you should implement
these classes.
4.6 GraphicalFigure
The constructor for this class must be of the form
public GraphicalFigure (int id, int width, int height, String type, Location pos);
where id is the identifier of this figure, width and height are the width and height of the enclosing rectangle
for this figure, pos is the offset of the figure and type is its type. The types of the figures are the following:
• ”fixed”: fixed figure
• ”user”: figure moved by the user
• ”computer”: figure moved by the computer
• ”target”: target figure.
Inside the constructor you will create an empty BinarySearchTree where the pixels of the figure will be
stored.
Beside the constructor, the only other public methods in this class are specified in the
GraphicalFigureADT interface:
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• public void setType (String type): Sets the type of this figure to the specified value.
• public int getWidth (): Returns the width of the enclosing rectangle for this figure.
• public int getHeight(): Returns the height of the enclosing rectangle for this figure.
• public String getType (): Returns the type of this figure.
• public int getId(): Returns the id of this figure.
• public Location getOffset(): Returns the offset of this figure.
• public void setOffset(Location value): Changes the offset of this figure to the specified
value
• public void addPixel(Pixel pix) throws DuplicatedKeyException: Inserts pix into the
binary search tree associated with this figure. Throws a DuplicatedKeyException if an error occurs
when inserting the Pixel into the tree.
• public boolean intersects (GraphicalFigure gobj): Returns true if this figure intersects
the one specified in the parameter. It returns false otherwise.
You can download GraphicalFigureADT.java from the course’s website. To implement this interface, you
need to declare your GraphicalFigure class as follows:
public class GraphicalFigure implements GraphicalFigureADT
You can implement any other methods that you want to in this class, but they must be declared as private
methods.
Hint. You might find useful to implement a method, say findPixel(Location p), that returns true if
this figure has a pixel in location p and it returns false otherwise.
5 Classes Provided and Running the Program
The input to the program will be a file containing the descriptions of the figures to be displayed. Each line of
the input file contains 4 values:
x y type file
where (x,y) is the offset of the figure (these two values are integer), type is the type of the figure (this is a
String), and file is the name of an image file in .jpg, .bmp, or any other image format understood by java.
You will be given code for reading the input file.
From the course’s website you can download the following classes: Board.java, Gui.java,
MoveFigure.java, Show.java, BinarySearchTreeADT.java, and GraphicalFigureADT.java. The
main method is in class Show.java. To execute the program, on a command window you will enter the
command
java Show inputFile
where inputFile is the name of the file containing the input for the program.
6 Testing your Program
We will run a test program called TestBST to check that your implementation of the BinarySearchTree
class is as specified above. We will supply you with a copy of TestBST to test your implementation. We will
also run other tests on your software to check whether it works properly.
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7 Coding Style
Your mark will be based partly on your coding style. Among the things that we will check, are
• Variable and method names should be chosen to reflect their purpose in the program.
• Comments, indenting, and white spaces should be used to improve readability.
• No variable declarations should appear outside methods (“instance variables”) unless they contain data
which is to be maintained in the figure from call to call. In other words, variables which are needed
only inside methods, whose values do not have to be remembered until the next method call, should be
declared inside those methods.
• All variables declared outside methods (“instance variables”) should be declared private (not
protected), to maximize information hiding. Any access to the variables should be done with accessor methods (like getLocation() and getColor() for Pixel).
8 Marking
Your mark will be computed as follows.
• Program compiles, produces meaningful output: 2 marks.
• TestBST tests pass: 5 marks.
• GraphicalFigure tests pass: 3 marks
• Coding style: 2 marks.
• BinarySearchTree implementation: 5 marks.
• GraphicalFigure program implementation: 3 marks.
9 Submitting Your Program
You must submit an electronic copy of your program using OWL. Please DO NOT put your files in subdirectories and DO NOT submit a .zip, .tar or any other compressed file with your program. Make it sure
you submit all your .java files not your .class files.
Read the tutorials posted in the course’s website on how to configure Eclipse to read command line
arguments.
When you submit your program, we will receive a copy of it with a datestamp and timestamp. If you
submit your program more than once please send me an email message to let me know. We will take the latest
program submitted as the final version, and will deduct marks accordingly if it is late.
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