Assignment 2: Ordered Word Ladders
An ordered word ladder ('owl') is an alphabetically-ordered sequence of words where each word in the sequence differs from its predecessor by one action:
changing one letter, e.g. barn→born
adding or removing one letter, e.g. band→brand and bran→ran
The following are examples of word ladders of different length:
ban→bar→boar→boat→goat, length 5
an→can→cane→dane→date→mate→mite→site→size, length 9
Phase 1
At the heart of the assignment is a function that compares 2 arbitrary null-terminated strings and returns true if the strings satisfy one of the 2 conditions above, and false otherwise. This function has signature:
1 bool differByOne(char *, char *)
Write such a function and of course test it.
Phase 2
Generate a graph that represents all the words in the input that differ by one. Each word is represented by a vertex in the graph, and vertices are adjacent if the corresponding words differ by one. For example, if a dictionary consists of the 7 words an ban bean ben hen mean men then the graph that represents all ordered word ladders would be drawn as:
0
|
1
/ \
2 --- 3
| / \
5 6---4where the vertices 0..6 represent the 7 words in the given order. There are lots of ordered word ladders in this graph: for example, 0→1→2→5 representing an→ban→bean→mean. Any path between any two vertices in the graph is an owl, but notice that, although the edges are undirected, you can select vertices only in ascending order (hence the term 'ordered' in 'owl'). There is only one ladder of length 6 for this dictionary, and that is 0→1→2→3→4→6, and that is the maximum length of any owl.
In this phase of the assignment you are asked to create a graph for a dictionary, and simply print the graph.
Input The words in the dictionary should be read from stdin. There will be whitespace between the words (i.e. spaces, tabs, newlines). You may assume that the words are in lower-case letters (so there are no capital letters, punctuation, hyphens ...) You may assume also the words are sorted in dictionary order. For example, an input file could consist of:
an ban bean ben hen mean men
You should use the Graph ADT from lectures to build your graph (I will be using the Adjacency Matrix version), and you are welcome to use any part of the readGraph.c program from lectures as well. You do not have to check the input for correctness (that is not what this assignment is about), so your program does not be have to handle 'bad' input (except for handling whitespace).
Output Print the dictionary and the resulting graph (using showGraph() from the ADT). For the example above, the output of your program should look like:
Dictionary 0: an 1: ban 2: bean 3: ben 4: hen 5: mean 6: men Ordered Word Ladder Graph V=7, E=9 <0 1> <1 0> <1 2> <1 3> <2 1> <2 3> <2 5> <3 1> <3 2> <3 4> <3 6> <4 3> <4 6> <5 2> <5 6> <6 3> <6 4> <6 5>
Phase 3
In this phase you must find the length of the longest owl in the graph, corresponding to the longest path.
You should first concentrate on dictionaries that have a single longest owl, as in the dictionary above. When you have determined the longest owl, print its length and the corresponding path as follows:
Maximum ladder length: 6 Maximal ladders: 1: an -> ban -> bean -> ben -> hen -> men
This output appears directly after the output above of course. Note that in general the longest path may start at any vertex in the graph.
When you have achieved the above, address the problem of finding and printing all the paths that have the longest length.
To test your program, you should use quite small dictionaries until you have it working. Here are two slightly larger examples of input and output for reference:
Assignment2Ex1|Example 1, 1 longest ladder
Assignment2Ex2|Example 2, 24 longest ladders