# [Interview]Similar Words Distance Calculation

This Question was asked in an interview

Assume you have a dictionary of words: (use if you have /usr/share/dict/words).

Given a word(eg: cricket), give me all the words from the dictionary that could be reached by doing n operations. Where an operation is one of :
Replace
Deletion

For example lets find all the words that can be formed from "cricket" if only 1 operation is allowed.

{'word': 'clicket', 'op': ['replace']} {'word': 'crickey', 'op': ['replace']} {'word': 'crickety', 'op': ['addition']} etc

I am printing in my own format, but you get the gist.

Here is what I have attempted

1. based on number of operations compute a list of all possible sequence.
2. then iterate over the list and apply them one by one and store words which are present in dictionary.

This is brute force solution. I am wondering if there is an efficient solution for this. Below is the code for brute force solution

``````import java.io.BufferedReader;
import java.io.FileNotFoundException;
import java.io.IOException;
import java.util.ArrayList;
import java.util.HashMap;
import java.util.Iterator;
import java.util.List;
import java.util.Map;

public class SimilarWordDistance {

Map<String,Boolean> dictionary = new HashMap<String,Boolean>();
int REPLACE = 0;
int DELETION = 1;

/**
* @param args
* @throws IOException
*/
public static void main(String[] args) throws IOException {

SimilarWordDistance swd = new SimilarWordDistance();
//swd.findSimilar("cricket", 1);
swd.findSimilar("happiness", 3);
}

public void findSimilar(String word,int num) {
int possibleOperations = (int) Math.pow(3 , num);
Integer[][] operations = new Integer[possibleOperations][num];
buildOperationsArray(num, possibleOperations, operations);
List<String> l = new ArrayList<String>();
Map<String,Integer[]> sols = new HashMap<String,Integer[]>();

for(int i=0;i<operations.length;i++)
applyOperation(operations[i],l,sols);

Iterator<String> itr = sols.keySet().iterator();
while(itr.hasNext()) {
String n = itr.next();
printSolution(sols.get(n), n);
}
}

private void applyOperation(Integer[] operation,List<String> word,Map<String,Integer[]> sols) {
List<String> possiblities = word;
for(int i=0;i<operation.length;i++) {
List<String> temp = new ArrayList<String>();
for(int j =0;j<possiblities.size();j++) {
//System.out.println(temp.size());
}
possiblities = temp;
}
if(operation[i] == REPLACE) {
List<String> temp = new ArrayList<String>();
for(int j =0;j<possiblities.size();j++) {
//System.out.println(temp.size());
}
possiblities = temp;
}
if(operation[i] == DELETION) {
List<String> temp = new ArrayList<String>();
for(int j =0;j<possiblities.size();j++) {
}
possiblities = temp;
}
}

for(int i=0;i<possiblities.size() ;i++) {
String w = possiblities.get(i);
if(dictionary.containsKey(w)) {
sols.put(w, operation);
}
}

}

protected void printSolution(Integer[] operation, String w) {
System.out.print(w+"\t" );
for(int j=0;j<operation.length;j++) {
System.out.print(printOperation(operation[j])+"\t");
}
System.out.println();
}

private String printOperation(Integer integer) {
} if(integer == REPLACE) {
return "Replace";
} else {
return "Deletion";
}
}

char[] possiblities = {'a','b','c','d','e','f','g','h','i','j','k','l','m','n','o','p','q','r','s','t','u','v','w','y','z'};
List<String> possibleWords = new ArrayList<String>();
for(int i=0;i<possiblities.length;i++) {
for(int j=0;j<word.length();j++) {
String temp = insertAt(word,j,possiblities[i]);
}
}
return possibleWords;
}

private List<String> applyDeletion(String word) {
List<String> possibleWord = new ArrayList<String>();
for(int i=0;i<word.length();i++) {
String prefix = word.substring(0,i);
String suffix = word.substring(i+1,word.length());
String tenp = prefix+suffix;
}
return possibleWord;
}

private List<String> applyReplace(String word) {
char[] possiblities = {'a','b','c','d','e','f','g','h','i','j','k','l','m','n','o','p','q','r','s','t','u','v','w','y','z'};
List<String> possibleWord = new ArrayList<String>();
for(int i=0;i<possiblities.length;i++) {
for(int j=0;j<word.length();j++) {
String temp = word.substring(0,j)+possiblities[i]+word.substring(j+1,word.length());
if(temp.length()!=word.length())
System.out.println("#####################");
}
}
return possibleWord;
}

private String insertAt(String word, int j, char c) {
String prefix = word.substring(0,j);
String suffix = word.substring(j+1,word.length());
String ret = prefix+c+suffix;
return ret;
}

protected void buildOperationsArray(int num, int possibleOperations,
Integer[][] operations) {
for(int i=0;i<possibleOperations;i=i+9){
for(int j=0;j<num;j++) {
fillPossiblities(num, operations, ADDTION, i, j); // 3 rows
if(i+3<possibleOperations)
fillPossiblities(num, operations, REPLACE, i+3, j); // 3 rows
if(i+6 < possibleOperations)
fillPossiblities(num, operations, DELETION, i+6, j);  // 3 rows
}
}
/* System.out.println(operations.length);
for(int i=0;i<operations.length;i++) {
for(int j=0;j<operations[0].length;j++) {
System.out.print(operations[i][j]+"\t");
}
System.out.println();
}*/
}

/**
* Every time this method is called it will fill all the colums of the passed row
* with 1 default value and the fill the next 2 rows with possible permutation of that
* column
* @param num
* @param operations
* @param def
* @param curRow
*/
protected void fillPossiblities(int num, Integer[][] operations,int def,int curRow,int curColumn) {
for(int i=0;i<num;i++) {
operations[curRow][i] = def;
}
for(int i=0;i<num;i++) {
if(i!=curColumn)
operations[curRow+1][i] = def;
}
operations[curRow+1][curColumn] = getNext(def); //
int def1 = getNext(def);
for(int i=0;i<num;i++) {
if(i!=curColumn)
operations[curRow+2][i] = def;
}
operations[curRow+2][curColumn] = getNext(def1);
}

private int getNext(int def) {
if(def == -1) {
return REPLACE;
}
if(def == 0) {
return DELETION;
} else {
}
}

public void readDictionary() throws IOException {

dictionary.put(s, true);
}
in.close();
}

}
``````
-
I haven't looked at your code but your problem sounds like en.wikipedia.org/wiki/Levenshtein_distance – stan0 Nov 11 '13 at 10:48
If by "efficient" you mean polynomial, then don't count on it. If by "efficient" you mean better, start by checking which actions are redundant, for example, deleting + inserting at the same index = replacing. replacing twice the same index = replacing once, and so on... – Ron Teller Nov 11 '13 at 10:48
@stan0 The thing with Levenshtein_distace is you need to compute it for all the words of dictionary. Otherwise I agree that could be used. – abhinav Nov 11 '13 at 11:08
@RonTeller Agree we can do some optimization, but still it is a brute force approach. – abhinav Nov 11 '13 at 11:10
Will dictionary contains only meaningful (normal dictionary) words or any arbitrary word? – doptimusprime Nov 11 '13 at 11:38

``````For each word in the-dictionary
d = minimum-edit-distance (given-word, word)
if d <= n
print (word)
``````

The minimum edit distance can be solved by aa well-known dynamic programming algorithm with complexity `O(n*m)` where `n` and `m` are length of the two words.

The wikipedia article has implementations: http://en.wikipedia.org/wiki/Levenshtein_distance

-
The OP's comments: `@stan0 The thing with Levenshtein_distace is you need to compute it for all the words of dictionary. Otherwise I agree that could be used.` suggests he is looking for a solution more efficient than `O(n|S|)` (where `n` is the number of strings in DB, and `|S|` their average length). The question itself, asks for better than `brute force` - which is basically this solution. – amit Nov 11 '13 at 11:30
@chill if this this is best possible solution, I will accept this and make question as answered. – abhinav Nov 11 '13 at 11:59
@abhinav, well the other thing I can think of is first to compare the lengths of the words and decide if its impossible to get distance less than n, say if one word length is k and the other is k+n+1 or longer. – chill Nov 11 '13 at 12:43

One solution is that you can modify your dictionary data structure and represent it in the form of graph.

Each node of the graph will represent a word. There will be an edge from one node to another if the one word is different from another by a single letter.

In your case, there could be a node between 'cricket' and 'crickets'.

Once the dictionary is loaded into this form, after that to query the words made by such operations would be node directly connected to cricket.

-
This requires saving all strings of all lengths as nodes, and not only the meaningful words, because otherwise you won't be able to move from `apple` to `ale` with 2 steps, unless you also save `aple` – amit Nov 11 '13 at 11:35