Can this be done Recursively?

So me and my friend tried to code this little game when we were children called LOVERS.. Wherein you write down the name of 2 persons,Whole name without the middle name,and count the number of L's,O's,V's,E's,R's,and S's in the name, add it together and put beside the letters.

Sample:
name 1: Hello
name 2: Care

L: 2
O: 1
V: 0
E: 2
R: 1
S: 0

afterwards you will add them in pairs.

Sample:
L: 2 > 3 > 4 > 7 > 15 > 32
O: 1 > 1 > 3 > 8 > 17
V: 0 > 2 > 5 > 9
E: 2 > 3 > 4
R: 1 > 1
S: 0

here's how it goes...first you add the values of the first 2 letters...LO then OV then VE and so on and so forth. until you get one final answer in this case 32....the 32 signifies the percentage in which the 2 people is Compatible with each other.
i know its quite stupid. haha but we just tried to program it for fun. we are 2nd year IT Students here in the philppines. anyway we were wondering if there's a way to do the calculation RECURSIVELY and if there's a way to reduce the number of Arrays used.
Here's our code:

``````import java.util.*;

public class LOVERS {

static Scanner console = new Scanner(System.in);

public static void main(String[] args) {
String name1="";
String name2="";
char love[] = {'L','O','V','E','R','S'};
int[] lovers = new int[6];
int[] temp= new int[6];
int[] temp2= new int[6];
boolean done = true;
while(done){
name1 = getName();
name2 = getName();
temp = getLetterCount(name1);
temp2 = getLetterCount(name2);
lovers = sumOfLetters(temp,temp2,love);
System.out.println("");

int[] firstLayer = new int[5];
int[] secondLayer = new int[4];
int[] thirdLayer = new int[3];
int[] fourthLayer = new int[2];

firstLayer = sums(lovers);
secondLayer = sums(firstLayer);
thirdLayer = sums(secondLayer);
fourthLayer = sums(thirdLayer);
int output = fourthLayer[0]+fourthLayer[1];
if(output>100){
output=100;
}

System.out.println("Result is : "+ output +"%");
System.out.println("Do you want to try again? Y/N :");
char again = ' ';
if(again == 'n')
{
done = false;
}
else done = true;
}

}

public static int[] sums (int[] y){
int[] x = new int[y.length-1];
for(int ctr=1;ctr<y.length;ctr++){
x[ctr-1]=y[ctr-1]+y[ctr];
}
return x;
}

public static String getName(){
String n="";
System.out.println("Enter name: ");
n = console.nextLine();
n = n.toUpperCase();
return n;
}

public static int[] sumOfLetters(int[] temp, int[] temp2, char[] love){
int[] lovers = new int[6];
for(int ctr=0;ctr<6;ctr++){
lovers[ctr]=temp[ctr]+temp2[ctr];
System.out.println(love[ctr]+" - "+lovers[ctr]);
}
return lovers;
}

public static int[] getLetterCount(String n){
int[] temp = new int[6];
for(int x=0;x<n.length();x++){
if(n.charAt(x)=='L'){
temp[0]++;
}
else if(n.charAt(x)=='O'){
temp[1]++;
}
else if(n.charAt(x)=='V'){
temp[2]++;
}
else if(n.charAt(x)=='E'){
temp[3]++;
}
else if(n.charAt(x)=='R'){
temp[4]++;
}
else if(n.charAt(x)=='S'){
temp[5]++;
}
}
return temp;
}
}
``````

as you can see we used 4 arrays for the 4 layers of calculation and we used a looping statement for the calculation.

So can this be done RECURSIVELY? and How can we reduce the number of arrays used?

this can help us greatly in learning how to do proper Recursive functions since we are currently learning Data Structures. hope you guys can help me. thanks

-

Yes, of course you can code it recursively.

First of all, your sum-fn. Instead of going through the string byte for byte, you can pass the string to the same function over and over again, just removing one character each time. That character will be added to your result-number. Your final-check will be that the string is empty, then you return null. Evaluation will go back up the recursion, potentially adding 1 (or 0 otherwise) for each character in the string.

Also, instead of static functions, make it a class in which you can access the attributes.

For the summation of the 6 chars, each level does the same operation on it. So each function call should do that addition and return the result being called in the function again. Your final-check is that only the first integer value positive. If all the other values are 0 the first one holds your sum.

-
hmm...i'll try to edit the code now..and post the revised version....i hope i got your point.....i actually am kinda confused in doing recursive functions yet...anyway thanks for giving hints... – Kevin Jun 12 '11 at 13:45
If you want tips on both, recursion and optimization of your code, why not do 2 questions? That’d be a lot easier for everyone. – Kissaki Jun 12 '11 at 13:47
What? Just create 2 question … – Kissaki Jun 12 '11 at 14:03

Yes, you can do it recursively:

``````public static int L(int i) {
return (i == 0) ? LVAL : L(i - 1) + O(i - 1);
}
public static int O(int i) {
return (i == 0) ? OVAL : O(i - 1) + V(i - 1);
}
public static int V(int i) {
return (i == 0) ? VVAL : V(i - 1) + E(i - 1);
}
public static int E(int i) {
return (i == 0) ? EVAL : E(i - 1) + R(i - 1);
}
public static int R(int i) {
return (i == 0) ? RVAL : R(i - 1) + SVAL;
}
``````

Calling `L(5)` gives you the answer.

-
can you explain this to me? im new to recursion so please bear with me. – Kevin Jun 12 '11 at 13:59
Okay. In recursion, you have a base case and a recursive step. The base case is the tail of the recursion: here, it's the first value of your letters. The recursive step consists of calling itself until reaching the base case (which is 0 here). – patapizza Jun 12 '11 at 14:02

Actually the problem here is one instance of a much more general class of problems/algorithms which are incidentally quite important in some fields nobody would believe from this example ;)

Basically you can regard your triangle above as a matrix. Ie the second number in the L row (the 3) would be (0,1), 3rd value in the E row would be (3,2). If you look at it you see that every value except the start values depend on exactly two other nodes, which makes this a 2-point stencil. There are some extremely intriguing algorithms out there for this kind of problem - eg a cache oblivious, parallel algorithm for higher-order stencils (LBMHD uses 13-points or something).

``````private int[] startVals; // contains start values for all 6 letters.