# Magic Square recursion infinte loop java

I'm trying to write a program that can generate all the possible magic squares for a fixed N Dimension. I'm going about it by filling the diagonal cells with values and then filling in the rows with values.

I seem to be stuck in an infinite cycle when fillin in the rows, but can't seem to figure out how or why. I haven't implemented the sum check, to check whether the sum of the rows or columns is correct, but that is irrelevent here.

If anyone can help me out, i'd very greatful. code bellow

``````public class Magic {

public static final int DIMENSION = 3;
public static final int DIMSQ = DIMENSION * DIMENSION;
public static int[][] array = new int[DIMENSION][DIMENSION];
public static boolean[] boolArray = new boolean[DIMENSION * DIMENSION];
public static final int sum = (DIMENSION * (DIMENSION * DIMENSION + 1)) / 2;

/*
* Inicializaljuk a matrixunkat, illetve a boolean matrixunkat
* Initializes the matrix and boolArray with values.
*/
public static void init() {
for (int e[] : array) {
for (int e2 : e) {
e2 = 0;
}
}
for (boolean e : boolArray) {
e = false;
}
}

/*
* Ki irassa a matrix jelenlegi allapotat konzolra
* Prints the array out to the console.
*/
public static void print() {
for (int i[] : array) {
for (int j : i) {
System.out.print(j + ",");
}
System.out.println();
}
System.out.println();
}

/*
* feltolti a foatlot adatokkal, majd meghivja a diagonal2-t
* fills diagonal cells with values
*/
public static void diagonal1(int x) {

for (int i = 0; i < DIMSQ; i++) {
if (!boolArray[i]) {
boolArray[i] = true;
array[x][x] = i + 1;
if (x < DIMENSION - 1) {
diagonal1(x + 1);
} else
diagonal2(0);
boolArray[i] = false;
}
}

}

/*
* feltolti a mellekatlot adatokkal, majd meghivja a row(0,0,0)-t
* fills diagonal cells with values
*/
public static void diagonal2(int x) {

for (int i = 0; i < DIMSQ; i++) {
if (!boolArray[i]) {

if (array[DIMENSION - 1 - x][x] == 0) {
boolArray[i] = true;
array[DIMENSION - 1 - x][x] = i + 1;
}
if (x < DIMENSION - 1) {
diagonal2(x + 1);
} else
row(0, 0);
boolArray[i] = false;
}
}
}
/*
* fills rows with values
*/
public static void row(int x, int y) {
for (int i = 0; i < DIMSQ; i++) {
if (!boolArray[i]) {

if (array[x][y] == 0) {
boolArray[i] = true;
array[x][y] = i;
}

if (x < DIMENSION - 1) {
row(x + 1, y);
} else if(y < DIMENSION - 1) {
row(0,y+1);
} else print();

boolArray[i] = false;

}
}
}

public static void main(String[] args) {
// TODO Auto-generated method stub
init();
print();
diagonal1(0);

}
``````

}

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Have you debugged it? In which method does it get stuck? –  talnicolas Mar 22 '12 at 15:10
it get's stuck while filling out the rows. I know for sure that the diagonal methods are correct. I've tested them and they worked as imagined. EDIT: to answer, it gets stuck in the row(int x, int y); method. –  Mythril225 Mar 22 '12 at 15:12
Well I'm not sure you're getting off that recursive call `row(x + 1, y);` ever. –  talnicolas Mar 22 '12 at 15:17
No, i cannot find the specific line. –  Mythril225 Mar 22 '12 at 15:21
could you elaborate? why won't it call that particular method? –  Mythril225 Mar 22 '12 at 15:44

My suspect is the `row()` method (see my comments below):

``````public static void row(int x, int y) {
for (int i = 0; i < DIMSQ; i++) {
if (!boolArray[i]) {

if (array[x][y] == 0) {
boolArray[i] = true; // <-- this one
array[x][y] = i;
}

if (x < DIMENSION - 1) {
row(x + 1, y);
} else if(y < DIMENSION - 1) {
row(0,y+1);
} else print();

boolArray[i] = false; // <-- would be OVERWRITTEN by this one

}
}
}
``````
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It's a recursive function, so it has to be overwritten whenever it steps back, because it won't use that values, so it has to free it up. –  Mythril225 Mar 22 '12 at 15:29
@Mythril225: hmm... makes sense –  LeleDumbo Mar 22 '12 at 15:41

I dont think it's infinite, but very long:

9-step loop in `diag1`,
3-deep recrusion to `diag1`,
then 9-step loop in `diag2`
3-deep recursion in `diag2`,
then 9-step loop in `row`
~6-deep recursion in `row`.

Even though not all loops perform complicated operations on each iteration, this can easily add up to hours if you also take into consideration that you print the state of the square at every "resolution" of the square -- printing to console takes time.

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