Programming Contest Question: Counting Polyominos

Hi,

An example question for a programming contest was to write a program that finds out how much polyominos are possible with a given number of stones.

So for two stones (`n = 2`) there is only one polyominos:

``````XX
``````

You might think this is a second solution:

``````X
X
``````

But it isn't. The polyominos are not unique if you can rotate them.

So, for 4 stones (`n = 4`), there are 7 solutions:

``````X
X   XX   X    X     X   X
X   X    XX   X    XX   XX   XX
X   X    X    XX   X     X   XX
``````

The application has to be able to find the solution for `1 <= n <=10`

PS: Using the list of polyominos on Wikipedia isn't allowed ;)

EDIT: Of course the question is: How to do this in Java, C/C++, C#

I started this project in Java. But then I had to admit I didn't know how to build polyominos using an efficient algorithm.

This is what I had so far:

``````import java.util.ArrayList;
import java.util.List;

public class Main
{

private int countPolyminos(int n)
{
hashes.clear();
count = 0;
boolean[][] matrix = new boolean[n][n];
createPolyominos(matrix, n);
return count;
}

private List<Integer> hashes = new ArrayList<Integer>();
private int count;

private void createPolyominos(boolean[][] matrix, int n)
{
if (n == 0)
{
boolean[][] cropped = cropMatrix(matrix);
int hash = hashMatrixOrientationIndependent(matrix);
if (!hashes.contains(hash))
{
count++;
}
return;
}
// Here is the real trouble!!
// Then here something like; createPolyominos(matrix, n-1);
// But, we need to keep in mind that the polyominos can have ramifications
}

public boolean[][] copy(boolean[][] matrix)
{
boolean[][] b = new boolean[matrix.length][matrix[0].length];
for (int i = 0; i < matrix.length; ++i)
{
System.arraycopy(matrix[i], 0, b, 0, matrix[i].length);
}
return b;
}

public boolean[][] cropMatrix(boolean[][] matrix)
{
int l = 0, t = 0, r = 0, b = 0;
// Left
left: for (int x = 0; x < matrix.length; ++x)
{
for (int y = 0; y < matrix[x].length; ++y)
{
if (matrix[x][y])
{
break left;
}
}
l++;
}
// Right
right: for (int x = matrix.length - 1; x >= 0; --x)
{
for (int y = 0; y < matrix[x].length; ++y)
{
if (matrix[x][y])
{
break right;
}
}
r++;
}
// Top
top: for (int y = 0; y < matrix[0].length; ++y)
{
for (int x = 0; x < matrix.length; ++x)
{
if (matrix[x][y])
{
break top;
}
}
t++;
}
// Bottom
bottom: for (int y = matrix[0].length; y >= 0; --y)
{
for (int x = 0; x < matrix.length; ++x)
{
if (matrix[x][y])
{
break bottom;
}
}
b++;
}

// Perform the real crop
boolean[][] cropped = new boolean[matrix.length - l - r][matrix[0].length - t - b];
for (int x = l; x < matrix.length - r; ++x)
{
System.arraycopy(matrix[x - l], t, cropped, 0, matrix[x].length - t - b);
}
return cropped;
}

public int hashMatrix(boolean[][] matrix)
{
int hash = 0;
for (int x = 0; x < matrix.length; ++x)
{
for (int y = 0; y < matrix[x].length; ++y)
{
hash += matrix[x][y] ? (((x + 7) << 4) * ((y + 3) << 6) * 31) : ((((x+5) << 9) * (((y + x) + 18) << 7) * 53));
}
}
return hash;
}

public int hashMatrixOrientationIndependent(boolean[][] matrix)
{
int hash = 0;
hash += hashMatrix(matrix);
for (int i = 0; i < 3; ++i)
{
matrix = rotateMatrixLeft(matrix);
hash += hashMatrix(matrix);
}
return hash;
}

public boolean[][] rotateMatrixRight(boolean[][] matrix)
{
/* W and H are already swapped */
int w = matrix.length;
int h = matrix[0].length;
boolean[][] ret = new boolean[h][w];
for (int i = 0; i < h; ++i)
{
for (int j = 0; j < w; ++j)
{
ret[i][j] = matrix[w - j - 1][i];
}
}
return ret;
}

public boolean[][] rotateMatrixLeft(boolean[][] matrix)
{
/* W and H are already swapped */
int w = matrix.length;
int h = matrix[0].length;
boolean[][] ret = new boolean[h][w];
for (int i = 0; i < h; ++i)
{
for (int j = 0; j < w; ++j)
{
ret[i][j] = matrix[j][h - i - 1];
}
}
return ret;
}

}
``````
-
You should explain what the hell a polyomino is – Falmarri Jan 10 '11 at 19:47
In what way is your current code failing? – Benjamin Lindley Jan 10 '11 at 19:47
@Falmarri he does link to the lsit of polyominos on Wikipedia, and search results for the word "polyomino" are basically guaranteed to give you the info you want – Daniel DiPaolo Jan 10 '11 at 19:48
in terms oh the [wiki article] (en.wikipedia.org/wiki/Polyomino#Enumeration_of_polyominoes) you are calculating the number of one-sided polyominoes – miracle173 Jan 5 at 3:17

Just solved this as well in java. Since all here appear to have performance issues. I give you mine as well.

Board reprsentation:

2 arrays of integers. 1 for the rows and 1 for the columns.

• Rotation: `column[i]=row[size-(i+1)]`, `row[i] = reverse(column[i])` where reverse is the bits reversed according to the size (for size = 4 and first 2 bits are taken: `rev(1100) = 0011`)
• Shifting block: `row[i-1] = row[i]`, `col[i]<<=1`
• Check if bit is set: `(row[r] & (1<<c)) > 0`
• Board uniqueness: The board is unique when the array row is unique.
• Board hash: Hashcode of the array row
• ..

So this makes all operations fast. Many of them would have been `O(size²)` in the 2D array representation instead of now `O(size)`.

Algorithm:

• For each size start from the blocks with 1 stone less.
• If it's possible to add the stone. Check if it was already added to the set.
• If it's not yet added. Add it to the solution of this size.
• add the block to the set and all its rotations. (3 rotations, 4 in total)
• Important, after each rotation shift the block as left/top as possible.
• +Special cases: do the same logic for the next 2 cases
• shift block one to the right and add stone in first column
• shift block one to the bottom and add stone in first row

Performance:

• `N=5` , time: 3ms
• `N=10`, time: 58ms
• `N=11`, time: 166ms
• `N=12`, time: 538ms
• `N=13`, time: 2893ms
• `N=14`, time:17266ms
• `N=15`, NA (out of heapspace)
-
Very nice and clean code. You deserve the accept. This buttom up approach is clearly much much better. Congrats :) – Martijn Courteaux Nov 30 '15 at 17:37

There are only 4,461 polynominoes of size 10, so we can just enumerate them all.

Start with a single stone. To expand it by one stone, try add the new stone in at all empty cells that neighbour an existing stone. Do this recursively until reaching the desired size.

To avoid duplicates, keep a hash table of all polynominoes of each size we've already enumerated. When we put together a new polynomino, we check that its not already in the hash table. We also need to check its 3 rotations (and possibly its mirror image). While duplicate checking at the final size is the only strictly necessary check, checking at each step prunes recursive branches that will yield a new polynomino.

Here's some pseudo-code:

``````polynomino = array of n hashtables
function find_polynominoes(n, base):
if base.size == n:
return
for stone in base:
for dx, dy in [(-1, 0), (1, 0), (0, -1), (0, 1)]:
new_stone.x = stone.x + dx
new_stone.y = stone.y + dy
if new_stone not in base:
new_polynomino = base + new_stone
is_new = true
for rotation in [0, 90, 180, 270]:
if new_polynomino.rotate(rotation) in polynomino[new_polynomino.size]:
is_new = false
break
if is_new:
``````
-
Indeed, this was what I though, until I noticed the polyminos can have ramification. – Martijn Courteaux Jan 10 '11 at 20:02
@Martijn Explain? – marcog Jan 10 '11 at 20:05
Basically Dynamic Programming right? – if_zero_equals_one Jun 6 '11 at 14:52

The most naive solution is to start with a single `X`, and for each iteration, build the list of unique possible next-states. From that list, build the list of unique states by adding another `X`. Continue this until the iteration you desire.

I'm not sure if this runs in reasonable time for N=10, however. It might, depending on your requirements.

-
Since there're < 4700 polyominos for `n=10` (see wikipedia link) and typically you have less than 20 positions to add new cell to, it should do just fine. – Nikita Rybak Jan 10 '11 at 23:16

I think I did it!

EDIT: I'm using the `SHA-256` algorithm to hash them, now it works correct.

Here are the results:

``````numberOfStones -> numberOfPolyominos
1  -> 1
2  -> 1
3  -> 2
4  -> 7
5  -> 18
6  -> 60
7  -> 196
8  -> 704
9  -> 2500
10 -> terminated
``````

Here is the code (Java):

``````import java.io.BufferedReader;
import java.io.IOException;
import java.util.ArrayList;
import java.util.List;

/* VPW Template */

public class Main
{

/**
* @param args
*/
public static void main(String[] args) throws IOException
{
new Main().start();
}

public void start() throws IOException
{

for (int i = 0; i < input.length; ++i)
{
}
/* Process each line */
for (int i = 0; i < input.length; ++i)
{
processLine(input[i]);
}
}

public void processLine(String line)
{
int n = Integer.parseInt(line);
System.out.println(countPolyminos(n));
}

private int countPolyminos(int n)
{
hashes.clear();
count = 0;
boolean[][] matrix = new boolean[n][n];
matrix[n / 2][n / 2] = true;
createPolyominos(matrix, n - 1);
return count;
}

private List<BigInteger> hashes = new ArrayList<BigInteger>();
private int count;

private void createPolyominos(boolean[][] matrix, int n)
{
if (n == 0)
{
boolean[][] cropped = cropMatrix(matrix);
BigInteger hash = hashMatrixOrientationIndependent(cropped);
if (!hashes.contains(hash))
{
// System.out.println(count + " Found!");
// printMatrix(cropped);
// System.out.println();
count++;
}
return;
}
for (int x = 0; x < matrix.length; ++x)
{
for (int y = 0; y < matrix[x].length; ++y)
{
if (matrix[x][y])
{
if (x > 0 && !matrix[x - 1][y])
{
boolean[][] clone = copy(matrix);
clone[x - 1][y] = true;
createPolyominos(clone, n - 1);
}
if (x < matrix.length - 1 && !matrix[x + 1][y])
{
boolean[][] clone = copy(matrix);
clone[x + 1][y] = true;
createPolyominos(clone, n - 1);
}
if (y > 0 && !matrix[x][y - 1])
{
boolean[][] clone = copy(matrix);
clone[x][y - 1] = true;
createPolyominos(clone, n - 1);
}
if (y < matrix[x].length - 1 && !matrix[x][y + 1])
{
boolean[][] clone = copy(matrix);
clone[x][y + 1] = true;
createPolyominos(clone, n - 1);
}
}
}
}
}

public boolean[][] copy(boolean[][] matrix)
{
boolean[][] b = new boolean[matrix.length][matrix[0].length];
for (int i = 0; i < matrix.length; ++i)
{
System.arraycopy(matrix[i], 0, b[i], 0, matrix[i].length);
}
return b;
}

public void printMatrix(boolean[][] matrix)
{
for (int y = 0; y < matrix.length; ++y)
{
for (int x = 0; x < matrix[y].length; ++x)
{
System.out.print((matrix[y][x] ? 'X' : ' '));
}
System.out.println();
}
}

public boolean[][] cropMatrix(boolean[][] matrix)
{
int l = 0, t = 0, r = 0, b = 0;
// Left
left: for (int x = 0; x < matrix.length; ++x)
{
for (int y = 0; y < matrix[x].length; ++y)
{
if (matrix[x][y])
{
break left;
}
}
l++;
}
// Right
right: for (int x = matrix.length - 1; x >= 0; --x)
{
for (int y = 0; y < matrix[x].length; ++y)
{
if (matrix[x][y])
{
break right;
}
}
r++;
}
// Top
top: for (int y = 0; y < matrix[0].length; ++y)
{
for (int x = 0; x < matrix.length; ++x)
{
if (matrix[x][y])
{
break top;
}
}
t++;
}
// Bottom
bottom: for (int y = matrix[0].length - 1; y >= 0; --y)
{
for (int x = 0; x < matrix.length; ++x)
{
if (matrix[x][y])
{
break bottom;
}
}
b++;
}

// Perform the real crop
boolean[][] cropped = new boolean[matrix.length - l - r][matrix[0].length - t - b];
for (int x = l; x < matrix.length - r; ++x)
{
System.arraycopy(matrix[x], t, cropped[x - l], 0, matrix[x].length - t - b);
}
return cropped;
}

public BigInteger hashMatrix(boolean[][] matrix)
{
try
{
MessageDigest md = MessageDigest.getInstance("SHA-256");
md.update((byte) matrix.length);
md.update((byte) matrix[0].length);
for (int x = 0; x < matrix.length; ++x)
{
for (int y = 0; y < matrix[x].length; ++y)
{
if (matrix[x][y])
{
md.update((byte) x);
} else
{
md.update((byte) y);
}
}
}
return new BigInteger(1, md.digest());
} catch (NoSuchAlgorithmException e)
{
System.exit(1);
return null;
}
}

public BigInteger hashMatrixOrientationIndependent(boolean[][] matrix)
{
BigInteger hash = hashMatrix(matrix);
for (int i = 0; i < 3; ++i)
{
matrix = rotateMatrixLeft(matrix);
}
return hash;
}

public boolean[][] rotateMatrixRight(boolean[][] matrix)
{
/* W and H are already swapped */
int w = matrix.length;
int h = matrix[0].length;
boolean[][] ret = new boolean[h][w];
for (int i = 0; i < h; ++i)
{
for (int j = 0; j < w; ++j)
{
ret[i][j] = matrix[w - j - 1][i];
}
}
return ret;
}

public boolean[][] rotateMatrixLeft(boolean[][] matrix)
{
/* W and H are already swapped */
int w = matrix.length;
int h = matrix[0].length;
boolean[][] ret = new boolean[h][w];
for (int i = 0; i < h; ++i)
{
for (int j = 0; j < w; ++j)
{
ret[i][j] = matrix[j][h - i - 1];
}
}
return ret;
}
``````
-
`if (!hashes.contains(hash)){ count++` Does this mean, you count the polyominoes by unique hashes? That won't work if you get a hash collision. – Ishtar Jan 10 '11 at 23:13
@Ishtar His hashes are unique, so he will never have a hash collision. Look at his hash function. – marcog Jan 10 '11 at 23:18
@marcog I believe he'll get integer overflow pretty fast in hashMatrix. Although, this can probably be fixed with multiplying by 2 instead of 31. (@Martijn Why 31?) Although, those collisions aren't likely to account for so many lost polygones. – Nikita Rybak Jan 10 '11 at 23:25
@Nikita True, hadn't considered that. He should also change +=2/+=1 to +=1/+=0. – marcog Jan 10 '11 at 23:28
If it is supposed to be unique, it shouldn't be called a hash.. Just wrote a Java program to do the same thing. With the above hash function I get for the 5-stone 3 hash collisions out of 18 configurations. (Still doesn't explain Martijn's result of only 13.. ) – Ishtar Jan 11 '11 at 0:27

Here's my solution in Java to the same problem. I can confirm Martijn's numbers (see below). I've also added in the rough time it takes to compute the results (mid-2012 Macbook Retina Core i7). I suppose substantial performance improvements could be achieved via parallelization.

``````numberOfStones -> numberOfPolyominos
1  -> 1
2  -> 1
3  -> 2
4  -> 7
5  -> 18
6  -> 60
7  -> 196
8  -> 704      (3 seconds)
9  -> 2500     (46 seconds)
10 -> 9189     (~14 minutes)
``````

.

``````    /*
* This class is a solution to the Tetris unique shapes problem.
* That is, the game of Tetris has 7 unique shapes. These 7 shapes
* are all the possible unique combinations of any 4 adjoining blocks
* (i.e. ignoring rotations).
*
* How many unique shapes are possible with, say, 7 or n blocks?
*
* The solution uses recursive back-tracking to construct all the possible
* shapes. It uses a HashMap to store unique shapes and to ignore rotations.
* It also uses a temporary HashMap so that the program does not needlessly
* waste time checking the same path multiple times.
*
* Even so, this is an exponential run-time solution, with n=10 taking a few
* minutes to complete.
*/
package com.glugabytes.gbjutils;

import java.util.HashMap;
import java.util.Iterator;
import java.util.Map;

public class TetrisBlocks {

private HashMap uShapes;
private HashMap tempShapes;

/* Get a map of unique shapes for n squares. The keys are string-representations
* of each shape, and values are corresponding boolean[][] arrays.
* @param squares - number of blocks to use for shapes, e.g. n=4 has 7 unique shapes
*/
public Map getUniqueShapes(int squares) {
uShapes = new HashMap();
tempShapes = new HashMap();

boolean[][] data = new boolean[squares*2+1][squares*2+1];
data[squares][squares] = true;
make(squares, data, 1);             //start the process with a single square in the center of a boolean[][] matrix

return uShapes;
}

/* Recursivelly keep adding blocks to the data array until number of blocks(squares) = required size (e.g. n=4)
* Make sure to eliminate rotations. Also make sure not to enter infinite backtracking loops, and also not
* needlessly recompute the same path multiple times.
*/
private void make(int squares, boolean[][] data, int size) {
if(size == squares) {   //used the required number of squares
//get a trimmed version of the array
boolean[][] trimmed = trimArray(data);
if(!isRotation(trimmed)) {  //if a unique piece, add it to unique map
uShapes.put(arrayToString(trimmed), trimmed);
}

} else {
//go through the grid 1 element at a time and add a block next to an existing block
//do this for all possible combinations
for(int iX = 0; iX < data.length; iX++) {
for(int iY = 0; iY < data.length; iY++) {
if(data[iX][iY] == true) {      //only add a block next to an existing block
if(data[iX+1][iY] != true) {    //if no existing block to the right, add one and recuse
data[iX+1][iY] = true;
if(!isTempRotation(data)) {         //only recurse if we haven't already been on this path before
make(squares, data, size+1);
tempShapes.put(arrayToString(data), data);  //store this path so we don't repeat it later
}
data[iX+1][iY] = false;
}

if(data[iX-1][iY] != true) {    //repeat by adding a block on the left
data[iX-1][iY] = true;
if(!isTempRotation(data)) {
make(squares, data, size+1);
tempShapes.put(arrayToString(data), data);
}
data[iX-1][iY] = false;
}

if(data[iX][iY+1] != true) {   //repeat by adding a block down
data[iX][iY+1] = true;
if(!isTempRotation(data)) {
make(squares, data, size+1);
tempShapes.put(arrayToString(data), data);
}
data[iX][iY+1] = false;
}

if(data[iX][iY-1] != true) {   //repeat by adding a block up
data[iX][iY-1] = true;
if(!isTempRotation(data)) {
make(squares, data, size+1);
tempShapes.put(arrayToString(data), data);
}
data[iX][iY-1] = false;
}
}
}
}
}
}

/**
* This function basically removes all rows and columns that have no 'true' flags,
* leaving only the portion of the array that contains useful data.
*
* @param data
* @return
*/
private boolean[][] trimArray(boolean[][] data) {
int maxX = 0;
int maxY = 0;
int firstX = data.length;
int firstY = data.length;

for(int iX = 0; iX < data.length; iX++) {
for (int iY = 0; iY < data.length; iY++) {
if(data[iX][iY]) {
if(iY < firstY) firstY = iY;
if(iY > maxY) maxY = iY;
}
}
}

for(int iY = 0; iY < data.length; iY++) {
for (int iX = 0; iX < data.length; iX++) {
if(data[iX][iY]) {
if(iX < firstX) firstX = iX;
if(iX > maxX) maxX = iX;
}
}
}

boolean[][] trimmed = new boolean[maxX-firstX+1][maxY-firstY+1];
for(int iX = firstX; iX <= maxX; iX++) {
for(int iY = firstY; iY <= maxY; iY++) {
trimmed[iX-firstX][iY-firstY] = data[iX][iY];
}
}

return trimmed;
}

/**
* Return a string representation of the 2D array.
*
* @param data
* @return
*/
private String arrayToString(boolean[][] data) {
StringBuilder sb = new StringBuilder();
for(int iX = 0; iX < data.length; iX++) {
for(int iY = 0; iY < data[0].length; iY++) {
sb.append(data[iX][iY] ? '#' : ' ');
}
sb.append('\n');
}

return sb.toString();
}

/**
* Rotate an array clockwise by 90 degrees.
* @param data
* @return
*/
public boolean[][] rotate90(boolean[][] data) {
boolean[][] rotated = new boolean[data[0].length][data.length];

for(int iX = 0; iX < data.length; iX++) {
for(int iY = 0; iY < data[0].length; iY++) {
rotated[iY][iX] = data[data.length - iX - 1][iY];
}
}

return rotated;
}

/**
* Checks to see if two 2d boolean arrays are the same
* @param a
* @param b
* @return
*/
public boolean equal(boolean[][] a, boolean[][] b) {
if(a.length != b.length || a[0].length != b[0].length) {
return false;
} else {
for(int iX = 0; iX < a.length; iX++) {
for(int iY = 0; iY < a[0].length; iY++) {
if(a[iX][iY] != b[iX][iY]) {
return false;
}
}
}
}

return true;
}

public boolean isRotation(boolean[][] data) {
//check to see if it's a rotation of a shape that we already have
data = rotate90(data);                      //+90*
String str = arrayToString(data);
if(!uShapes.containsKey(str)) {
data = rotate90(data);                  //180*
str = arrayToString(data);
if(!uShapes.containsKey(str)) {
data = rotate90(data);              //270*
str = arrayToString(data);
if(!uShapes.containsKey(str)) {
return false;
}
}
}
return true;
}

public boolean isTempRotation(boolean[][] data) {
//check to see if it's a rotation of a shape that we already have
data = rotate90(data);                      //+90*
String str = arrayToString(data);
if(!tempShapes.containsKey(str)) {
data = rotate90(data);                  //180*
str = arrayToString(data);
if(!tempShapes.containsKey(str)) {
data = rotate90(data);              //270*
str = arrayToString(data);
if(!tempShapes.containsKey(str)) {
return false;
}
}
}
return true;
}

/**
* @param args the command line arguments
*/
public static void main(String[] args) {

TetrisBlocks tetris = new TetrisBlocks();
long start = System.currentTimeMillis();
Map shapes = tetris.getUniqueShapes(8);
long end = System.currentTimeMillis();

Iterator it = shapes.keySet().iterator();
while(it.hasNext()) {
String shape = (String)it.next();
System.out.println(shape);
}

System.out.println("Unique Shapes: " + shapes.size());
System.out.println("Time: " + (end-start));
}
}
``````
-

Here's some python that computes the answer. Seems to agree with Wikipedia. It isn't terribly fast because it uses lots of array searches instead of hash tables, but it still takes only a minute or so to complete.

``````#!/usr/bin/python

# compute the canonical representation of polyomino p.
# (minimum x and y coordinate is zero, sorted)
def canonical(p):
mx = min(map(lambda v: v[0], p))
my = min(map(lambda v: v[1], p))
return sorted(map(lambda v: (v[0]-mx, v[1]-my), p))

# rotate p 90 degrees
def rotate(p):
return canonical(map(lambda v: (v[1], -v[0]), p))

# add one tile to p
def expand(p):
result = []
for (x,y) in p:
for (dx,dy) in ((-1,0),(1,0),(0,-1),(0,1)):
if p.count((x+dx,y+dy)) == 0:
result.append(canonical(p + [(x+dx,y+dy)]))
return result

polyominos = [[(0,0)]]

for i in xrange(1,10):
new_polyominos = []
for p in polyominos:
for q in expand(p):
dup = 0
for r in xrange(4):
if new_polyominos.count(q) != 0:
dup = 1
break
q = rotate(q)
if not dup: new_polyominos.append(q)
polyominos = new_polyominos
print i+1, len(polyominos)
``````
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