For static pattern database(5-5-5), see this(page 290 and 283) OR there is an explanation below. For What is 15-puzzle?

I am creating a static patter database(5-5-5). This code to to fill entries into the first table. I am doing it via the recursive function `insertInDB()`

. The first input to the recursive function is this (actually the input puzzle contains it in 1-D array. For better understanding I have represented it as 2-D below)

1 2 3 4

0 6 0 0

0 0 0 0

0 0 0 0

This is my code :

```
class DBClass
{
public Connection connection;
public ResultSet rs;
public PreparedStatement ps1;
public PreparedStatement ps2;
public int k;
String read_statement,insert_statement;
public DBClass()
{
try {
Class.forName("com.mysql.jdbc.Driver");
} catch (ClassNotFoundException e) {
// TODO Auto-generated catch block
e.printStackTrace();
}
try {
connection = DriverManager
.getConnection("jdbc:mysql://localhost/feedback?"
+ "user=ashwin&password=ashwin&autoReconnect=true&useUnicode=true&characterEncoding=utf8&validationQuery=Select 1");
insert_statement="insert into staticpdb1(hash,permutation,cost) values(?,?,?)";
read_statement="select SQL_NO_CACHE * from staticpdb1 where hash=? and permutation= ? LIMIT 1";
ps1=connection.prepareStatement(read_statement, ResultSet.TYPE_SCROLL_SENSITIVE,
ResultSet.CONCUR_UPDATABLE);
ps2=connection.prepareStatement(insert_statement);
k=0;
} catch (SQLException e) {
// TODO Auto-generated catch block
e.printStackTrace();
}
}
public int updateIfNecessary(FifteenPuzzle sub)
{
String str=sub.toDBString();
try
{
ps1.setInt(1, sub.hashcode());
ps1.setString(2,str);
rs=ps1.executeQuery();
if(rs.next())
{
//if a row exists, check if the cost is greater than sub's
int cost=rs.getInt(3);
if(sub.g_n<cost) //if the cost of sub is less than db row's cost
{
//replace the cost
rs.updateInt(3, sub.g_n);
rs.updateRow();
return 1; //only examine - do not insert
}
else
return 0; //dont examine - return
}
else
return 2; //insert and examine
}
catch(SQLException e)
{
System.out.println("here1"+e);
System.err.println("reported recursion level was "+e.getStackTrace().length);
return 0;
}
finally{
try{
rs.close();}
catch(final Exception e1)
{
System.out.println("here2"+e1);
}
}
}
public void insert(FifteenPuzzle sub)
{
try{
String str=sub.toDBString();
ps2.setInt(1,sub.hashcode());
ps2.setString(2, str);
ps2.setInt(3,sub.g_n);
ps2.executeUpdate();
ps2.clearParameters();
}catch(SQLException e)
{
System.out.println("here3"+e);
}
}
public void InsertInDB(FifteenPuzzle sub) throws SQLException
{
System.out.println(k++);
int i;
int p=updateIfNecessary(sub);
if(p==0)
{
System.out.println("returning");
return;
}
if(p==2)
{
insert(sub);
System.out.println("inserted");
}
//FifteenPuzzle temp=new FifteenPuzzle(sub.puzzle.clone(),2,sub.g_n);
for(i=0;i<sub.puzzle.length;i++)
{
if(sub.puzzle[i]!=0)
{
//check the positions it can be moved to
if(i%4!=0 && sub.puzzle[i-1]==0) //left
{
//create another clone and increment the moves
FifteenPuzzle temp_inner=new FifteenPuzzle(sub.puzzle.clone(),2,sub.g_n+1);
//exchange positions
int t=temp_inner.puzzle[i];
temp_inner.puzzle[i]=temp_inner.puzzle[i-1];
temp_inner.puzzle[i-1]=t;
InsertInDB(temp_inner);
}
if(i%4!=3 && sub.puzzle[i+1]==0) //right
{
//create another clone and increment the moves
FifteenPuzzle temp_inner=new FifteenPuzzle(sub.puzzle.clone(),2,sub.g_n+1);
//exchange positions
int t=temp_inner.puzzle[i];
temp_inner.puzzle[i]=temp_inner.puzzle[i+1];
temp_inner.puzzle[i+1]=t;
InsertInDB(temp_inner);
}
if(i/4!=0 && sub.puzzle[i-4]==0) //up
{
//create another clone and increment the moves
FifteenPuzzle temp_inner=new FifteenPuzzle(sub.puzzle.clone(),2,sub.g_n+1);
//exchange positions
int t=temp_inner.puzzle[i];
temp_inner.puzzle[i]=temp_inner.puzzle[i-4];
temp_inner.puzzle[i-4]=t;
InsertInDB(temp_inner);
}
if(i/4!=3 && sub.puzzle[i+4]==0) //down
{
//create another clone and increment the moves
FifteenPuzzle temp_inner=new FifteenPuzzle(sub.puzzle.clone(),2,sub.g_n+1);
//exchange positions
int t=temp_inner.puzzle[i];
temp_inner.puzzle[i]=temp_inner.puzzle[i+4];
temp_inner.puzzle[i+4]=t;
InsertInDB(temp_inner);
}
}
}
```

The function **insertInDB(FifteenPuzzle fp)** in the class is the recursive function and is called first from the main function with the array for the fifteen puzzle argument(`puzzle`

is an integer array field of the Class `FifteenPuzzle`

) being - `1,2,3,4,0,6,0,0,0,0,0,0,0,0,0,0`

(same as the matrix shown above). Before explaining the other functions I will explain what static pattern database is; briefly(Because of the comments below)

## What is a (5-5-5) static pattern database for 15-Puzzle?

Pattern databases are heuristics used to solve a fifteen puzzle(can be any puzzle. But here I will talk about only 15-Puzzle). A heuristic is a number used to determine which state to be expanded next. I is like cost of each state. Here state is a *permutation* of the 15-Puzzle. For simple puzzles like 8-Puzzle, the heuristic can be **manhattan distance**. It gives the minimum number of moves, for each misplaced tile, to reach **it's** goal position. Then manhattan distances for all the tiles are added up to give the cost for that tile. Manhattan distance gives the lower bound to the estimate of the number of moves required to reach the goal state i.e you cannot reach the goal state with moves, less than the manhattan distance. **BUT** manhattan distance is not a very good heuristic, though admissible, because it does not consider other tiles near by it. If a tile has to be moved to it's goal position, the near by tiles also have to be moved and the number of moves increase. So, clearly for these puzzles, the actual cost is mostly much greater that
the manhattan distance.

To **overcome** this(manhattan distance) and take into account the other tiles, pattern databases were introduced.
A static patter database holds the heuristics for sub-problems or for a group of tiles to reach for their goal state. Since, you are calculating the number of moves to make these group of tiles reach their goal state, the other tiles in that group will be taken into account when a tiles is being moved. So, this is a better heuristic and mostly will always is greater than manhattan distance.

5-5-5 static pattern is just a form of static pattern database where the number of groups are 3, two of them containing 5 tiles each and the third one contains 6(6th isthe blank tile).

## One of the groups is this matrix :

1 2 3 4

0 6 0 0

0 0 0 0

0 0 0 0

I am calculating the heuristics/number_of_moves for all permutations of this group to reach the above configuration and **inserting them into my database**.

The total number of combinations(also the no of rows in db) possible is

```
16!/(16-5)! = 524160
```

Now, the other functions - `updateIfNecessary(FifteenPuzzle)`

- this function checks if the array of the passed FifteenPuzzle object is already present in the database. If already present in the database, it checks if the current object's cost is less than the cost in DB. If yes, it replaces it with the current cost else does nothing. The function -`insert(FifteenPuzzle)`

inserts a new permutaion with the cost.

**NOTE :** `fifteenuzzle.g_n`

is the cost for the puzzle. For the initial puzzle that represents the matrix above, the cost is `0`

and for each move the cost is `incremented by1`

.

I have set the stack size to -`Xss128m`

(1024, 512 and 256 were giving a fatal error) for stack size in run configurations.

Currently the recursion number or the depth is ** 7,500,000 and counting**(value of

`System.out.println(k++);`

).
The total number of combinations possible is

```
16!/(16-5)! = 524160
```

But the depth has already reached 7,500,000. This is because of generation of duplicate states. Currently the number of entries in the database is **513423**. You might think that there only 10,000 entries to fill up now. But now the rate at which entries are made has decreased drastically about **1 entry every 30 min**. This will never get over then.

I need a solution that is practical - **with or without recursion**. Is it possible?

`-Xmx`

option. – prajeesh kumar Nov 5 '12 at 10:04