# Why is this dynamic programming code incorrect? [closed]

I am doing this problem for a homework assignment. I have solved the problem using a standard bottom up Dynamic Programming algorithm. My code shows the expected outcomes on my test cases but the website says that it gives incorrect answer. I cannot understand where this code is lacking. Please help me.

``````import java.io.*;
import java.util.*;
class Main300{

public static void main (String[] args) throws java.lang.Exception{
for(int j = 0 ; j < nn; j++){
char[][] a = new char[n][n];
int ki = -1;
int kj = -1;
for(int i = 0 ; i < n ; i++){
for(int k = 0 ; k < n; k++){
a[i][k] = s.charAt(k);
if(a[i][k] == 'K'){
ki = i;
kj = k;
}
}
}
System.out.println(ans(a, ki, kj));
}
}

private static int ans(char[][] a, int ki, int kj){
int[][] x = new int[a.length][a.length];
for(int j = a.length-1; j >= 0; j--){
for(int i = 0 ; i < a.length; i++){
if(a[i][j] == 'P'){
x[i][j]++;
}
if(i-2 >= 0 && j+1 <= a.length-1 && a[i-2][j+1] == 'P'){
x[i][j] += x[i-2][j+1];
}else if(i-1 >= 0 && j+2 <= a.length-1 && a[i-1][j+2] == 'P'){
x[i][j] += x[i-1][j+2];
}else if(i+2 <= a.length-1 && j+1 <= a.length-1 && a[i+2][j+1] == 'P'){
x[i][j] += x[i+2][j+1];
}else if(i+1 <= a.length-1 && j+2 <= a.length-1 && a[i+1][j+2] == 'P'){
x[i][j] += x[i+1][j+2];
}
}
}
return x[ki][kj];
}
}
``````
-
Try to include the question itself to the site as the other site may remove that link and then this question is just of no use. –  Aman Deep Gautam Mar 2 at 13:28

## closed as not a real question by Sean Owen, jlordo, Soner Gönül, casperOne♦Mar 4 at 14:15

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

The following are the reasons for wrong answer:

a) As the DP formulation will be

`a[r][c] = max(a[r-2][c+1], a[r-1][c+2], a[r+1][c+2], a[r+2][c+1])`

so you need to verify each and every path from the current position. What your code suggest is that you go and do it only on one path(the `else if's` simulate travelling through one path only).

b)Also as @Vinayak pointed out, `a[i-2][j+1] == 'P' will allow you to move to only those places where there is a pawn, which is not necessarily true. You can think of very trivial examples to verify this.

Here is the code:

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

class e1_test{

public static void main (String[] args) throws java.lang.Exception{
for(int j = 0 ; j < nn; j++){
int n = Integer.parseInt(br.readLine());char[][] a = new char[n][n];
int ki = -1;
int kj = -1;
for(int i = 0 ; i < n ; i++){
for(int k = 0 ; k < n; k++){
a[i][k] = s.charAt(k);
if(a[i][k] == 'K'){
ki = i;
kj = k;
}
}
}
System.out.println(ans(a, ki, kj));
}
}

private static int ans(char[][] a, int ki, int kj) {
int[][] x = new int[a.length][a.length];
for(int j = a.length-1; j >= 0; j--) {
for(int i = 0 ; i < a.length; i++) {
if(a[i][j] == 'P') {
x[i][j]++;
}
int temp=0;
//note the changes from else if's to only if's
//removal of [i-2][j+1] == 'P' condition.
if(i-2 >= 0 && j+1 <= a.length-1) {
if(temp < x[i-2][j+1])
temp = x[i-2][j+1];
}
if(i-1 >= 0 && j+2 <= a.length-1) {
if(temp < x[i-1][j+2])
temp = x[i-1][j+2];
}
if(i+2 <= a.length-1 && j+1 <= a.length-1) {
if(temp < x[i+2][j+1])
temp = x[i+2][j+1];
}
if(i+1 <= a.length-1 && j+2 <= a.length-1) {
if(temp < x[i+1][j+2])
temp = x[i+1][j+2];
}
x[i][j] += temp;
}
}
return x[ki][kj];
}
}
``````
-

I will slightly modify your approach. You will find that this is very useful for DP solutions. This will help you write a simpler solution, and you will solve your WA on your own :)

Instead of checking for bounds, make the table `TAB` (`x` in your code) a little bigger, depending on your relation.

Value of `TAB[r][c]` is equal to max number of pawns it can capture starting from `(r, c)`

In The White Knight problem, see how Knight can go 2 rows above and below, and 2 columns to the right. So make your `TAB[N+4][N+2]` instead of `TAB[N][N]`. Fill this extra space with base value, `0` in this case.

The relation is pretty simple (which you have coded using 4 `if-else`)

``````TAB[r][c] = max(TAB[r-2][c+1], TAB[r-1][c+2], TAB[r+1][c+2], TAB[r+2][c+1])
``````

And of course increment `TAB[r][c]` if `INP[r][c] == 'P'` (`a` in your case)

Lastly the final solution is `TAB[ki+2][kj]` (`ki, kj` from your code).

-
thanks for the input detailing how to make the table a little bigger but it did not solve my problem anyway. You have still used the same DP as I am. Please help me point out any mistakes in my code. –  Nikunj Banka Mar 2 at 13:38
@NikunjBanka: See the EDIT in answer. –  Vinayak Garg Mar 2 at 13:49
@VinayakGarg the `if-else` part is wrong as all the four branches of max will not be traversed. –  Aman Deep Gautam Mar 2 at 15:05
@AmanDeepGautam: You are right, had OP followed my answer, he would have got accepted, removing my EDIT. –  Vinayak Garg Mar 2 at 15:09