let A be the given array of numbers

and let dp[i][j] be the maximum difference that the player whose turn is now can get from playing with

the sub range (A[i],A[i+1],A[i+2],....,A[j]), then the answer to the problem will be dp[0][n-1] where n

is the size the array A.

now to compute dp[i][j] we iterate over the range (i,j) by the iterator k and for each iteration we

try to give the player(whose turn is now) the prefix (A[i] + A[i+1] + .... + A[k]) once,

and we try to give him the suffix (A[k] + A[k+1] + ..... + A[j]) once and we always maximize

the dp[i][j].

this is a code to this idea :

for (int i=0;i<n;i++)

for (int j=0;j<n;j++)

    dp[i][j] = -1e14;

for (int i=0;i<n;i++) dp[i][i] = A[i];

for (int len=2;len<=n;len++){

for (int i=0;i<=n-len;i++){

     int j = i + len - 1;

     for (int k=i;k<=j;k++){

         dp[i][j] = max(dp[i][j] , f(i,k) - (k+1<=j ? dp[k+1][j] : 0));

         dp[i][j] = max(dp[i][j] , f(k,j) - (k-1>=i ? dp[i][k-1] : 0));

}
     }

}

cout<<dp[0][n-1]<<endl;

where dp[k+1][j] and dp[i][k-1] are the maximum differences that the other player(whose turn is

next) can get from the left sub ranges

and f(i,j) is a function that gives the sum (A[i] + A[i+1] + .... + A[j])

Let dp[l][r][t] be the best possible result for player t once l elements have been taken from the left and r elements have been taken from the right. The transition is quite straightforward, from [l][r][t] we can either go to [l + k][r][1 - t] or [l][r + k][1 - t], for any k in the range [1, N - l - r]. For the first player, we add the elements we take and we want to maximize the result, while for the second player we negate the elements we take and we want to minimize the result. I think the problem is clearer with recursive + memoization.

Here's the code: Easy Game