# find maximum sum of n elements in an array such that not more than k elements are adjacent

Almost the same as this: find maximum sum of elements in an array such that not more than k elements are adjacent

except there is a limit of n elements we can choose. How to modify the DP algorithm to make it work for this?

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well, let me make it more clearly.

question: find maximum sum of n elements in an array such that not more than K elements are adjacent

let int f[i][j][k] means the maximum sum for first i elements, using j total elements and the last k elements are used. let bool g[i][j][k] denotes whether it is possible to get certain combination. eg. g[1][1][2] is false. this is important because without restrict, f may generate impossible answers.

initially, memset f and g to be all zeros and set g[0][0][0] to be true. we can use forward recurrence to solve this DP problem. obviously, each time you encounter a number, you have two choices: choose it, or abadon it. thay gives out the recurrence formula:

``````f[i][j][k] can infer f[i+1][j+1][k+1], or
f[i][j][k] can infer f[i+1][j][0]
``````

so, the pseudo code can be as follow:

``````memset(f,0,sizeof(f));
memset(g,0,sizeof(g));
g[0][0][0]=true;
for (int i=0;i<array.size();i++)
for (int j=0;j<=n;j++)
for (int k=0;k<=K;k++) if (g[i][j][k]) {
f[i+1][j][0]=max(f[i+1][j][0],f[i][j][k]);
f[i+1][j+1][k+1]=max(f[i+1][j+1][k+1],f[i][j][k]+array[i]);
g[i+1][j][0]=true;
g[i+1][j+1][k+1]=true;
}
``````

and the final result will be:

``````ans=0;
for (i=0;i<=K;i++)
ans=max(ans,f[array.size()][n][i]);
return ans;
``````

above gives exactly j elements. if you want to get at most j elements, you can change it in this way:

``````ans=0;
for (i=0;i<=n;i++)
for (j=0;j<=K;j++)
ans=max(ans,f[array.size()][i][j]);
return ans;
``````
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@WilliamRookwood first of all, i think i made a small mistake in my original code. i will edit my post shortly. – songlj Feb 10 '13 at 8:29
@WilliamRookwood Did I answer your question? Do you need more help? – songlj Feb 12 '13 at 5:32
yes it did, thank you! – William Rookwood Feb 12 '13 at 6:18

Add new dimension of DP function: `f[i, j, l]` - max sum for first i elements, if used j total elements and last l elements in this sum.

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Hi, I'm having trouble figuring out the recurrence formulas, could you show the recurrence formula? Thanks – William Rookwood Feb 7 '13 at 7:51
For example, `P(v,i) = P(v-1,i-1) + C(v) if i > 0 `, `P(v,0) = max(P(v-1,i) for i = 0..min(k, v)) ` , `P(0,0) = 0` were the recurrence formulas in the other post I linked to. Can you provide the formulas for the f[i, j, l] function? – William Rookwood Feb 7 '13 at 8:25