I am trying to solve this using dynamic programming with complexity of O ( N ^ 2 ) which will give TLE because N <= 10 ^ 5.
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First, store an array b, b[i] = log2(a[i]) to get rid of big numbers.
Now, calculate the following DP:
DP[1]=0
DP[i]=min(DP[j]+b[i]) for all i - k < = j < i (note that the problem is now changed to addition instead of multiplication becasue log(a * b) = log(a) + log(b)
Store the best path, and calculate the product of all A[i]'s that occur in the path.
You can solve the above DP in O(nlogn) by maintaining a set of the last k DP values.
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