I am trying to understand this analysis of Strassen's algorithm for multiply k x k matrices. But I am still not too sure how many operations are invovled. Can someone help clarify this?
The number of operations performed is determined as follows. First, we split the matrix up into four sub strives of size at k/2, and then perform seven recursive multiplications of those matrices. We then do a constant number of additions of those products to get our desired result. This gives us a recurrence relation defined as follows: T(1) = 1 T(k) = 7T(k/2) + ck^{2} Note that lg 7 > 2, since lg 7 > lg 4 = 2. (Here, lg is the binary logarithm). Thus by case one of the Master theorem, the asymptotic complexity of the algorithm is O(k^{lg 7}) ≈ O(k^{2.807}). Hope this helps! 


Given the page says it is approximately O(N^2.807...) I would guess that would be a good approximation of the number of floatingpoint operations. All the looping/iterating will be with integer operations. 

