I have an iteration algorithm, where at each iteration the amount of computation decrease gradually. Here is an illustration of my algorithm:

`Input size: n`

and `Total iteration = k`

```
iter 1: time taken -> f1 * n
iter 2: time taken -> f2 * n
iter 3: time taken -> f3 * n
...
iter k: time taken -> fk * n
```

where `f1 > f2 > f3 >...> fk`

and `0 <= f1, f2,...,fk <= 1`

Question: What is the time complexity of this algorithm? is it `Big-O(klog n)`

Thank you.

`Update:`

I think the question seems vague. I'll explain it in words:

Input for my algorithm is `n`

and I'll run it over `k`

iterations. but on each iteration the input size reduces by a factor which is `unknown`

. there is no pattern in the reduction.

eg :

```
iter 1: input size = n (always n)
iter 2: input size = n/2 (can change)
iter 3: input size = n/5 (can change)
iter 4: input size = n/8 (can change)
...
iter k: input size = n/10 (can change)
```

`Big-O (kn)`

– Mahin Jul 16 '12 at 10:50`n`

. I have added more information to the question. thank you. – Mahin Jul 16 '12 at 11:06