for example, say n = Integer.MAX_VALUE or 2^123 then O(log(n)) = 32 and 123 so a small integer. isn't it O(1) ?
what is the difference ? I think, the reason is O(1) is constant but O(log(n)) not. Any other ideas ?
for example, say n = Integer.MAX_VALUE or 2^123 then O(log(n)) = 32 and 123 so a small integer. isn't it O(1) ? what is the difference ? I think, the reason is O(1) is constant but O(log(n)) not. Any other ideas ? 

If Generally, when analysing the complexity of code, we pretend that the input size isn't bounded above by the resource limits of the machine, even though it is. This does lead to some slightly odd things going on around So sometimes, we're analysing a slightly idealised version of the algorithm, because the actual code written cannot accept arbitrarily large input. For example, your average quicksort formally uses Theta(log n) stack in the worst case, obviously so with the fairly common implementation that callrecurses on the "small" side of the partition and looprecurses on the "big" side. But on a 32 bit machine you can arrange to in fact use a fixedsize array of about 240 bytes to store the "todo list", which might be less than some other function you've written based on an algorithm that formally has O(1) stack use. The morals are that implementation != algorithm, complexity doesn't tell you anything about small numbers, and any specific number is "small". If you want to account for bounds, you could say that, for example, your code to sort an array is O(1) running time, because the array has to be below the size that fits in your PC's address space, and hence the time to sort it is bounded. However, you will fail your CS assignment if you do, and you won't be providing anyone with any useful information :) 


There is a reason why you leave "O(n)" in, and consider to drop "O(log n)". They both are "constants": the former is less than 32, and the latter is less than 2^{32}. But you nevertheless have a natural feeling that you can't call O(n) O(1). However, if 


BigO shows how running time (or memory, etc) changes as the size of problem changes. When size of the problem gets 10 times bigger, an O(n) solution takes 10 times as long, an O(log(n)) solution takes a bit longer, and an O(1) solution takes the same time: O(1) means 'changes as fast as constant 1', but constants don't change. Familiarize yourself with the bigO notation in a bit more detail. 


The difference is that Edit: to answer your specific question on the difference between O(1) and O(logn), I'll give you an example. Let's say we want an algorithm that will find the min element in an unsorted array. One approach is to go through each element and keep track of the current min. Another approach is to sort the array and then return the first element. The first algorithm is O(n), and the second algorithm is O(nlogn). So let's say we start with an array of 16 elements. The first algorithm will run in time 16, the second algorithm will run in time 16*4. If we increase it to 17, then it becomes 17 and 17*4. We might naively say that the second algorithm takes 4 times as long as the first algorithm (if we treat the logn component as constant). But let's look at what happens when our array contains 2^32 elements. Now the first algorithm takes 2^32 time to complete, where our second algorithm takes 32*2^32 time to complete. It takes 32 times as long. Yes, it's a small difference, but it is still a difference. If the first algorithm takes 1 minute, the second algorithm will take over half an hour! 


I think you will get a better idea if it is called It is a scaling function depending on the input variable It is just like that you say that a function 


You’re not thinking big enough. Any algorithm that runs on a computer will either run forever or terminate after some small number of steps — since the computer is only a finite state machine, you cannot write algorithms that run for an arbitrary amount of time and then terminate. By that argument, BigO notation is only theoretical and has no purpose in a reallife computer program. Even Realistically, though, BigO can help you out if you know the constant factors. Even if an algorithm has an upper bound of 


Its the growth rate that you want to look at. O(1) implies no growth at all. While O(logn) does have growth. Even though the growth is small it is still growth. 


Obviously if you know that the input will always have a fixed number of elements, the algorithm will always run in constant time. BigO notation is used to denote worsecase running time, which describes the limit when the number of elements grows infinitely large. 


O(log(n))
is very small, it still grows with relation to the size of the input, so it's notO(1)
. – David Wolever Dec 19 '10 at 16:11