# Algorithms and BigOh [closed]

I am trying to understand what O(log(n)) suppose to means.

I have this exercise:

Given a sorted list of distinct integers A[0];A[1];...A[n-1]; you want to find out whether there is an index i for which A[i] = i. Give an algorithm that runs in time O(log(n)). Remember to prove that your algorithm is correct and analyze the running time. If there are many such indices, the algorithm can return any one of them.

I dont want the solution but I want to know what it means when she asks for running time O(log(n)).

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## closed as off topic by Gilles, Shree, Edwin de Koning, Nimit Dudani, MaerlynNov 26 '12 at 11:29

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The big-o tag that you added to your question contains some information. Can you be more specific about what you don't understand? –  Vaughn Cato Nov 25 '12 at 19:09
It means the run time will increase at logarithmic order as n increases. As for the form of the algorithm, usually divide and conquer will result in log factor. –  nhahtdh Nov 25 '12 at 19:09
Guys I cant understand what you saying because I am trying to figure out how the pseudo code will like. What that means for pseudo code? –  BlackM Nov 25 '12 at 19:12
There are good explanations here and here. Please let us know if either of these links help! –  paulsm4 Nov 25 '12 at 19:12
See Wikipedia, What does O(log n) mean exactly? Intuition for logarithmic complexity and many other existing questions on the topic. –  Gilles Nov 25 '12 at 19:14

## 2 Answers

A running time of O(log(n)) means that the running time (I assume under worst case analysis) is "bounded" by c*log(n) for some constant c.

Formally, it means, that the run time of the algorithm under the worst case analysis (let it be T(n)):

There are constants N,c such that for each n>N : T(n) <= c*log(n)

For more information you might want to read the wikipedia page and the SO popular question regarding big-O notation.

Hint: a log(n) suggests looking at the problem recursively, look at some element in the array, and using this element, you should reduce the problem into a sub problem (usually half the size of the original).

Spoiler:

In your case - what will it mean if arr[mid] < mid (where mid is exactly the middle of the array)? Since the elements are distinct it will mean arr[mid-1] < mid-1, arr[mid-2] < mid-2 , .... arr[0] < 0. From this you can conclude which part of the array you should continue investigate.

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can you explain the lastone?(spoiler). I should split my arrayn in the middle and examine only the one part? –  BlackM Nov 25 '12 at 19:45
I rather you try to think of it on your own. The idea is to look at the mid element, and decide which "side" of the array is promising if arr[mid] < mid - then the "higher" subarray is promising, and if arr[mid] > mid - the "lower" subarray is promising. Try to play with it and I am sure you can get to the solution. –  amit Nov 25 '12 at 19:47

It means that you shall not provide a solution using a simple loop, which would run in O(n). O(n) means that if you double the input size you will double the time needed for your algorithm to run.

An algorithm of the complexity O(log(n)) needs only log(2) more time.

O(log(n)) is an indicator of a divide and conquery strategy. What can you say about the elements of the sorted list when you look at the center element? Where can you continue to search if A[m] < m ?

So if you can repeat this (recursive) approach: split a list into parts and decide in O(1) time which part should be continued with until the resulting sublist is small enough to answer your question directly.

Now count the steps you needed and compare these to the input size. How many steps will you need if you use 2n as input size?

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