# How to add Big O and Big omega

If an algorithm has two sub algorithm, when it is best case for sub algorithm A1 to the given input, it is the worst case for sub algorithm A2. How could I find the overall algorithm complexity? Simply I mean Ω(N) + O(N)=? I know if the algorithms are in sequential executing order the over all complexity is O(N)+ O(N) and in nested order O(N)* O(N).

Please tell me in both cases, when in sequential and in nested order

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It is hard to tell what is your question. –  barak1412 Sep 23 '12 at 17:02
Best case and worst case are different then big O and big Omega. Best case/Worst case/avg case are analysis of algorithms. The analysis results in a function. big O and big Omega are sets of functions. Each one of big O/big Omega/big Theta can be applied to each of best/worst/avg case analysis. I tried to explain this issue among others answering this question –  amit Sep 23 '12 at 17:06
Simple, how to add runtime complexities of two algorithms? When one's complexity is big O and other's is big omega? Ω() + O()=? –  Mobi Sep 23 '12 at 17:47

If your algorithm includes one operation which takes (for example) O(N) time, and another which takes O(N^2) time, then the overall complexity is O(N^2). There's no such thing as O(N^2 + N). The same goes for Ω(). This answers your question about "sequential executing order".

If your algorithm includes N operations, each of which takes O(N) time, then the overall complexity is O(N^2). The same goes for Ω(). You just multiply the polynomials, and take the term which grows most quickly with increasing N. This answers your question about "nested execution order".

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If better-educated readers find anything incorrect in this post, please correct me! –  Alex D Sep 23 '12 at 17:07
O(N^2+N) exists as a set but O(N^2+N)=O(N) –  Kwariz Sep 23 '12 at 17:09
What is the + operator for sets? Omega and O are both sets of function, what is `SET + SET`? I am not familiar with a standard definition for it:| –  amit Sep 23 '12 at 17:12