So I just started learning about Asymptotic bounds for an algorithm
Question:
What can we say about theta of a function if for the algorithm we find different lower and upper bounds?? (say omega(n) and O(n^2)). Or rather what can we say about tightness of such an algorithm?
The book which I read says Theta is for same upper and lower bounds of the function.
What about in this case?



Just for a bit of practicality, one algorithm that is not in Regarding tightness, I only ever heard that in this context with reference to the upper and lower bounds proposed for algorithms. Again regarding the example of insertion sort, the given bounds are tight in the sense that there are instances of the problem that actually can be done in time linear in their size (the lower bound) and other instances of the problem that will not execute in time less than quadratic in their size. Bounds that are valid, but not tight for insertion sort would be The average case complexity is not a bound; it "only" describes how efficient an algorithm is "in most cases"; take for example quick sort which has a bestcase complexity of 


I don't think you can say anything, in that case. The definition of
For some pathological function that exhibits those behaviors, such as oscillating between Example:
Your bounds 

