# What does this passage from CLRS mean?

I came across this passage on page 47 of Introduction to Algorithms by Cormen et al.:

The number of anonymous functions in an expression is understood to be equal to the number of times the asymptotic notation appearrs. For example in the expression:

Σ (i=1 to n) O(i)

there is only a single anonymous function (a function of i). This expression is not the same as O(1) + O(2) + ... + O(n), which doesn't really have a clean interpretation.

What does this mean?

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I think the notation Σ O(i) indicates that we're re-using the constant for the big O, while O(1)+O(2)+...+O(n) has separate constants (this looks equivalent to Steve's interpretation). –  Nabb Oct 1 '12 at 1:11

i think you should understand "The number of anonymous functions in an expression is understood to be equal to the number of times the asymptotic notation appears" at first. it means if

`````` Σ (i=1 to n) O(i)
``````

so anonymous functions is one equals to O(i) such as `Σ (i=1 to n) f1(i)`

and if `Σ (i=1 to n) O(i)+O(i)` anonymous functions should have two functions equals to O(i)+O(i) such as `Σ (i=1 to n) f1(i)+f2(i)`

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I think they're saying that when they use that notation (sum of a big-O), it means there's a single O(i) function (call it `f(i)`), and then the expression refers to the sum from 1 to n of that function.

This isn't the same thing as if there were `n` different functions (call them `f_1(i)` to `f_n(i)`), each of which is `O(i)`, and then the expression refers to the sum of `f_1(1) + f_2(2) + ... + f_n(n)`. That latter thing is not what the notation means.

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Well, Σ O(i) means Σ f(i), but what is the class of the "single function"? O(?) Σ O(i) takes no information about this, I think this is as ambiguous as "O(1) + O(2) + ... + O(n)" mentioned in the book. –  misssprite Jan 31 '13 at 16:14