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If n is very big, and k is very small, can I say that O(kn) is linear complexity?

What if k is closed to n/2, but not more than n/2? Do I consider it still as linear complexity? Or quadratic complexity O(n^2)?

Is there a limit to how big k is, to consider O(kn) as quadratic complexity?

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up vote 14 down vote accepted

If k is a constant, then any O(kn) function is O(n), i.e. linear

If k is a function of n and is O(n), then any O(kn) function is O(n^2). n/2 is O(n). Furthermore, (n^2)/2 is not O(n), and so if k is close to n/2 then kn is not O(n).

If k is not O(n), then kn is not O(n^2).

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if k is a function of m and is O(m), and given that m << n, can I say that O(kn) is linear? – Michael Oct 31 '12 at 15:38
    
@Michael: not necessarily. For example if m is log log n then n * log log n is not O(n). But it's close enough to linear for all practical purposes. I suggest you look at the definition of big-O notation, if you understand that then you can analyze your actual function. – Steve Jessop Oct 31 '12 at 16:01
    
thank you for your great explanation – Michael Oct 31 '12 at 16:12

Assuming that k and n are independent variables, saying O(kn) is linear is a proper statement.

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