# Is there a shorthand term for O(n log n)?

We usually have a single word for most complexities we encounter in algorithmic analysis:

• `O(1)` == "constant"
• `O(log n)` == "logarithmic"
• `O(n)` == "linear"
• `O(n^2)` == "quadratic"
• `O(n^3)` == "cubic"
• `O(2^n)` == "exponential"

We encounter algorithms with `O(n log n)` complexity with some regularity (think of all the algorithms dominated by sort complexity) but as far as I know, there's no single word we can use in English to refer to that complexity. Is this a gap in my knowledge, or a real gap in our English discourse on computational complexity?

• To all answerers noting the number of syllables, this isn't about optimization (I misled you with my use of "shorthand" above) but more about speaking fluent (i.e., flowing; much unlike this parenthetical digression) English. – jemfinch Apr 14 '10 at 17:11
• Perhaps using the common term "nlogn" which has few if no other meanings - is fluent, common english. – Joe Koberg Apr 14 '10 at 17:43
• @Joe: Maybe not common English, but anybody discussing algorithmic complexity should be able to use it fluently. – David Thornley Apr 14 '10 at 17:53

Seems to have been coined by Robert Sedgewick in the book Algorithms In C. Also called quasilinear or loglinear. However, linearithmic has the added bonus of not being an overloaded term (quasilinear is used in economics and differential equations, while loglinear is used in economics and regression analysis).

• From the looks of other answers, I don't think this is common parlance (I'd never heard of it), so for clarity's sake I'd stick with "inlogin" or you may get some weird looks. +1 though - perhaps in time this'll become a commonplace term (weird that it isn't already). – Ian Henry Apr 14 '10 at 17:13
• I suspect "original material" on that entry. ... "Results 1 - 10 of about 1,080 for linearithmic." google.com/search?q=linearithmic – Joe Koberg Apr 14 '10 at 17:14
• "Linearithmic" was coined as a portmanteau of "linear" and "logarithmic" in Algorithms In C by Robert Sedgewick (Addison-Wesley 1990, ISBN 0-201-51425-7). – John Calsbeek Apr 14 '10 at 17:20
• "Linearithmic" appears in 32 books per Google Books search results, and has the added bonus (over quasilinear and loglinear) of not being used for other mathematical purposes. If people had heard of it, this question probably wouldn't exist. – John Calsbeek Apr 14 '10 at 17:38
• @Roger, no, -1 because of pushing a very narrowly used term as a correct answer. That wasn't a reply to Calsbeek's comment. – P Shved Apr 15 '10 at 10:26

"en log en" has fewer syllables than "exponential" or "logarithmic". I think most people just say that.

• Also, why is "double-you double-you double-you" (9 syllables) shorthand for "world wide web" (3 syllables) ??? – Joe Koberg Apr 14 '10 at 17:08
• This is true, but linear is longer than `n` and people say that. – Matthew Flaschen Apr 14 '10 at 17:08
• @Joe -- perhaps that's why many people just say "dub-dub-dub." Not me, of course, I think that makes you sound like an blibbering idiot. – tvanfosson Apr 14 '10 at 17:10
• @tvanfosson - nice timing :) – DVK Apr 14 '10 at 17:11
• www? That is so not Web 2.0! – anon Apr 14 '10 at 17:13

According to Wikipedia you can call it linearithmic, loglinear, or quasilinear.

• Of those three, only loglinear is somewhat clear in what it means. Though the other two certainly sound kinda cool. – Daniel DiPaolo Apr 14 '10 at 17:11
• "Results 1 - 10 of about 1,080 for linearithmic." google.com/search?q=linearithmic – Joe Koberg Apr 14 '10 at 17:11
• I prefer 'loglinear' myself. There is also the variant logilinear in the wild, but this is not officially acknowledged by any dictionary, and seems only to be used in the context of loglinear modelling. – Iain Samuel McLean Elder Apr 14 '10 at 17:36
• wikipedia has spoken. I'm going to start using linearithmic. – rmeador Apr 14 '10 at 17:49

`O(2^n)` == "O Scary"

I don't believe there is such a term.

More relevant, though, is this thought: Why do you refer to exponential (11 characters) as a "shorthand" for O(2^n) (6 characters)?

Personally, I'm quite happy to say "this algorithm runs in en log en time". It's all most people need to hear.

• Now, say "this algorithm runs in two to the enth time" versus "this algorithm runs in exponential time". The latter is, in my opinion, more idiomatic and easier to say. – David Thornley Apr 14 '10 at 17:52
• Yeah, I agree with you there. I never claimed that exponential was not easier to say. But I don't believe there's a simple, idiomatic way to express the product of a linear and logarithmic growth function. – Platinum Azure Apr 14 '10 at 18:01

No there's no single word equivalent for O(nlogn). You just have to spend the extra time saying the whole thing (Note: same number of syllables as "exponential")