# Is there any algorithm that is not dependent upon n (size of inputs)? [closed]

I was just curious yet google couldn't help me much with this. Does there exist any algorithm which doesn't depend on size of inputs? Like, whose time complexity won't depend on n?

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## closed as too broad by Dukeling, PengOne, iStimple, gnat, UndoApr 2 at 0:55

There are either too many possible answers, or good answers would be too long for this format. Please add details to narrow the answer set or to isolate an issue that can be answered in a few paragraphs.If this question can be reworded to fit the rules in the help center, please edit the question.

Find the value of the first element of a given array. –  Matt Jan 24 at 20:42
Yes, an algorithm that does not use any input would not depend on the size of the input. –  n.m. Jan 24 at 20:43
Return the smaller of the first two elements. –  Karoly Horvath Jan 24 at 20:43
A perfect hash function can do constant time lookups. –  Daniel Bank Jan 24 at 20:44
Did you look for "constant time algorithm" (keywords are everything)? If not, that would be a good starting point. Unfortunately too broad (too many possible answers) for Stack Overflow (as per the help center), but you already have a few examples. –  Dukeling Jan 24 at 20:45

Any constant time algorithm (hashing, array lookup and adding to or removing from the front of a List are examples) do not depend on the size of inputs.

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We always say "constant time", but if someone wants to get REALLY pedantic, they can argue that it could depend on the number of bits in the data structure being used. Only so many bits can be processed in one operation, but as the data gets larger, the operations are more like O(n) in the number of bits. Super pedantic, maybe not completely correct, I know. This question is very broad. –  AndyG Jan 24 at 20:47
Some algorithms do not process the entire data structure but only, for example, look up one location in memory and perform the operations on it. These are truly constant time. Your comment isn't entirely correct. –  La-comadreja Jan 24 at 20:49
I gathered I'd get some flak for it :) Agreed, some algorithms do that (like an algorithm to flip 1 bit). Many of the "constant" time algorithms being listed here, though, don't necessarily operate like that. –  AndyG Jan 24 at 20:52
Hashing doesnt run in constant time, computing the hash function takes usually O(n) respect to the size of the key. –  conca Jan 24 at 20:52
@AndyG: If you're REALLY pedantic, you define yourself a theoretical computation model and define run time as the number of primitive operations that an algorithm would need to solve a task in that model. Now one of the most commonly used (and often implicitely assumed) models is the RAM model, where arithmetic operations on a word are primitive. Since memory adresses are also represented as words, that means that for every data structure of size proportional to `n` that is located in your memory, `n` really fits into `O(1)` words. –  Niklas B. Jan 24 at 21:10

There are many, even practical ones:

Say you need to return the smallest element from a data set. You know your list is already sorted, so you return the first element.

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