# Estimation of program execution time from complexity

I want to know, how i can estimate the time that my program will take to execute on my machine (for example a 2.5 Ghz machine), if i have an estimation of its worst case time complexity? For Example : - If I have a program which is O(n^2), in worst case, and n<100000, how can i know /estimate before writing the actual program/procedure, the time that it will take to execute in seconds?

Wouldn't it be good to know how a program actually performs, and it will also save writing code which eventually turns out to be inefficient! Help greatly appreciated.

• Program performance is an experimental science. You will/would spend more time devising an accurate prediction for the performance of your program than you would writing your program and timing it. Then, once you had the accurate prediction you would still have to write the program and test whether or not your predictions fit your observations. Better to write the program first then test its performance. Commented Feb 12, 2013 at 16:35
• You cannot estimate this before you write it (or at least, before you know what you are going to write). You need at least one data point first. Commented Feb 12, 2013 at 16:36
• That's like estimating how much gas you need in your tank before choosing where you want to go. Commented Feb 12, 2013 at 19:54
• @HighPerformanceMark Suppose i have already proved the correctness of my algorithm, now i want to know how efficient it is, and if not, come up with a better algorithm. I mean, asymptotic time complexities give a bound on the performance, right? I have an algorithm in my mind, and now i want to know it's 'performance' in 'seconds'. Commented Feb 12, 2013 at 20:02
• Actually many coding problems involve 'time limit' (1 sec,2 sec etc) and input constraints. And I have an algorithm, but don't know about its physical running time. That is the motivation of this question. Commented Feb 12, 2013 at 20:04

Since big O complexity ignores linear coefficients and smaller terms, it is impossible to estimate the performance of an algorithm given only its big o complexity.

In fact, for any specific N, you cannot predict which of two given algorithms will execute faster.

For example, O(N) is not always faster than O(N*N) since an algorithm that takes 100000000*n steps is O(N) is slower than an algorithm than takes N*N steps for many small values of N.

These linear coefficients and asymptotically smaller terms vary from platform to platform and even amongst algorithms of the same equivalence class (in terms of big O measure). 3

The problem you are trying to use big O notation for is not the one it is designed to solve.

• Exactly. You need at least one data point before you can even make a guess as to what the linear coefficients are. Commented Feb 12, 2013 at 22:07
• Yeah, but this is not an abstract setting, OP probably has some idea about the linear coefficients. Please don't tell me You would HAVE to code an O(N^2) algorithm to then discard it when N is 1e5 , an You have 2 seconds to process the data. Commented Feb 13, 2013 at 0:47
• I think that i have realised that big-oh indicates how my processing time will change with variation in input size.For actual time i have to write the code.If it doesn't pass the time limit, it means it has to be optimised further...so its better to write as much optimised code using efficient data structures and algorithms as possible...right guys?? Commented Feb 13, 2013 at 15:02
• That's correct. Optimization is heavily grounded in testing- sadly, the fact that you may be using an inefficient algorithm is one of the things you will have to learn to correct for through research. Commented Feb 13, 2013 at 16:54

Instead of dealing with complecity, you might want to have a look at `Worst Case Execution Time` (WCET). This area of research most likely corresponds to what you are looking for.

http://en.wikipedia.org/wiki/Worst-case_execution_time

• I don't think this would be a good approach before an algorithm is written. Commented Feb 12, 2013 at 23:08

Multiply N^2 by the time You spend in an iteration of the innermost loop, and You have a ballpark estimate.

• But this will require OP to write a code, OP explicitly wants to estimate running time before writing code. Commented Feb 12, 2013 at 16:43
• @HighPerformanceMark You can often easily estimate time spent in the innermost loop. Anyway, for O(N^2) with N=100K I wouldn't expect anything less than 10 minutes. Commented Feb 12, 2013 at 16:48