# Empirically estimating big-oh time efficiency

## Background

I'd like to estimate the big-oh performance of some methods in a library through benchmarks. I don't need precision -- it suffices to show that something is O(1), O(logn), O(n), O(nlogn), O(n^2) or worse than that. Since big-oh means upper-bound, estimating O(logn) for something that is O(log logn) is not a problem.

Right now, I'm thinking of finding the constant multiplier k that best fits data for each big-oh (but will top all results), and then choosing the big-oh with the best fit.

## Questions

1. Are there better ways of doing it than what I'm thiking of? If so, what are they?
2. Otherwise, can anyone point me to the algorithms to estimate k for best fitting, and comparing how well each curve fits the data?

## Notes & Constraints

Given the comments so far, I need to make a few things clear:

• This needs to be automated. I can't "look" at data and make a judgment call.
• I'm going to benchmark the methods with multiple `n` sizes. For each size `n`, I'm going to use a proven benchmark framework that provides reliable statistical results.
• I actually know beforehand the big-oh of most of the methods that will be tested. My main intention is to provide performance regression testing for them.
• The code will be written in Scala, and any free Java library can be used.

## Example

Here's one example of the kind of stuff I want to measure. I have a method with this signature:

``````def apply(n: Int): A
``````

Given an `n`, it will return the nth element of a sequence. This method can have O(1), O(logn) or O(n) given the existing implementations, and small changes can get it to use a suboptimal implementation by mistake. Or, more easily, could get some other method that depends on it to use a suboptimal version of it.

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Can you avoid finding your k by just comparing runs for various input sizes? e.g. running a binary search many times on sorted lists of size 100, 1000, 10000, 100000, etc, should eventually show the pattern you're looking for... –  Rob I Jan 12 '12 at 14:13
Maybe you could obtain a factor k for a set of one element, and calculate the different estimated values for k*O(f(n)) and find the immediate upper bound for each method? This way you have the worst case f(n)? –  fge Jan 12 '12 at 14:17
I wonder if it would be at all possible to parse the code to automatically calculate the possible big-Oh. That would be pretty cool! The method you suggested seems like the best approach though. –  Jaco Van Niekerk Jan 12 '12 at 14:17
@JacoVanNiekerk: In the general case, such a thing is not possible. (At least, it's not possible if the library is written in a Turing-complete language, and the question's `java` and `scala` tags imply that it is!) –  ruakh Jan 12 '12 at 14:22
The problem with that is for "small" inputs everyting is O(1). The real question is what is "small", i.e. when do you start getting benefits from your algorithm being, say, O(n log n). Some algorithms start showing their performance with inputs of size 100 while others need 10^1000: log(log(10^1000)) is less than 10 –  Igor Korkhov Jan 12 '12 at 14:25

In order to get started, you have to make a couple of assumptions.

1. `n` is large compared to any constant terms.
2. You can effectively randomize your input data
3. You can sample with sufficient density to get a good handle on the distribution of runtimes

In particular, (3) is difficult to achieve in concert with (1). So you may get something with an exponential worst case, but never run into that worst case, and thus think your algorithm is much better than it is on average.

With that said, all you need is any standard curve fitting library. Apache Commons Math has a fully adequate one. You then either create a function with all the common terms that you want to test (e.g. constant, log n, n, n log n, n*n, n*n*n, e^n), or you take the log of your data and fit the exponent, and then if you get an exponent not close to an integer, see if throwing in a log n gives a better fit.

(In more detail, if you fit `C*x^a` for `C` and `a`, or more easily `log C + a log x`, you can get the exponent `a`; in the all-common-terms-at-once scheme, you'll get weights for each term, so if you have `n*n + C*n*log(n)` where `C` is large, you'll pick up that term also.)

You'll want to vary the size by enough so that you can tell the different cases apart (might be hard with log terms, if you care about those), and safely more different sizes than you have parameters (probably 3x excess would start being okay, as long as you do at least a dozen or so runs total).

Edit: Here is Scala code that does all this for you. Rather than explain each little piece, I'll leave it to you to investigate; it implements the scheme above using the C*x^a fit, and returns ((a,C),(lower bound for a, upper bound for a)). The bounds are quite conservative, as you can see from running the thing a few times. The units of `C` are seconds (`a` is unitless), but don't trust that too much as there is some looping overhead (and also some noise).

``````class TimeLord[A: ClassManifest,B: ClassManifest](setup: Int => A, static: Boolean = true)(run: A => B) {
@annotation.tailrec final def exceed(time: Double, size: Int, step: Int => Int = _*2, first: Int = 1): (Int,Double) = {
var i = 0
val elapsed = 1e-9 * {
if (static) {
val a = setup(size)
var b: B = null.asInstanceOf[B]
val t0 = System.nanoTime
var i = 0
while (i < first) {
b = run(a)
i += 1
}
System.nanoTime - t0
}
else {
val starts = if (static) { val a = setup(size); Array.fill(first)(a) } else Array.fill(first)(setup(size))
val t0 = System.nanoTime
var i = 0
while (i < first) {
i += 1
}
System.nanoTime - t0
}
}
if (time > elapsed) {
val second = step(first)
if (second <= first) throw new IllegalArgumentException("Iteration size increase failed: %d to %d".format(first,second))
else exceed(time, size, step, second)
}
else (first, elapsed)
}

def multibench(smallest: Int, largest: Int, time: Double, n: Int, m: Int = 1) = {
if (m < 1 || n < 1 || largest < smallest || (n>1 && largest==smallest)) throw new IllegalArgumentException("Poor choice of sizes")
val frac = (largest.toDouble)/smallest
(0 until n).map(x => (smallest*math.pow(frac,x/((n-1).toDouble))).toInt).map{ i =>
val (k,dt) = exceed(time,i)
if (m==1) i -> Array(dt/k) else {
i -> ( (dt/k) +: (1 until m).map(_ => exceed(time,i,first=k)).map{ case (j,dt2) => dt2/j }.toArray )
}
}.foldLeft(Vector[(Int,Array[Double])]()){ (acc,x) =>
if (acc.length==0 || acc.last._1 != x._1) acc :+ x
else acc.dropRight(1) :+ (x._1, acc.last._2 ++ x._2)
}
}

def alpha(data: Seq[(Int,Array[Double])]) = {
// Use Theil-Sen estimator for calculation of straight-line fit for exponent
// Assume timing relationship is t(n) = A*n^alpha
val dat = data.map{ case (i,ad) => math.log(i) -> ad.map(x => math.log(i) -> math.log(x)) }
val slopes = (for {
i <- dat.indices
j <- ((i+1) until dat.length)
(pi,px) <- dat(i)._2
(qi,qx) <- dat(j)._2
} yield (qx - px)/(qi - pi)).sorted
val mbest = slopes(slopes.length/2)
val mp05 = slopes(slopes.length/20)
val mp95 = slopes(slopes.length-(1+slopes.length/20))
val intercepts = dat.flatMap{ case (i,a) => a.map{ case (li,lx) => lx - li*mbest } }.sorted
val bbest = intercepts(intercepts.length/2)
((mbest,math.exp(bbest)),(mp05,mp95))
}
}
``````

Note that the `multibench` method is expected to take about sqrt(2)*n*m*time to run, assuming that static initialization data is used and is relatively cheap compared to whatever you're running. Here are some examples with parameters chosen to take ~15s to run:

``````val tl1 = new TimeLord(x => List.range(0,x))(_.sum)  // Should be linear
// Try list sizes 100 to 10000, with each run taking at least 0.1s;
// use 10 different sizes and 10 repeats of each size
scala> tl1.alpha( tl1.multibench(100,10000,0.1,10,10) )
res0: ((Double, Double), (Double, Double)) = ((1.0075537890632216,7.061397125245351E-9),(0.8763463348353099,1.102663784225697))

val longList = List.range(0,100000)
val tl2 = new TimeLord(x=>x)(longList.apply)    // Again, should be linear
scala> tl2.alpha( tl2.multibench(100,10000,0.1,10,10) )
res1: ((Double, Double), (Double, Double)) = ((1.4534378213477026,1.1325696181862922E-10),(0.969955396265306,1.8294175293676322))

// 1.45?!  That's not linear.  Maybe the short ones are cached?
scala> tl2.alpha( tl2.multibench(9000,90000,0.1,100,1) )
res2: ((Double, Double), (Double, Double)) = ((0.9973235607566956,1.9214696731124573E-9),(0.9486294398193154,1.0365312207345019))

// Let's try some sorting
val tl3 = new TimeLord(x=>Vector.fill(x)(util.Random.nextInt))(_.sorted)
scala> tl3.alpha( tl3.multibench(100,10000,0.1,10,10) )
res3: ((Double, Double), (Double, Double)) = ((1.1713142886974603,3.882658025586512E-8),(1.0521099621639414,1.3392622111121666))
// Note the log(n) term comes out as a fractional power
// (which will decrease as the sizes increase)

// Maybe sort some arrays?
// This may take longer to run because we have to recreate the (mutable) array each time
val tl4 = new TimeLord(x=>Array.fill(x)(util.Random.nextInt), false)(java.util.Arrays.sort)
scala> tl4.alpha( tl4.multibench(100,10000,0.1,10,10) )
res4: ((Double, Double), (Double, Double)) = ((1.1216172965292541,2.2206198821180513E-8),(1.0929414090177318,1.1543697719880128))

// Let's time something slow
def kube(n: Int) = (for (i <- 1 to n; j <- 1 to n; k <- 1 to n) yield 1).sum
val tl5 = new TimeLord(x=>x)(kube)
scala> tl5.alpha( tl5.multibench(10,100,0.1,10,10) )
res5: ((Double, Double), (Double, Double)) = ((2.8456382116915484,1.0433534274508799E-7),(2.6416659356198617,2.999094292838751))
// Okay, we're a little short of 3; there's constant overhead on the small sizes
``````

Anyway, for the stated use case--where you are checking to make sure the order doesn't change--this is probably adequate, since you can play with the values a bit when setting up the test to make sure they give something sensible. One could also create heuristics that search for stability, but that's probably overkill.

(Incidentally, there is no explicit warmup step here; the robust fitting of the Theil-Sen estimator should make it unnecessary for sensibly large benchmarks. This also is why I don't use any other benching framework; any statistics that it does just loses power from this test.)

Edit again: if you replace the `alpha` method with the following:

``````  // We'll need this math
@inline private[this] def sq(x: Double) = x*x
final private[this] val inv_log_of_2 = 1/math.log(2)
@inline private[this] def log2(x: Double) = math.log(x)*inv_log_of_2
import math.{log,exp,pow}

// All the info you need to calculate a y value, e.g. y = x*m+b
case class Yp(x: Double, m: Double, b: Double) {}

// Estimators for data order
//   fx = transformation to apply to x-data before linear fitting
//   fy = transformation to apply to y-data before linear fitting
//   model = given x, slope, and intercept, calculate predicted y
case class Estimator(fx: Double => Double, invfx: Double=> Double, fy: (Double,Double) => Double, model: Yp => Double) {}
// C*n^alpha
val alpha = Estimator(log, exp, (x,y) => log(y), p => p.b*pow(p.x,p.m))
// C*log(n)*n^alpha
val logalpha = Estimator(log, exp, (x,y) =>log(y/log2(x)), p => p.b*log2(p.x)*pow(p.x,p.m))

// Use Theil-Sen estimator for calculation of straight-line fit
case class Fit(slope: Double, const: Double, bounds: (Double,Double), fracrms: Double) {}
def theilsen(data: Seq[(Int,Array[Double])], est: Estimator = alpha) = {
// Use Theil-Sen estimator for calculation of straight-line fit for exponent
// Assume timing relationship is t(n) = A*n^alpha
val dat = data.map{ case (i,ad) => ad.map(x => est.fx(i) -> est.fy(i,x)) }
val slopes = (for {
i <- dat.indices
j <- ((i+1) until dat.length)
(pi,px) <- dat(i)
(qi,qx) <- dat(j)
} yield (qx - px)/(qi - pi)).sorted
val mbest = slopes(slopes.length/2)
val mp05 = slopes(slopes.length/20)
val mp95 = slopes(slopes.length-(1+slopes.length/20))
val intercepts = dat.flatMap{ _.map{ case (li,lx) => lx - li*mbest } }.sorted
val bbest = est.invfx(intercepts(intercepts.length/2))
val fracrms = math.sqrt(data.map{ case (x,ys) => ys.map(y => sq(1 - y/est.model(Yp(x,mbest,bbest)))).sum }.sum / data.map(_._2.length).sum)
Fit(mbest, bbest, (mp05,mp95), fracrms)
}
``````

then you can get an estimate of the exponent when there's a log term also--error estimates exist to pick whether the log term or not is the correct way to go, but it's up to you to make the call (i.e. I'm assuming you'll be supervising this initially and reading the numbers that come off):

``````val tl3 = new TimeLord(x=>Vector.fill(x)(util.Random.nextInt))(_.sorted)
val timings = tl3.multibench(100,10000,0.1,10,10)

// Regular n^alpha fit
scala> tl3.theilsen( timings )
res20: tl3.Fit = Fit(1.1811648421030059,3.353753446942075E-8,(1.1100382697696545,1.3204652930525234),0.05927994882343982)

// log(n)*n^alpha fit--note first value is closer to an integer
//   and last value (error) is smaller
scala> tl3.theilsen( timings, tl3.logalpha )
res21: tl3.Fit = Fit(1.0369167329732445,9.211366397621766E-9,(0.9722967182484441,1.129869067913768),0.04026308919615681)
``````

(Edit: fixed the RMS computation so it's actually the mean, plus demonstrated that you only need to do timings once and can then try both fits.)

-
This is pretty cool, though I'm a bit wary of its effectiveness for log terms. I'll try it out. –  Daniel C. Sobral Jan 22 '12 at 21:20
@DanielC.Sobral - It's kind of tricky to experimentally distinguish log terms from small fractional powers, especially when things like cache locality can have a big impact on smaller sizes. I guess I could add a log estimator and report the median error on each. –  Rex Kerr Jan 22 '12 at 22:09
@DanielC.Sobral - You can now specify that it should assume a log term (see new code and new example). –  Rex Kerr Jan 25 '12 at 12:33
Awesome answer. –  Daniel C. Sobral Jan 26 '12 at 12:21

We have lately implemented a tool that does semi-automated average runtime analysis for JVM code. You do not even have to have access to the sources. It is not published yet (still ironing out some usability flaws) but will be soon, I hope.

It is based on this approach. In short, byte code is augmented with cost counters. The target algorithm is then run (distributed, if you want) on a bunch of inputs whose distribution you control. The aggregated counters are extrapolated to functions using involved heuristics (method of least squares on crack, sort of). From those, more science leads to an estimate for the average runtime asymptotics (`3.576n - 1.23log(n) + 1.7`, for instance). For example, the method is able to reproduce rigorous classic analyses done by Knuth and Sedgewick with high precision.

The big advantage of this method compared to what others post is that you are independent of time estimates, that is in particular independent of machine, virtual machine and even programming language. You really get information about your algorithm, without all the noise.

And---probably the killer feature---it comes with a complete GUI that guides you through the whole process.

You can find a preliminary website (including a beta version of the tool and the papers published) here.

(Note that average runtime can be estimated that way while worst case runtime can never be, except in case you know the worst case. If you do, you can use the average case for worst case analysis; just feed the tool only worst case instances. In general, runtime bounds can not be decided, though.)

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Uhh, aren't we all interested? –  Indolering Oct 25 '12 at 3:00
@Indolering Apparently not, given that it took nine months for a request to pop up. :) By now, we have a website and a paper coming out; see the edit. Papers are added to the list as they appear. –  Raphael Oct 25 '12 at 7:42

If you are happy to estimate this empirically, you can measure how long it takes to do exponentially increasing numbers of operations. Using the ratio you can get which function you estimate it to be.

e.g. if the ratio of 1000 operations to 10000 operations (10x) is (test the longer one first) You need to do a realistic number of operations to see what the order is for the range you have.

• 1x => O(1)
• 1.2x => O(ln ln n)
• ~ 2-5x => O(ln n)
• 10x => O(n)
• 20-50x => O(n ln n)
• 100x => O(n ^ 2)

Its is just an estimate as time complexity is intended for an ideal machine and something should can be mathematically proven rather than measures.

e.g. Many people tried to prove empirically that PI is a fraction. When they measured the ratio of circumference to diameter for circles they had made it was always a fraction. Eventually, it was generally accepted that PI is not a fraction.

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This is absolutely insufficient to determine runtime complexity. Let's for example consider a function with execution time Y and input size X. Let `Y(X) = aX^2 + bX + C` and let the coefficients be `a = 1, b = (10 - 11 * 10^7) / 10^4, c = 10^7`. This is clearly of O(X^2) complexity, as there is an X^2 term. However, if we investigate the execution times you mentioned, we see that: `Y(1000) = 1` and `Y(10000) = 10`. So, your classification strategy would incorrectly classify this as O(X). –  Alderath Jan 25 '12 at 9:00
Sure, that function was constructed in order to fulfil `Y(1000) = 1` and `Y(10000) = 10` and the coefficients might be rather unnatural for any useful real algorithm (but it is surely possible to construct silly algorithms which approximately have that execution time function). However, the main point was that it is insufficient to assume that e.g. an O(N^2) algorithm has only O(N^2) terms in the function which describes execution time. The fact that there might be other terms will make this estimation strategy inaccurate. –  Alderath Jan 25 '12 at 11:45
You need to perform a realistic number of operations to perform the test. If you will never do more than 10,000 operations and it scales O(n) over that range, how does knowing that you could get o(n^2) if only you attempted much more operations help you? –  Peter Lawrey Jan 25 '12 at 12:00
Pi is a ratio of two magnitudes, which qualifies it as a number and a fraction. It is an irrational number, but it can be represented by continued/recursive fractions. –  Indolering Oct 25 '12 at 2:58

I don't think your approach will work in general.

The problem is that "big O" complexity is based on a limit as some scaling variable tends to infinity. For smaller values of that variable, the performance behavior can appear to fit a different curve entirely.

The problem is that with an empirical approach you can never know if the scaling variable is large enough for the limit to be apparent in the results.

Another problem is that if you implement this in Java / Scala, you have to go to considerable lengths to eliminate distortions and "noise" in your timings due to things like JVM warmup (e.g. class loading, JIT compilation, heap resizing) and garbage collection.

Finally, nobody is going to place much trust in empirical estimates of complexity. Or at least, they wouldn't if they understood the mathematics of complexity analysis.

FOLLOWUP

In response to this comment:

Your estimate's significance will improve drastically the more and larger samples you use.

This is true, though my point is that you (Daniel) haven't factored this in.

Also, runtime functions typically have special characteristics which can be exploited; for example, algorithms tend to not change their behaviour at some huge n.

For simple cases, yes.

For complicated cases and real world cases, that is a dubious assumption. For example:

• Suppose some algorithm uses a hash table with a large but fixed-sized primary hash array, and uses external lists to deal with collisions. For N (== number of entries) less than the size of the primary hash array, the behaviour of most operations will appear to be `O(1)`. The true `O(N)` behaviour can only be detected by curve fitting when N gets much larger than that.

• Suppose that the algorithm uses a lot of memory or network bandwidth. Typically, it will work well until you hit the resource limit, and then performance will tail off badly. How do you account for this? If it is part of the "empirical complexity", how do you make sure that you get to the transition point? If you want to exclude it, how do you do that?

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Your estimate's significance will improve drastically the more and larger samples you use. Also, runtime functions typically have special characteristics which can be exploited; for example, algorithms tend to not change their behaviour at some huge `n`. –  Raphael Jan 12 '12 at 22:10
I've never seen someone publish caveats for big-O time efficiency as you've mentioned for a hash table with a fixed-size array or an algorithm that uses a lot of memory/network bandwidth. The values I've seen always seem to assume an unlimited amount of bandwidth/memory. Granted, this isn't realistic, but perhaps it's out-of-scope for this notation. –  Gili Jan 24 '12 at 0:20
@Gili - the question is about empirically estimating implementations of algorithms. (You can't run an algorithm without an implementation, and you can't measure it if you can't run it.) If we are talking about running real implementations of algorithms, then (in general) you have to take memory usage into account because it impacts on the time measurements. –  Stephen C Jan 26 '12 at 13:10

I actually know beforehand the big-oh of most of the methods that will be tested. My main intention is to provide performance regression testing for them.

This requirement is key. You want to detect outliers with minimal data (because testing should be fast, dammit), and in my experience fitting curves to numerical evaluations of complex recurrences, linear regression and the like will overfit. I think your initial idea is a good one.

What I would do to implement it is prepare a list of expected complexity functions g1, g2, ..., and for data f, test how close to constant f/gi + gi/f is for each i. With a least squares cost function, this is just computing the variance of that quantity for each i and reporting the smallest. Eyeball the variances at the end and manually inspect unusually poor fits.

-

For an empiric analysis of the complexity of the program, what you would do is run (and time) the algorithm given 10, 50, 100, 500, 1000, etc input elements. You can then graph the results and determine the best-fit function order from the most common basic types: constant, logarithmic, linear, nlogn, quadratic, cubic, higher-polynomial, exponential. This is a normal part of load testing, which makes sure that the algorithm is first behaving as theorized, and second that it meets real-world performance expectations despite its theoretical complexity (a logarithmic-time algorithm in which each step takes 5 minutes is going to lose all but the absolute highest-cardinality tests to a quadratic-complexity algorithm in which each step is a few millis).

EDIT: Breaking it down, the algorithm is very simple:

Define a list, N, of various cardinalities for which you want to evaluate performance (10,100,1000,10000 etc)

For each element X in N:

Create a suitable set of test data that has X elements.

Start a stopwatch, or determine and store the current system time.

Run the algorithm over the X-element test set.

Stop the stopwatch, or determine the system time again.

The difference between start and stop times is your algorithm's run time over X elements.

Repeat for each X in N.

Plot the results; given X elements (x-axis), the algorithm takes T time (y-axis). The closest basic function governing the increase in T as X increases is your Big-Oh approximation. As was stated by Raphael, this approximation is exactly that, and will not get you very fine distinctions such as coefficients of N, that could make the difference between a N^2 algorithm and a 2N^2 algorithm (both are technically O(N^2) but given the same number of elements one will perform twice as fast).

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Well, yes, that is what I said my plan was. So, where is the information about the specific algorithms I need to do it? :-) –  Daniel C. Sobral Jan 12 '12 at 19:54
Yea, because I can give 10 plots you can not reliably gauge the complexity from. Try separating `n^2` from `n^(7/3)`, for instance. We encountered stuff as weird as this (granted, on precise data sets, not noisy time measurements). –  Raphael Jan 12 '12 at 22:27
Big-Oh is always an estimation. I wouldn't even try to distinguish N^2 from N^(7/3); empirically, both look closer to N^2 than N^3, so if you wanted an empiric estimation you'd get N^2. Such fine distinctions as N^2.3333 would be theoretically derived by execution path analysis. –  KeithS Jan 16 '12 at 16:44

I'm not sure I get 100% what you want. But I understand that you test your own code, so you can modify it, e.g. inject observing statements. Otherwise you could use some form of aspect weaving?

How about adding resetable counters to your data structures and then increase them each time a particular sub-function is invoked? You could make those counting `@elidable` so they will be gone in the deployed library.

Then for a given method, say `delete(x)`, you would test that with all sorts of automatically generated data sets, trying to give them some skew, etc., and gather the counts. While as Igor points out you cannot verify that the data structure won't ever violate a big-O bound, you will at least be able to assert that in the actual experiment a given limit count is never exceeded (e.g. going down a node in a tree is never done more than `4 * log(n)` times) -- so you can detect some mistakes.

Of course, you would need certain assumptions, e.g. that calling a method is O(1) in your computer model.

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Your reasining is flawed, because you can never really conclude an upper bound from finitely many measurements. Your human guess will often be correct, though; it's just hard to do and justify numerically. Method of least squares is sth you can try together with counter data; you'll have to be prepared to try lots of functions, though, as coefficients and dominated terms heavily affect least square scores. –  Raphael Jan 12 '12 at 22:28
My reasoning is not flawed. I am saying that you cannot prove positively that the structure obeys to an upper bound. But you can eliminate mistakes by observing negatively violations of the assumed counts of the involved steps of an algorithm. –  0__ Jan 12 '12 at 22:30
I can bound any finite data set by `c*log(n)` for some `c`. How do you say it is a worse bound than `d*n` in a given situation? –  Raphael Jan 12 '12 at 22:32
@Raphael: even worse than that: I can bound any finite data set by some (possibly very large) constant `C`, and mistakenly conclude that any algorithm is either O(1) or never stops. Having said that I do think that the practical side of the OP's problem is very interesting. –  Igor Korkhov Jan 12 '12 at 23:27
Maybe I'm missing something. But let's say I implement an algorithm that according to a proof in a paper is bound takes no more than `m * log n` steps. Then I can make observations of my implementation and discard bugs by asserting that no more than `m log n` steps have been carried out. This is a bug elimination procedure, by its nature it doesn't guarantee that there are no bugs left. But I don't think that was the question. Note that `c` is not some constant but a defined constant. –  0__ Jan 13 '12 at 0:38
show 1 more comment

Change the terminology that you are using to: "estimate the runtime of the algorithm" or "setup performance regression testing"

Can you estimate the runtime of the algorithm? Well you propose to try different input sizes and measure either some critical operation or the time it takes. Then for the series of input sizes you plan to programmaticly estimate if the algorithm's runtime has no growth, constant growth, exponential growth etc.

So you have two problems, running the tests, and programmatically estimating the growth rate as you input set grows. This sounds like a reasonable task.

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@IgorKorkhov - Probably things like accidentally introducing a `n^2` term into a previously `n log n` algorithm. –  Rex Kerr Jan 12 '12 at 15:37