# Estimating the exponent of discrete power law data

Suppose you have data from a discrete power law with exponent α. That is, the probability of an outcome n is proportional to n. How can you recover α?

A naive approach would be to gloss over the fact that you have discrete data and use the MLE (maximum likelihood estimator) for continuous data. That does a very poor job [1]. The discrete case needs its own estimator.

To illustrate this, we start by generating 5,000 samples from a discrete power law with exponent 3.

   import numpy.random

alpha = 3
n = 5000
x = numpy.random.zipf(alpha, n)


The continuous MLE is very simple to implement:

    alpha_hat = 1 + n / sum(log(x))


Unfortunately, it gives an estimate of 6.87 for alpha, though we know it should be around 3.

The MLE for the discrete power law distribution satisfies

Here ζ is the Riemann zeta function, and xi are the samples. Note that the left side of the equation is the derivative of log ζ, or what is sometimes called the logarithmic derivative.

There are three minor obstacles to finding the estimator using Python. First, SciPy doesn’t implement the Riemann zeta function ζ(x) per se. It implements a generalization, the Hurwitz zeta function, ζ(x, q). Here we just need to set q to 1 to get the Riemann zeta function.

Second, SciPy doesn’t implement the derivative of zeta. We don’t need much accuracy, so it’s easy enough to implement our own. See an earlier post for an explanation of the implementation below.

Finally, we don’t have an explicit equation for our estimator. But we can easily solve for it using the bisection algorithm. (Bisect is slow but reliable. We’re not in a hurry, so we might as use something reliable.)

    from scipy import log
from scipy.special import zeta
from scipy.optimize import bisect

xmin = 1

def log_zeta(x):
return log(zeta(x, 1))

def log_deriv_zeta(x):
h = 1e-5
return (log_zeta(x+h) - log_zeta(x-h))/(2*h)

t = -sum( log(x/xmin) )/n
def objective(x):
return log_deriv_zeta(x) - t

a, b = 1.01, 10
alpha_hat = bisect(objective, a, b, xtol=1e-6)
print(alpha_hat)


We have assumed that our data follow a power law immediately from n = 1. In practice, power laws generally fit better after the first few elements. The code above works for the more general case if you set xmin to be the point at which power law behavior kicks in.

The bisection method above searches for a value of the power law exponent between 1.01 and 10, which is somewhat arbitrary. However, power law exponents are very often between 2 and 3 and seldom too far outside that range.

The code gives an estimate of α equal to 2.969, very near the true value of 3, and much better than the naive estimate of 6.87.

Of course in real applications you don’t know the correct result before you begin, so you use something like a confidence interval to give you an idea how much uncertainty remains in your estimate.

The following equation [2] gives a value of σ from a normal approximation to the distribution of our estimator.

So an approximate 95% confidence interval would be the point estimate +/- 2σ.

    from scipy.special import zeta
from scipy import sqrt

def zeta_prime(x, xmin=1):
h = 1e-5
return (zeta(x+h, xmin) - zeta(x-h, xmin))/(2*h)

def zeta_double_prime(x, xmin=1):
h = 1e-5
return (zeta(x+h, xmin) -2*zeta(x,xmin) + zeta(x-h, xmin))/h**2

def sigma(n, alpha_hat, xmin=1):
z = zeta(alpha_hat, xmin)
temp = zeta_double_prime(alpha_hat, xmin)/z
temp -= (zeta_prime(alpha_hat, xmin)/z)**2
return 1/sqrt(n*temp)

print( sigma(n, alpha_hat) )


Here we use a finite difference approximation for the second derivative of zeta, an extension of the idea used above for the first derivative. We don’t need high accuracy approximations of the derivatives since statistical error will be larger than the approximation error.

In the example above, we have α = 2.969 and σ = 0.0334, so a 95% confidence interval would be [2.902, 3.036].

* * *

[1] Using the continuous MLE with discrete data is not so bad when the minimum output xmin is moderately large. But here, where xmin = 1 it’s terrible.

[2] Equation 3.6 from Power-law distributions in empirical data by Aaron Clauset, Cosma Rohilla Shalizi, and M. E. J. Newman.

# Skin in the game for observational studies

The article Deming, data and observational studies by S. Stanley Young and Alan Karr opens with

Any claim coming from an observational study is most likely to be wrong.

They back up this assertion with data about observational studies later contradicted by prospective studies.

Much has been said lately about the assertion that most published results are false, particularly observational studies in medicine, and I won’t rehash that discussion here. Instead I want to cut to the process Young and Karr propose for improving the quality of observational studies. They summarize their proposal as follows.

The main technical idea is to split the data into two data sets, a modelling data set and a holdout data set. The main operational idea is to require the journal to accept or reject the paper based on an analysis of the modelling data set without knowing the results of applying the methods used for the modelling set on the holdout set and to publish an addendum to the paper giving the results of the analysis of the holdout set.

They then describe an eight-step process in detail. One step is that cleaning the data and dividing it into a modelling set and a holdout set would be done by different people than the modelling and analysis. They then explain why this would lead to more truthful publications.

The holdout set is the key. Both the author and the journal know there is a sword of Damocles over their heads. Both stand to be embarrassed if the holdout set does not support the original claims of the author.

* * *

The full title of the article is Deming, data and observational studies: A process out of control and needing fixing. It appeared in the September 2011 issue of Significance.

Update: The article can be found here.

# Balancing profit and learning in A/B testing

A/B testing, or split testing, is commonly used in web marketing to decide which of two design options performs better. If you have so many visitors to a site that the number of visitors used in a test is negligible, conventional randomization schemes are the way to go. They’re simple and effective.

But if you have less traffic so that the number of visitors involved in a test is appreciable, you might be concerned with possible lost revenue during the test itself. The point of A/B testing is to improve profitability after the test, not during the test. If you also want to consider profitability during the test, you might want to consider more alternatives.

My experience with testing comes from a context where the stakes are higher than improving conversion on web sites: treating cancer patients. You want to find out which treatments performed better for the sake of future patients, those who were treated after the randomized trial. But you also want to treat the participants in the clinical trial effectively. Two ways we would do that are early stopping rules and adaptive randomization. Both practices are applicable to A/B testing web pages.

A conventional clinical trial might take a few hundred patients and randomize half to one treatment and half to another. But if one treatment appears to be much more effective, at some point it becomes unconscionable to keep assigning the less effective treatment. So you stop the experiment early. You might want to do the same with web designs. If you planned to show two variations of a page to 500 visitors each, but after 100 visitors it’s obvious which version is performing better, you’d like to stop the test and show everyone the better page. On the other hand, if you have so many visitors that you’re not concerned with what happens to the 1000 visitors in the test, just let the test run to completion.

Another approach is to compromise between equal randomization and early stopping. Suppose A is performing better than B, but not so much better that you’re willing to stop and declare A the winner. You might keep randomizing, but increase the probability that the test will assign A. If A really is better, more visitors will see the better page. But if you’re wrong and B is really better, you may still discover this because some visitors are still seeing B. If B keeps performing better, the tide will turn and the test will prefer it. This is called adaptive randomization. The more evidence there is that one version is better, the higher the probability that you’ll show people that version.

One way to use adaptive randomization is variable experiment sizes. Instead of deciding a test size in advance, you test until you’re satisfied that you’ve found a winner. That may require fewer visitors than a conventional A/B test. It may also require more, but only when there’s a good reason to. The test may go into overtime, so to speak, because the two versions are performing similarly, in which case you’d like to keep testing longer to find which is better.

It’s easy to fall into thinking that the winner of a test will be used forever, whether you’re testing web pages or cancer treatments. But this isn’t the case. The winner will eventually be tested against something else, maybe very soon. This means that you might want to put a little more emphasis on the performance during the test and not just performance after the test, because there may not be much opportunity for performance after the test.

# A rose by any other name: Data science etc.

I help people make decisions in the face of uncertainty. Sounds interesting.

I’m a data scientist. Not sure what that means, but it sounds cool.

I study machine learning. Hmm. Maybe interesting, maybe a little ominous.

I’m into big data. Exciting or passé, depending on how many times you’ve heard the term.

Even though each of these descriptions makes a different impression, they’re all essentially the same thing. You could throw in a few more terms too, like artificial intelligence, inferential science, decision theory, or inverse probability.

There are distinctions. These terms don’t entirely overlap, but the overlap is huge. They all have to do with taking data and making an inference.

“Decision-making under uncertainty” emphasizes that you never have complete data, and yet you need to make decisions anyway. “Decision theory” emphasizes that the whole point of analyzing data is to do something as a result, and suggests that focusing directly on the decision itself, rather than proxies along the way, is the best way to do this.

“Data science” stresses that there is more to the process of making inferences than what falls under the traditional heading of “statistics.” Statistics has never been only about “the grotesque phenomenon generally known as mathematical statistics,” as Francis Anscombe described it. Things like data cleaning and visualization have always been part of the practice of statistics, though not the theory of statistics. Data science also emphasizes the role of computation. Some say a data scientist is a statistician who can program. Some say data science is statistics on a Mac.

Despite the hype around the term data science, it’s growing on me. It has its drawbacks, but so does every other name.

Machine learning, like decision theory, emphasizes the ultimate goal of doing something with data rather than creating an accurate model of the process that generates the data. If you can create such a model, so much the better. But it may not be necessary to have a great model in order to accomplish what you originally set out to do. “Naive Bayes,” for example, is a classification algorithm that is admittedly naive. It knowingly makes a gross simplification, assuming events are independent that we know are certainly not independent, and yet it often works well enough.

“Big data” is a big can of worms. It is often concerned with data sets that are indeed big, but it also implies other things, such as the way the data become available, as a real time stream rather than as a complete static set. See Erik Meijer’s Big data cube. And that’s just when the term “big data” is used in some fairly meaningful way. It’s also used so broadly as to be meaningless.

The term “statistics” literally means the mathematics of the interests of states, as in governments, because these were the first applications of statistics. So while “statistics” may be the most established and perhaps most respectable term discussed here, it’s not great. As I remarked here, “The term statistics would be equivalent to governmentistics, a historically accurate but otherwise useless term.” Statistics emphasizes probability models and mathematical rigor more than other variations on data analysis do. Statisticians criticize machine learning folks for being sloppy. Machine learning folks criticize statisticians for being too conservative, or for being too focused on description and not focused enough on prediction.

Bayesian statistics is much older than what is now sometimes called “classical” statistics. It was essential dormant during the first half of the 20th century before experiencing a renaissance in the second half of the century. Bayesian statistics was originally called “inverse probability” for good reason. Probability theory takes the probabilities of events as given and makes inferences about possible outcomes. Bayesian statistics does the inverse, taking data as given and inferring the probabilities that lead to the data. All statistics does something like this, but Bayesian statistics is consistent in forming all inference directly as probabilities. Frequetist (“classical”) statistics also infers probabilities, but the results, things like p-values and confidence intervals, are not the probabilities of what most people think they are. See Anthony O’Hagan’s description here.

Data analysis has gone by many names over time, sometimes with meaningful distinctions and sometimes not. Often people make a distinction without a difference.

# Data analysis vs statistics

John Tukey preferred the term “data analysis” over “statistics.” In his paper Data Anaysis, Computation and Mathematics, he explains why.

My title speaks of “data analysis” not “statistics”, and of “computation” not “computing science”; it does not speak of “mathematics”, but only last. Why? …

My brother-in-squared-law, Francis J. Anscombe has commented on my use of “data analysis” in the following words:

Whereas the content of Tukey’s remarks is always worth pondering, some of his terminology is hard to take. He seems to identify “statistics” with the grotesque phenomenon generally known as “mathematical statistics”, and finds it necessary to replace “statistical analysis” with “data analysis.”

(Tukey calls Anscombe his “brother-in-squared-law” because Anscombe was a fellow statistician as well as his brother-in-law. At first I thought Tukey had said “brother-in-law-squared”, which could mean his brother-in-law’s brother-in-law, but I suppose it was a pun on the role of least-square methods in statistics.)

Tukey later says

I … shall stick to this attitude today, and shall continue to use the words “data analysis”, in part to indicate that we can take probability seriously, or leave it alone, as may from time to time be appropriate or necessary.

It seems Tukey was reserving the term “statistics” for that portion of data analysis which is rigorously based on probability.

# Quantifying uncertainty

The primary way to quantify uncertainty is to use probability. Subject to certain axioms that aim to capture common-sense rules for quantifying uncertainty, probability theory is essentially the only way. (This is Cox’s theorem.)

Other methods, such as fuzzy logic, may be useful, though they must violate common sense (at least as defined by Cox’s theorem) under some circumstances. They may be still useful when they provide approximately the results that probability would have provided and at less effort and stay away from edge cases that deviate too far from common sense.

There are various kinds of uncertainty, principally epistemic uncertainty (lack of knowledge) and aleatory uncertainty (randomness), and various philosophies for how to apply probability. One advantage to the Bayesian approach is that it handles epistemic and aleatory uncertainty in a unified way.

Blog posts related to quantifying uncertainty:

# Why not statistics

Jordan Ellenberg’s parents were both statisticians. In his interview with Strongly Connected Components Jordan explains why he went into mathematics rather than statistics.

I tried. I tried to learn some statistics actually when I was younger and it’s a beautiful subject. But at the time I think I found the shakiness of the philosophical underpinnings were too scary for me. I felt a little nauseated all the time. Math is much more comfortable. You know where you stand. You know what’s proved and what’s not. It doesn’t have the quite same ethical and moral dimension that statistics has. I was never able to get comfortable with it the way my parents were.

# Bayes factors vs p-values

Bayesian analysis and Frequentist analysis often lead to the same conclusions by different routes. But sometimes the two forms of analysis lead to starkly different conclusions.

The following illustration of this difference comes from a talk by Luis Pericci last week. He attributes the example to “Bernardo (2010)” though I have not been able to find the exact reference.

In an experiment to test the existence of extra sensory perception (ESP), researchers wanted to see whether a person could influence some process that emitted binary data. (I’m going from memory on the details here, and I have not found Bernardo’s original paper. However, you could ignore the experimental setup and treat the following as hypothetical. The point here is not to investigate ESP but to show how Bayesian and Frequentist approaches could lead to opposite conclusions.)

The null hypothesis was that the individual had no influence on the stream of bits and that the true probability of any bit being a 1 is p = 0.5. The alternative hypothesis was that p is not 0.5. There were N = 104,490,000 bits emitted during the experiment, and s = 52,263,471 were 1’s. The p-value, the probability of an imbalance this large or larger under the assumption that p = 0.5, is 0.0003. Such a tiny p-value would be regarded as extremely strong evidence in favor of ESP given the way p-values are commonly interpreted.

The Bayes factor, however, is 18.7, meaning that the null hypothesis appears to be about 19 times more likely than the alternative. The alternative in this example uses Jeffreys’ prior, Beta(0.5, 0.5).

So given the data and assumptions in this example, the Frequentist concludes there is very strong evidence for ESP while the Bayesian concludes there is strong evidence against ESP.

The following Python code shows how one might calculate the p-value and Bayes factor.

from scipy.stats import binom
from scipy import log, exp
from scipy.special import betaln

N = 104490000
s = 52263471

# sf is the survival function, i.e. complementary cdf
# ccdf multiplied by 2 because we're doing a two-sided test
print("p-value: ", 2*binom.sf(s, N, 0.5))

# Compute the log of the Bayes factor to avoid underflow.
logbf = N*log(0.5) - betaln(s+0.5, N-s+0.5) + betaln(0.5, 0.5)
print("Bayes factor: ", exp(logbf))


# Pros and cons of the term “data science”

I’ve resisted using the term “data science,” and enjoy poking fun at it now and then, but I’ve decided it’s not such a bad label after all.

Here are some of the pros and cons of the term. (Listing “cons” first seems backward, but I’m currently leaning toward the pro side, so I thought I should conclude with it.)

## Cons

The term “data scientist” is sometimes used to imply more novelty than is there. There’s not a great deal of difference between data science and statistics, though the new term is more fashionable. (Someone quipped that data science is statistics on a Mac.)

Similarly, the term data scientist is sometimes used as an excuse for ignorance, as in “I don’t understand probability and all that stuff, but I don’t need to because I’m a data scientist, not a statistician.”

The big deal about data science isn’t data but the science of drawing inferences from the data. Inference science would be a better term, in my opinion, but that term hasn’t taken off.

## Pros

Data science could be a useful umbrella term for statistics, machine learning, decision theory, etc. Also, the title data scientist is rightfully associated with people who have better computational skills than statisticians typically have.

While the term data science isn’t perfect, there’s little to recommend the term statistics other than that it is well established. The root of statistics is state, as in a government. This is because statistics was first applied to the concerns of bureaucracies. The term statistics would be equivalent to governmentistics, a historically accurate but otherwise useless term.

# Replace data with measurements

To tell whether a statement about data is over-hyped, see whether it retains its meaning if you replace data with measurements.

So a request like “Please send me the data from your experiment” becomes “Please send me the measurements from your experiment.” Same thing.

But rousing statements about the power of data become banal or even ridiculous.  For example, here’s an article from Forbes after substituting measurements for data:

The Hottest Jobs In IT: Training Tomorrow’s Measurements Scientists

If you thought good plumbers and electricians were hard to find, try getting hold of a measurements scientist. The rapid growth of big measurements and analytics for use within businesses has created a huge demand for people capable of extracting knowledge from measurements.

Some of the top positions in demand include business intelligence analysts, measurements architects, measurements warehouse analysts and measurements scientists, Reed says. “We believe the demand for measurements expertise will continue to grow as more companies look for ways to capitalize on this information,” he says.

# Fitting a triangular distribution

Sometimes you only need a rough fit to some data and a triangular distribution will do. As the name implies, this is a distribution whose density function graph is a triangle. The triangle is determined by its base, running between points a and b, and a point c somewhere in between where the altitude intersects the base. (c is called the foot of the altitude.) The height of the triangle is whatever it needs to be for the area to equal 1 since we want the triangle to be a probability density.

One way to fit a triangular distribution to data would be to set a to the minimum value and b to the maximum value. You could pick a and b are the smallest and largest possible values, if these values are known. Otherwise you could use the smallest and largest values in the data, or make the interval a little larger if you want the density to be positive at the extreme data values.

How do you pick c? One approach would be to pick it so the resulting distribution has the same mean as the data. The triangular distribution has mean

(a + b + c)/3

so you could simply solve for c to match the sample mean.

Another approach would be to pick c so that the resulting distribution has the same median as the data. This approach is more interesting because it cannot always be done.

Suppose your sample median is m. You can always find a point c so that half the area of the triangle lies to the left of a vertical line drawn through m. However, this might require the foot c to be to the left or the right of the base [a, b]. In that case the resulting triangle is obtuse and so sides of the triangle do not form the graph of a function.

For the triangle to give us the graph of a density function, c must be in the interval [a, b]. Such a density has a median in the range

[b – (ba)/√2, a + (ba)/√2].

If the sample median m is in this range, then we can solve for c so that the distribution has median m. The solution is

c = b – 2(bm)2 / (ba)

if m < (a + b)/2 and

c = a + 2(am)2 / (ba)

otherwise.

* * *

# Finding the best dose

In a dose-finding clinical trial, you have a small number of doses to test, and you hope find the one with the best response. Here “best” may mean most effective, least toxic, closest to a target toxicity, some combination of criteria, etc.

Since your goal is to find the best dose, it seems natural to compare dose-finding methods by how often they find the best dose.  This is what is most often done in the clinical trial literature. But this seemingly natural criterion is actually artificial.

Suppose a trial is testing doses of 100, 200, 300, and 400 milligrams of some new drug. Suppose further that on some scale of goodness, these doses rank 0.1, 0.2, 0.5, and 0.51. (Of course these goodness scores are unknown; the point of the trial is to estimate them. But you might make up some values for simulation, pretending with half your brain that these are the true values and pretending with the other half that you don’t know what they are.)

Now suppose you’re evaluating two clinical trial designs, running simulations to see how each performs. The first design picks the 400 mg dose, the best dose, 20% of the time and picks the 300 mg dose, the second best dose, 50% of the time. The second design picks each dose with equal probability. The latter design picks the best dose more often, but it picks a good dose less often.

In this scenario, the two largest doses are essentially equally good; it hardly matters how often a method distinguishes between them. The first method picks one of the two good doses 70% of the time while the second method picks one of the two good doses only 50% of the time.

This example was exaggerated to make a point: obviously it doesn’t matter how often a method can pick the better of two very similar doses, not when it very often picks a bad dose. But there are less obvious situations that are quantitatively different but qualitatively the same.

The goal is actually to find a good dose. Finding the absolute best dose is impossible. The most you could hope for is that a method finds with high probability the best of the four arbitrarily chosen doses under consideration. Maybe the best dose is 350 mg, 843 mg, or some other dose not under consideration.

A simple way to make evaluating dose-finding methods less arbitrary would be to estimate the benefit to patients. Finding the best dose is only a matter of curiosity in itself unless you consider how that information is used. Knowing the best dose is important because you want to treat future patients as effectively as you can. (And patients in the trial itself as well, if it is an adaptive trial.)

Suppose the measure of goodness in the scenario above is probability of successful treatment and that 1,000 patients will be treated at the dose level picked by the trial. Under the first design, there’s a 20% chance that 51% of the future patients will be treated successfully, and a 50% chance that 50% will be. The expected number of successful treatments from the two best doses is 352. Under the second design, the corresponding number is 252.5.

(To simplify the example above, I didn’t say how often the first design picks each of the two lowest doses. But the first design will result in at least 382 expected successes and the second design 327.5.)

You never know how many future patients will be treated according to the outcome of a clinical trial, but there must be some implicit estimate. If this estimate is zero, the trial is not worth conducting. In the example given here, the estimate of 1,000 future patients is irrelevant: the future patient horizon cancels out in a comparison of the two methods. The patient horizon matters when you want to include the benefit to patients in the trial itself. The patient horizon serves as a way to weigh the interests of current versus future patients, an ethically difficult comparison usually left implicit.

# Probability approximations

This week’s resource post lists notes on probability approximations.

Do we even need probability approximations anymore? They’re not as necessary for numerical computation as they once were, but they remain vital for understanding the behavior of probability distributions and for theoretical calculations.

Textbooks often leave out details such as quantifying the error when discussion approximations. The following pages are notes I wrote to fill in some of these details when I was teaching.

Last week: Numerical computing resources

Next week: Miscellaneous math notes

# More data, less accuracy

Statistical methods should do better with more data. That’s essentially what the technical term “consistency” means. But with improper numerical techniques, the the numerical error can increase with more data, overshadowing the decreasing statistical error.

There are three ways Bayesian posterior probability calculations can degrade with more data:

1. Polynomial approximation
2. Missing the spike
3. Underflow

Elementary numerical integration algorithms, such as Gaussian quadrature, are based on polynomial approximations. The method aims to exactly integrate a polynomial that approximates the integrand. But likelihood functions are not approximately polynomial, and they become less like polynomials when they contain more data. They become more like a normal density, asymptotically flat in the tails, something no polynomial can do. With better integration techniques, the integration accuracy will improve with more data rather than degrade.

With more data, the posterior distribution becomes more concentrated. This means that a naive approach to integration might entirely miss the part of the integrand where nearly all the mass is concentrated. You need to make sure your integration method is putting its effort where the action is. Fortunately, it’s easy to estimate where the mode should be.

The third problem is that software calculating the likelihood function can underflow with even a moderate amount of data. The usual solution is to work with the logarithm of the likelihood function, but with numerical integration the solution isn’t quite that simple. You need to integrate the likelihood function itself, not its logarithm. I describe how to deal with this situation in Avoiding underflow in Bayesian computations.