In the latest two posts, we have needed to find the percentage points for a chi square random variable when the parameter ν, the number of degrees of freedom, is large.

In Volume 2 of Knuth’s magnum opus TAOCP, he gives a table of percentage points for the chi square distribution for small values of ν and he gives an asymptotic approximation to be used for values of ν > 30.

Knuth’s series is

where x_p is the corresponding percentage point function for a normal random variable. Knuth gives a few values of x_p in his table.

What Knuth calls x_p, I called p in the previous post. The approximation I gave, based on Fisher’s transformation to make the chi squared more like a normal, is similar to Knuth’s series, but not the same.

So which approximation is better? Where does Knuth’s approximation come from?

Comparing approximations

We want to find the quantiles for χ²(100) for p = 0.01 through 0.99. Both Fisher’s approximation and Knuth’s approximation are good enough that it’s hard to tell the curves apart visually when the exact values are plotted along with the two approximations.

But when you subtract off the exact values and just look at the errors, it’s clear that Knuth’s approximation is much better in general.

Here’s another plot, taking the absolute value of the error. This makes it easier to see little regions where Fisher’s approximation happens to be better.

Here are a couple more plots comparing the approximations at more extreme probabilities. First the left tail:

And then the right tail:

Derivation

The table mentioned above says to see exercise 16 in the same section, which in turn refers to Theorem 1.2.11.3A in Volume 1 of TAOCP. There Knuth derives an asymptotic series which is not directly the one above, but does most of the work. The exercise asks the reader to finish the derivation.

In the previous post I needed to know the tail percentile points for a chi squared distribution with a huge number of degrees of freedom. When the number of degrees of freedom ν is large, a chi squared random variable has approximately a normal distribution with the same mean and variance, namely mean ν and variance 2ν.

In that post, ν was 9999 and we needed to find the 2.5 and 97.5 percentiles. Here are the percentiles for χ²(9999):

    >>> chi2(9999).ppf([0.025, 0.975])
    array([ 9723.73223701, 10278.05632026])

And here are the percentiles for N(9999, √19998):

    >>> norm(9999, (2*9999)**0.5).ppf([0.025, 0.975])
    array([ 9721.83309451, 10276.16690549])

So the results on the left end agree to three significant figures and the results on the right agree to four.

Fewer degrees of freedom

When ν is more moderate, say ν = 30, the normal approximation is not so hot. (We’re stressing the approximation by looking fairly far out in the tails. Closer to the middle the fit is better.)

Here are the results for χ²(30):

    >>> chi2(30).ppf([0.025, 0.975])
    array([16.79077227, 46.97924224])

And here are the results for N(30, √60):

    >>> norm(30, (60)**0.5).ppf([0.025, 0.975])
    array([14.81818426, 45.18181574])

The normal distribution is symmetric and the chi squared distribution is not, though it becomes more symmetric as ν → ∞. Transformations of the chi squared distribution that make it more symmetric may also improve the approximation accuracy. That wasn’t important when we had ν = 9999, but it is more important when ν = 30.

Fisher transformation

If X ~ χ²(ν), Fisher suggested the approximation √(2X) ~ N(√(2ν − 1), 1).

Let Y be a N(√(2ν − 1), 1) random variable and Z a standard normal random variable, N(0, 1). Then we can estimate χ² probabilities from normal probabilities.

So if we want to find the percentage points for X, we can solve for corresponding percentage points for Z.

If z is the point where P(Z ≤ z) = p, then

is the point where P(X ≤ x) = p.

If we use this to find the 2.5 and 97.5 percentiles for a χ²(30) random variable, we get 16.36 and 46.48, an order of magnitude more accurate than before.

When ν = 9999, the Fisher transformation gives us percentiles that are two orders of magnitude more accurate than before.

Wilson–Hilferty transformation

If X ~ χ²(ν), the Wilson–Hilferty transformation is (X/ν)^1/3 is approximately normal with mean 1 − 2/9ν and variance 2/9ν.

This transformation is a little more complicated than the Fisher transform, but also more accurate. You could go through calculations similar to those above to approximate percentage points using the Wilson–Hilferty transformation.

The main use for approximations like this is now for analytical calculations; software packages can give accurate numerical results. For analytical calculation, the simplicity of the Fisher transformation may outweigh the improve accuracy of the Wilson-Hilferty transformation.

Related posts

• Poisson approximation to binomial distribution
• Normal approximation to gamma distribution
• Diagram of probability distribution relationships

In the previous post, I did a simulation to illustrate a theorem about the number of steps needed in the Euclidean algorithm. The distribution of the number of steps is asymptotically normal, and for numbers 0 < a < b < x the mean is asymptotically

12 log(2) log(x) / π².

What about the variance? The reference cited in the previous post [1] gives an expression for the variance, but it’s complicated. The article said the variance is close to a constant times log x, where that constant involves the second derivative of “a certain pseudo zeta function associated with continued fractions.”

So let’s estimate the variance empirically. We can easily compute the sample variance to get an unbiased point estimate of the population variance, but how can we judge how accurate this point estimate is? We’d need the variance of our estimate of variance.

When I taught statistics classes, this is where students would struggle. There are levels of randomness going on. We have some random process. (Algorithm run times are not really random, but we’ll let that slide.)

We have a statistic S², the sample variance, which is computed from samples from a random process, so our statistic is itself a random variable. As such, it has a mean and a variance. The mean of S² is the population variance; that’s what it means for a statistic to be an unbiased estimator.

The statistic S² has a known distribution, which we can use to create a confidence interval. Namely,

where the chi squared random variable has n − 1 degrees of freedom. Here n is the number of samples and σ² is the population variance. But wait, isn’t the whole purpose of this discussion to estimate σ² because we don’t know what it is?!

This isn’t quite circular reasoning. More like iterative reasoning. We have an estimate of σ² which we then turn around and use in constructing its confidence interval. It’s not perfect, but it’s useful.

A (1 − α) 100% confidence interval is given by

Notice that the right tail probability appears on the left end of the interval and the left tail probability appears on the right end of the interval. The order flips because they’re in a denominator.

I modified the simulation code from the previous post to compute the sample standard deviation for the runs, and got 4.6926, which corresponds to a sample variance of 22.0205. There were 10,000 reps, so our chi squared distribution has 9,999 degrees of freedom. We can compute the confidence interval as follows.

>>> from scipy.stats import chi2
>>> 9999*22.0205/chi2.ppf([0.975, 0.025], 9999)

This says a 95% confidence interval for the variance, in one particular simulation run, was [21.42, 22.64].

The result in [1] said that the variance is proportional to log x, and in our case n = 2⁶³ because that post simulated random numbers up to that limit. We can estimate that the proportionality constant is 63 log(2)/22.0205 = 0.5042. In other words, the variance is about half of log x.

The theorem in [1] gives us the asymptotic variance. If we used a bigger value of x, the variance could be a little different, but I expect it would be around 0.5 log x.

Related posts

• Chi squared and goodness of fit
• Chi squared and Benford’s law
• Chi squared and fake primes

[1] Doug Hensley. The Number of Steps in the Euclidean Algorithm. Journal of Number Theory 49. 142–182 (1994).

The previous post presented an approximation

for −1 ≤ x ≤ 1 and said that it was related to a probability function. This post will make the connect explicit.

Let X be a normally distributed random variable with mean μ and variance σ². Then the CDF of X is

So if μ = 0 and σ² = 1/2 then we have the following.

Here’s Python code to show how good the approximation is.

    from numpy import sin, linspace, sqrt, pi
    from scipy.stats import norm
    import matplotlib.pyplot as plt

    x = linspace(-1, 1, 200)
    X = norm(0, sqrt(0.5))
    plt.plot(x, X.cdf(x) - X.cdf(0))
    plt.plot(x, sin(sin(x))/sqrt(pi))
    plt.legend(["exact", "approx"])
    plt.xlabel("$x$")
    plt.ylabel(r"$P(X \leq x)$")

Here’s the resulting plot:

The orange curve for the plot of the approximation completely covers the blue curve of the exact value. The two curves are the same to within the resolution of the plot. See the previous post for a detailed error analysis.

The other day I was looking at how many lumens LED lights put out per watt. I found some data on Wikipedia, and as you might expect the relation between watts and lumens is basically linear, though not quite.

If you were to do a linear regression on the data you’d get a relation

lumens = a × watts + b

where the intercept term b is not zero. But this doesn’t make sense: a light bulb that is turned off doesn’t produce light, and it certainly doesn’t produce negative light. [1]

You may be able fit the regression and ignore b; it’s probably small. But what if you wanted to require that b = 0? Some regression software will allow you to specify zero intercept, and some will not. But it’s easy enough to compute the slope a without using any regression software.

Let x be the vector of input data, the wattage of the LED bulbs. And let y be the corresponding light output in lumens. The regression line uses the slope a that minimizes

(a x − y)² = a² x · x − 2a x · y + y · y.

Setting the derivative with respect to a to zero shows

a = x · y / x · x

Now there’s more to regression than just line fitting. A proper regression analysis would look at residuals, confidence intervals, etc. But the calculation above was good enough to conclude that LED lights put out about 100 lumens per watt.

It’s interesting that making the model more realistic, i.e. requiring b = 0, is either a complication or a simplification, depending on your perspective. It complicates using software, but it simplifies the math.

Related posts

• Best line to fit three points
• Logistic regression quick takes
• Linear regression and post quantum cryptography

[1] The orange line in the image above is the least squares fit for the model y = ax, but it’s not quite the same line you’d get if you fit the model y = ax + b.