Vitalii Tymchyshyn and Andrii Khlevniuk posted a new paper here entitled “On the average number of birthdays in birthday paradox setup.” This paper gives a different perspective on the birthday problem and a new proof.

In the usual formation of the birthday problem, one asks the probability that everyone in a group of size n has a different birthday, or one asks how big n needs to be for the probability to be approximately 1/2 that two people share a birthday. Tymchyshyn and Khlevniuk ask about the expected number of unique birthdays in a group of size n and show that it equals

(1 – αⁿ) / (1 – α)

where α = 364/365.

Variations on the birthday problem often come up in practice. For example, you often need to consider how likely it is that a hash function will map set of inputs to unique values. There’s a rule of thumb that if there are N possible hash values, then there’s a 50-50 chance of a collision if you hash √N values.

Let α = (N-1)/N and p = 1/N. If we take the first three terms in the Taylor series for (1 – p)ⁿ we see that the expected number of unique hash values after hashing n inputs is approximately

n – n(n – 1) p/2.

If we choose n = √N, then the expected number of unique hash values is approximately

n – 1/2,

which is consistent with having about a 0.5 probability of one collision.

Related probability posts

• Serious applications of a party trick
• Random sample overlap

Consider a random walk on the integers mod p. At each step, you either take a step forward or a step back, with equal probability. After just a few steps, you’ll have to be near where you started. After a few more steps, you could be far from your starting point, but you’re probably not. But eventually, every point is essentially equally likely.

How many steps would you have to take before your location is uniformly distributed? There’s a theorem that says you need about p² steps. We’ll give the precise statement of the theorem shortly, but first let’s do a simulation.

We’ll take random walks on the integers mod 25. You could think of this as a walk on a 24-hour clock, with one extra hour squeezed in. Suppose we want to take N steps. We would generate a +1 or -1 at random, add that to our current position, and reduce mod 25, doing that N times. That would give us one outcome of a random walk with N steps. We could do this over and over, keeping track of where each random walk ended up, to get an idea how the end of the walk is distributed.

We will do an optimization to speed up the simulation. Suppose we generated all our +1s and -1s at once. Then we just need to add up the number of +1’s and subtract the number of -1’s. The number n of +1’s is a binomial(N, 1/2) random variable, and the number of +1’s minus the number of -1’s is 2n – N. So our final position will be

(2n – N) mod 25.

Here’s our simulation code.

    from numpy import zeros
    from numpy.random import binomial
    import matplotlib.pyplot as plt

    p = 25
    N = p*p//2
    reps = 100000

    count = zeros(p)

    for _ in range(reps):
        n = 2*binomial(N, 0.5) - N
        count[n%p] += 1

    plt.bar(range(p), count/reps)
    plt.show()

After doing half of p² steps the distribution is definitely not uniform.

But after p² steps the distribution is close to uniform, close enough that you start to wonder how much of the lack of uniformity is due to simulation.

Now here’s the theorem I promised, taken from Group Representations in Probability and Statistics by Persi Diaconis.

For n ≥ p² with p odd and greater than 7, the maximum difference between the random walk density after n steps and the uniform density is no greater than exp(- π²n / 2p²).

There is no magic point at which the distribution suddenly becomes uniform. On the other hand, the difference between the random walk density and the uniform density does drop sharply at around p² steps. Between p²/2 steps and p² steps the difference drops by almost a factor of 12.

More random walk posts

• A knight’s random walk
• Random walk on quaternions
• Random walks and the arcsine law
• Rapidly mixing random walks
• Per stirpes inheritance and random walks

Here’s a simple probability problem with an answer you may find surprising. (The statement of the problem and solution are simple. The proof is not as simple.)

Suppose you draw 1,000 serial numbers at random from a set of 1,000,000. Then you make another random sample of 1,000. How likely is it that no numbers will be the same on both lists?

To make the problem slightly more general, take two samples of size n from a population of size n² where n is large.

The probability of no overlap in the two samples is approximately 1/e. That is, in the limit as n approaches infinity, the probability converges to 1/e.

For n = 1,000 the approximation is good to three figures.

Proof

There are Binomial(n², n) ways to choose a sample of size n from a population of size n². After we’ve drawn the first sample, there are Binomial(n² – n, n) ways to draw a new sample that doesn’t overlap with the first one. The probability of such a sample is

The fractions on the last line are in decreasing order, and so their product is less than the first one raised to the nth power, and greater than the last one raised to the nth power.

By taking logs one can show that

Since upper and lower bounds on the probability converge to 1/e, the probability converges to 1/e.

Comments

This problem is reminiscent of the birthday problem, but it’s a little different because the samples are draw without replacement.

Incidentally, I didn’t make up this problem out of thin air. It came up naturally in the course of a consulting project this week.

There are a couple different ways to combine random variables into a new random variable: means and mixtures. To take the mean of X and Y you average their values. To take the mixture of X and Y you average their densities. The former makes the tails thinner. The latter makes the tails thicker. When X and Y are exponential random variables, the mean has a hypoexponential distribution and the mixture has a hyperexponential distribution.

Hypoexponential distributions

Suppose X and Y are exponentially distributed with mean μ. Then their sum X + Y has a gamma distribution with shape 2 and scale μ. The sum has mean 2μ and variance 2μ². The coefficient of variation, the ratio of the standard deviation to the mean, is 1/√2. The hypoexponential distribution is so-called because its coefficient of variation is less than 1, whereas an exponential distribution has coefficient of variation 1 because the mean and standard deviation are always the same.

The means of X and Y don’t have to be the same. When they’re different, the sum does not have a gamma distribution, and so hypoexponential distributions are more general than gamma distributions.

A hypoexponential random variable can also be the sum of more than two exponentials. If it is the sum of n exponentials, each with the same mean, then the coefficient of variation is 1/√n. In general, the coefficient of variation for a hypoexponential distribution is the coefficient of variation of the means [1].

In the introduction we talked about means rather than sums, but it makes no difference to the coefficient of variation because going from sum to mean divides the mean and the standard deviation by the same amount.

Hyperexponential distributions

Hyperexponential random variables are constructed as a mixture of exponentials rather than an average. Instead selecting a value from X and a value from Y, we select a value from X or a value from Y. Given a mixture probability p, we choose a sample from X with probability p and a value from Y with probability 1 – p.

The density function for a mixture is a an average of the densities of the two components. So if X and Y have density functions f_X and f_Y, then the mixture has density

p f_X + (1 – p) f_Y

If you have more than two random variables, the distribution of their mixture is a convex combination of their individual densities. The coefficients in the convex combination are the probabilities of selecting each random variable.

If X and Y are exponential with means μ_X and μ_Y, and we have a mixture that selects X with probability p, then then mean of the mixture is the mixture of the means

μ = p μ_X + (1 – p) μ_Y

which you might expect, but the variance

σ² = p μ_X ² + (1 – p) μ_Y ² + p(1 – p)(μ_X – μ_Y)²

is not quite analogous because of the extra p(1 – p)(μ_X – μ_Y)² term at the end. If μ_X = μ_Y this last term drops out and the coefficient of variation is 1: mixing two identically distributed random variables doesn’t do anything to the distribution. But when the means are different, the coefficient of variation is greater than 1 because of the extra term in the variance of the mixture.

Example

Suppose μ_X = 2 and μ_Y = 8. Then the average of X and Y has mean 5, and so does an equal mixture of X and Y.

The average of X and Y has standard deviation √17, and so the coefficient of variation is √17/5 = 0.8246.

An exponential distribution with mean 5 would have standard deviation 5, and so the coefficient of variation 1.

An equal mixture of X and Y has standard deviation √43, and so the coefficient of variation is √43/5 = 1.3114.

More probability distribution posts

• Probability distribution relationships
• Adult heights and mixture distributions

[1] If exponential random variables X_i have means μ_i, then the coefficient of variation of their sum (or average) is

√(μ₁² + μ₂² + … + μ_n²) / (μ₁ + μ₂ + … + μ_n)