A few days ago I wrote about the expected number of roots in a random polynomial where each coefficient is drawn from a standard normal, i.e. a Gaussian distribution with mean 0 and variance 1.

Another class of random polynomials, one that comes up in applications to physics, draws each coefficient from a different distribution. Specifically, the nth coefficient in an Nth degree polynomial is drawn from a normal distribution with mean zero and variance N choose n. As before, our reference is [1].

It turns out that for these random polynomials, the expected number of real zeros is √N. This is not an asymptotic approximation.

For an example, I created a random 44th degree polynomial.

    from scipy.stats import norm
    from scipy.special import binom

    N = 44
    coeff = [norm.rvs(scale=binom(N,n)**0.5) for n in range(N+1)]

I plotted the (tanh of) this polynomial as described here.

This polynomial clearly has 8 real roots. The expected number of roots for a 44th degree random polynomial of this type is √44 = 6.63.

[1] Alan Edelman and Eric Kostlan. How many zeros of a random polynomial are real? Bulletin of the AMS. Volume 32, Number 1, January 1995

A matrix is said to have a saddlepoint if an element is the smallest element in its row and the largest element in its column. For example, 0.546 is a saddlepoint in the matrix below because it is the smallest element in the third row and the largest element in the first column.

In [1], Goldman considers the probability of an m by n matrix having a saddlepoint if its elements are chosen independently at random from the same continuous distribution. He reports this probability as

but it may be easier to interpret as

When m and n are large, the binomial coefficient in the denominator is very large.

For square matrices, m and n are equal, and the probability above is 2n/(n + 1) divided by the nth Catalan number C_n.

A couple years ago I wrote about bounds on the middle binomial coefficient

by E. T. H. Wang. These bounds let us conclude that P(n, n), the probability of an n by n matrix having a saddlepoint, is bounded as follows.

Here’s a plot of P(n, n) and its bounds.

This shows that the probability goes to zero exponentially as n increases, being impossible to visually distinguish from 0 in the plot above when n = 8.

The upper bound on P(n, n) based on Wang’s inequalities is tighter than the corresponding lower bound. This is because Wang’s lower bound on the middle binomial coefficient is tighter (see plot here) and we’ve taken reciprocals.

Simulation

The theory above says that if we generate 4 by 3 matrices with independent normal random values, each matrix with have a saddle point with probability 1/5. The following code generates 10,000 random 4 by 3 matrices and counts what proportion have a saddle point.

    
    import numpy as np
    from scipy.stats import norm

    def has_saddlepoint(M):
        m, n = M.shape
        row_min_index = [np.argmin(M[i,:]) for i in range(m)]
        col_max_index = [np.argmax(M[:,j]) for j in range(n)]
        for i in range(m):
            if col_max_index[row_min_index[i]] == i:
                return True
        return False

    m, n = 4, 3
    N = 10000
    saddlepoints = 0

    for _ in range(N):
        M = norm.rvs(size=(m,n))
        if has_saddlepoint(M):
            saddlepoints += 1
    print(saddlepoints / N)

When I ran this, I got 0.1997, very close to the expected value.

More on random matrices

• Circular law for random matrices
• Eigenvalues of symmetric Gaussian matrices
• Spectra of random graphs

[1] A. J. Goldman. The Probability of a Saddlepoint. The American Mathematical Monthly, Vol. 64, No. 10, pp. 729-730

When the rule for stopping an experiment depends on the data in the experiment, the results could be biased if the stopping rule isn’t taken into account in the analysis [1].

For example, suppose Alice wants to convince Bob that π has a greater proportion of even digits than odd digits.

Alice: I’ll show you that π has more even digits than odd digits by looking at the first N digits. How big would you like N to be?

Bob: At least 1,000. Of course more data is always better.

Alice: Right. And how many more even than odd digits would you find convincing?

Bob: If there are at least 10 more evens than odds, I’ll believe you.

Alice: OK. If you look at the first 2589 digits, there are 13 more even digits than odd digits.

Now if Alice wanted to convince Bob that there are more odd digits, she could do that too. If you look at the first 2077 digits, 13 more are odd than even.

No matter what two numbers Bob gives, Alice can find a sample size that will give the result she wants. Here’s Alice’s Python code.

    from mpmath import mp
    import numpy as np

    N = 3000 
    mp.dps = N+2
    digits = str(mp.pi)[2:]

    parity = np.ones(N, dtype=int)
    for i in range(N):
        if digits[i] in ['1', '3', '5', '7', '9']:
            parity[i] = -1
    excess = parity.cumsum()
    print(excess[-1])
    print(np.where(excess == 13))
    print(np.where(excess == -13))

The number N is a guess at how far out she might have to look. If it doesn’t work, she increases it and runs the code again.

The array parity contains a 1 in positions where the digits of π (after the decimal point) are even and a -1 where they are odd. The cumulative sum shows how many more even than odd digits there have been up to a given point, a negative number meaning there have been more odd digits.

Alice thought that stopping when there are exactly 10 more of the parity she wants would look suspicious, so she looked for places where the difference was 13.

Here are the results:

    [ 126,  128,  134,  …,  536, 2588, … 2726]
    [ 772,  778,  780,  …,  886, 2076, … 2994]

There’s one minor gotcha. The array excess is indexed from zero, so Alice reports 2589 rather than 2588 because the 2589th digit has index 2588.

Bob’s mistake was that he specified a minimum sample size. By saying “at least 1,000” he gave Alice the freedom to pick the sample size to get the result she wanted. If he specified an exact sample size, there probably would be either more even digits or more odd digits, but there couldn’t be both. And if he were more sophisticated enough, he could pick an excess value that would be unlikely given that sample size.

Related posts

• Stopping trials of ineffective drugs sooner
• Finding coffee in pi
• Balancing profit and learning in A/B testing

[1] This does not contradict the likelihood principle; it says that informative stopping rules should be incorporated into the likelihood function.

The Fibonacci numbers are defined by F₁ = F₂ = 1, and for n > 2,

F_n = F_n-1 + F_n-2.

A random Fibonacci sequence f is defined similarly, except the addition above is replaced with a subtraction with probability 1/2. That is, f₁ = f₂ = 1, and for n > 2,

f_n = f_n-1 + b f_n-2

where b is +1 or -1, each with equal probability.

Here’s a graph a three random Fibonacci sequences.

Here’s the Python code that was used to produce the sequences above.

    import numpy as np

    def rand_fib(length):
        f = np.ones(length)
        for i in range(2, length):
            b = np.random.choice((-1,1))
            f[i] = f[i-1] + b*f[i-2]
        return f

It’s easy to see that the nth random Fibonacci number can be as large as the nth ordinary Fibonacci number if all the signs happen to be positive. But the numbers are typically much smaller.

The nth (ordinary) Fibonacci number asymptotically approaches φⁿ is the golden ratio, φ = (1 + √5)/2 = 1.618…

Another way to say this is that

The nth random Fibonacci number does not have an asymptotic value—it wanders randomly between positive and negative values—but with probability 1, the absolute values satisfy

This was proved in 1960 [1].

Here’s a little Python code to show that we get results consistent with this result using simulation.

    N = 500
    x = [abs(rand_fib(N)[-1])**(1/N) for _ in range(10)]
    print(f"{np.mean(x)} ± {np.std(x)}")

This produced

1.1323 ± 0.0192

which includes the theoretical value 1.1320.

Update: The next post looks at whether every integer appear in a random Fibonacci sequence. Empirical evidence suggests the answer is yes.

Related posts

• Fibonacci meets Pythagoras
• Fibonacci meets Chebyshev
• Power method and Fibonacci

[1] Furstenberg and Kesten. Products of random matrices. Ann. Math. Stat. 31, 457-469.

In the previous post, I looked at truncated probability distributions. A truncated normal distribution, for example, lives on some interval and has a density proportional to a normal distribution; the proportionality constant is whatever it has to be to make the density integrate to 1.

Truncated distributions

Suppose you wanted to generate random samples from a normal distribution truncated to [a, b]. How would you go about it? You could generate a sample x from the (full) normal distribution, and if a ≤ x ≤ b, then return x. Otherwise, try again. Keep trying until you get a sample inside [a, b], and when you get one, return it [1].

This may be the most efficient way to generate samples from a truncated distribution. It’s called the accept-reject method. It works well if the probability of a normal sample being in [a, b] is high. But if the interval is small, a lot of samples may be rejected before one is accepted, and there are more efficient algorithms. You might also use a different algorithm if you want consistent run time more than minimal average run time.

Clipped distributions

Now consider a different kind of sampling. As before, we generate a random sample x from the full normal distribution and if a ≤ x ≤ b we return it. But if x > b we return b. And if x < a we return a. That is, we clip x to be in [a, b]. I’ll call this a clipped normal distribution. (I don’t know whether this name is standard, or even if there is a standard name for this.)

Clipped distributions are not truncated distributions. They’re really a mixture of three distributions. Start with a continuous random variable X on the real line, and let Y be X clipped to [a, b]. Then Y is a mixture of a continuous distribution on [a, b] and two point masses: Y takes on the value a with probability P(X < a) and Y takes on the value b with probability P(X > b).

Clipped distributions are mostly a nuisance. Maybe the values are clipped due to the resolution of some sensor: nobody wants to clip the values, that’s just a necessary artifact. Or maybe values are clipped because some form only allows values within a given range; maybe the person designing the form didn’t realize the true range of possible values.

It’s common to clip extreme data values while deidentifying data to protect privacy. This means that not only is some data deliberately inaccurate, it also means that the distribution changes slightly since it’s now a clipped distribution. If that’s unacceptable, there are other ways to balance privacy and statistical utility.

Related posts

• Truncated normal moments [pdf]
• Width of mixture distributions
• Testing Rupert Miller’s suspicion

[1] Couldn’t this take forever? Theoretically, but with probability zero. The number of attempts follows a geometric distribution, and you could use that to find the expected number of attempts.

The Cauchy distribution is the probability distribution on the real line with density proportional to 1/(1 + x²). It comes up often as an example of a fat-tailed distribution, one that can wreak havoc on intuition and on applications. It has no mean and no variance.

The truncated Cauchy distribution has the same density, with a different proportionality constant, over a finite interval [a, b]. It’s a well-behaved distribution, with a mean, variance, and any other moment you might care about.

Here’s a sort of paradox. The Cauchy distribution is pathological, but the truncated Cauchy distribution is perfectly well behaved. But if a is a big negative number and b is a big positive number, surely the Cauchy distribution on [a, b] is sorta like the full Cauchy distribution.

I will argue here that in some sense the truncated Cauchy distribution isn’t so well behaved after all, and that a Cauchy distribution truncated to a large interval is indeed like a Cauchy distribution.

You can show that the variance of the truncated Cauchy distribution over a large interval is approximately equal to the length of the interval. So if you want to get around the problems of a Cauchy distribution by truncating it to live on a large interval, you’ve got a problem: it matters very much how you truncate it. For example, you might think “It doesn’t matter, make it [-100, 100]. Or why not [-1000, 1000] just to be sure it’s big enough.” But the variances of the two truncations differ by a factor of 10.

Textbooks usually say that the Cauchy distribution has no variance. It’s more instructive to say that it has infinite variance. And as the length of the interval you truncate the Cauchy to approaches infinity, so does its variance.

The mean of the Cauchy distribution does not exist. It fails to exist in a different way than the variance. The integral defining the variance of a Cauchy distribution diverges to +∞. But the integral defining the mean of the Cauchy simply does not exist. You can get different values of the integral depending on how you let the end points go off to infinity. In fact, you could get any value you want by specifying a particular way for truncation interval to grow to the real line.

So once again you can’t simply say “Just truncate it to a big interval” because the mean depends on how you choose your interval.

If we were working with a thin-tailed distribution, like a normal, and truncating it to a big interval, the choice of interval would make little difference. If you truncate a normal distribution to [-10, 5], or [-33, 42], or [-2000, 1000] makes almost no difference to the mean or the variance. But for the Cauchy distribution, it makes a substantial difference.

***

I’ve experimented with something new in this post: it’s deliberately short on details. Lots of words, no equations. Everything in this post can be made precise, and you may consider it an exercise to make everything precise if you’re so inclined.

By leaving out the details, I hope to focus attention on the philosophical points of the post. I expect this will go over well with people who don’t want to see the details, and with people who can easily supply the details, but maybe not with people in between.

When I hear that a system has a one in a trillion (1,000,000,000,000) chance of failure, I immediately translate that in my mind to “So, optimistically the system has a one in a million (1,000,000) chance of failure.”

Extremely small probabilities are suspicious because they often come from one of two errors:

1. Wrongful assumption of independence
2. A lack of imagination

Wrongfully assuming independence

The Sally Clark case is an infamous example of a woman’s life being ruined by a wrongful assumption of independence. She had two children die of what we would call in the US sudden infant death syndrome (SIDS) and what was called in her native UK “cot death.”

The courts reasoned that the probability of two children dying of SIDS was the square of the probability of one child dying of SIDS. The result, about one chance in 73,000,000, was deemed to be impossibly small, and Sally Clark was sent to prison for murder. She was released from prison years later, and drank herself to death.

Children born to the same parents and living in the same environment hardly have independent risks of anything. If the probability of losing one child to SIDS is 1/8500, the conditional probability of losing a sibling may be small, but surely not as small as 1/8500.

The Sally Clark case only assumed two events were independent. By naively assuming several events are independent, you can start with larger individual probabilities and end up with much smaller final probabilities.

As a rule of thumb, if a probability uses a number name you’re not familiar with (such as septillion below) then there’s reason to be skeptical.

Lack of imagination

It is possible to legitimately calculate extremely small probabilities, but often this is by calculating the probability of the wrong thing, by defining the problem too narrowly. If a casino owner believes that the biggest risk to his business is dealing consecutive royal flushes, he’s not considering the risk of a tiger mauling a performer.

A classic example of a lack of imagination comes from cryptography. Amateurs who design encryption systems assume that an attacker must approach a system the same way they do. For example, suppose I create a simple substitution cipher by randomly permuting the letters of the English alphabet. There are over 400 septillion (4 × 10²⁶) permutations of 26 letters, and so the chances of an attacker guessing my particular permutation are unfathomably small. And yet simple substitution ciphers are so easy to break that they’re included in popular books of puzzles. Cryptogram solvers do not randomly permute the alphabet until something works.

Professional cryptographers are not nearly so naive, but they have to constantly be on guard for more subtle forms of the same fallacy. If you create a cryptosystem by multiplying large prime numbers together, it may appear that an attacker would have to factor that product. That’s the idea behind RSA encryption. But in practice there are many cases where this is not necessary due to poor implementation. Here are three examples.

If the calculated probability of failure is infinitesimally small, the calculation may be correct but only address one possible failure mode, and not the most likely failure mode at that.

More posts on risk management

• Six sigma fallacy
• Inverted sense of risk
• Bayesian networks