This evening I stumbled on the fact that John von Neumann and Fibonacci both have asteroids named after them. Then I wondered how many more famous mathematicians have asteroids named after them. As it turns out, most of them: Euclid, Gauss, Cauchy, Noether, Gödel, Ramanujan, … It’s easier to look at the names that are not assigned to asteroids.

I wrote a little script to search for the 100 greatest mathematicians (according to James Allen’s list) and look for names missing from a list of named asteroids. Here are the ones that were missing, in order of Allen’s list.

• Alexandre Grothendieck
• Hermann K. H. Weyl
• Brahmagupta
• Aryabhata
• Apollonius
• Carl Ludwig Siegel
• Diophantus
• Muhammed al-Khowarizmi
• Bhascara (II) Acharya
• Alhazen ibn al-Haytham
• Andrey N. Kolmogorov
• Eudoxus
• Panini
• Jakob Steiner
• Hermann G. Grassmann
• M. E. Camille Jordan
• Jean-Pierre Serre
• Michael F. Atiyah
• Atle Selberg
• Pappus

So of the top 100 list of mathematicians, 80 have asteroids named after them and the 20 above do not.

Alexandre Grothendieck, is the greatest mathematician—11th on James Allen’s list—not to have an asteroid named in his honor.

Sam Walters posted something interesting on Twitter yesterday I hadn’t seem before:

The sines of the positive integers have just the right balance of pluses and minuses to keep their sum in a fixed interval. (Not hard to show.) #math pic.twitter.com/RxeoWg6bhn

— Sam Walters ☕️ (@SamuelGWalters) November 29, 2018

If for some reason your browser doesn’t render the embedded tweet, he points out that

for all positive integers N.

Here’s a little Python script to illustrate the sum in his tweet.

    from scipy import sin, arange
    import matplotlib.pyplot as plt
    
    x = arange(1,100)
    y = sin(x).cumsum()
    plt.plot(x, y)
    plt.plot((1, 100), (-1/7, -1/7), "g--")
    plt.plot((1, 100), (2, 2), "g--")
    plt.savefig("sinsum.svg")

Exponential sums

Exponential sums are interesting because crude application of the triangle inequality won’t get you anywhere. All it will let you conclude is that the sum is between –N and N.

(Why is this an exponential sum? Because it’s the imaginary part of the sum over eⁱⁿ.)

For more on exponential sums, you might like the book Uniform Distribution of Sequences.

Also, I have a page that displays the plot of a different exponential sum each day, the coefficients in the sum

being taking from the day’s date. Because consecutive numbers have very different number theoretic properties, the images vary quite a bit from day to day.

Here’s a sneak peak at what the exponential sum for Christmas will be this year.

We all live on an oblate spheroid [1], so it could be handy to know a little about oblate spheroids.

Eccentricity

Conventional notation uses a for the equatorial radius and c for the polar radius. Oblate means a > c. The eccentricity e is defined by

For a perfect sphere, a = c and so e = 0. The eccentricity for earth is small, e = 0.08. The eccentricity increases as the polar radius becomes smaller relative to the equatorial radius. For Saturn, the polar radius is 10% less than the equatorial radius, and e = 0.43.

Volume

The volume of an oblate spheroid is simple:

Clearly we recover the volume of a sphere when a = c.

Surface area

The surface area is more interesting. The surface of a spheroid is a surface of rotation, and so can easily be derived. It works out to be

It’s not immediately clear that we get the area of a sphere as c approaches a, but it becomes clear when we expand the log term in a Taylor series.

This suggests that an oblate spheroid has approximately the same area as a sphere with radius √((a² + c²)/2), with error on the order of e².

If we set a = 1 and let c vary from 0 to 1, we can plot how the surface area varies.

Here’s the corresponding plot where we use the eccentricity e as our independent variable rather than the polar radius c.

Related posts

• Surface area of a egg
• Distance on the surface of a spheroid

[1] Not in a yellow submarine as some have suggested.

Numberphile has a nice video on the fifth root trick: someone raises a two-digit number to the 5th power, reads the number aloud, and you tell them immediately what the number was.

Here’s the trick in a nutshell. For any number n, n⁵ ends in the same last digit as n. You could prove that by brute force or by Euler’s theorem. So when someone tells you n⁵, you immediately know the last digit. Now you need to find the first digit, and you can do that by learning, approximately, the powers (10k)⁵ for i = 1, 2, 3, …, 9. Then you can determine the first digit by the range.

Here’s where the video is a little vague. It says that you don’t need to know the powers of 10k very accurately. This is true, but just how accurately do you need to know the ranges?

If the two-digit number is a multiple of 10, you’ll recognize the zeros at the end, and the last non-zero digit is the first digit of n. For example, if n⁵ = 777,600,000 then you know n is a multiple of 10, and since the last non-zero digit is 6, n = 60.

So you need to know the fifth powers of multiples of 10 well enough to distinguish (10k – 1)⁵ from (10k + 1)⁵. The following table shows what these numbers are.

|---+---------------+---------------|
| k | (10k - 1)^5   | (10k + 1)^5   |
|---+---------------+---------------|
| 1 |        59,049 |       161,051 |
| 2 |     2,476,099 |     4,084,101 |
| 3 |    20,511,149 |    28,629,151 |
| 4 |    90,224,199 |   115,856,201 |
| 5 |   282,475,249 |   345,025,251 |
| 6 |   714,924,299 |   844,596,301 |
| 7 | 1,564,031,349 | 1,804,229,351 |
| 8 | 3,077,056,399 | 3,486,784,401 |
| 9 | 5,584,059,449 | 6,240,321,451 |
|---+---------------+---------------|

So any number less than a million has first digit 1. Any number between 1 million and 3 million has first digit 2. Etc.

You could choose the following boundaries, if you like.

|---+----------------|
| k | upper boundary |
|---+----------------|
| 1 |      1,000,000 |
| 2 |      3,000,000 |
| 3 |     25,000,000 |
| 4 |    100,000,000 |
| 5 |    300,000,000 |
| 6 |    800,000,000 |
| 7 |  1,700,000,000 |
| 8 |  3,200,000,000 |
| 9 |  6,000,000,000 |
|---+----------------|

The Numberphile video says you should have someone say the number aloud, in words. So as soon as you hear “six billion …”, you know the first digit of n is 9. If you hear “five billion” or “four billion” you know the first digit is 8. If you hear “three billion” then you know to pay attention to the next number, to decide whether the first digit is 7 or 8. Once you hear the first few syllables of the number, you can stop pay attention until you hear the last syllable or two.

Let u be a real-valued function of n variables, and let v be a vector-valued function of n variables, a function from n variables to a vector of size n. Then we have the following product rule:

D(uv) = v Du + u Dv.

It looks strange that the first term on the right isn’t Du v.

The function uv is a function from n dimensions to n dimensions, so it’s derivative must be an n by n matrix. So the two terms on the right must be n by n matrices, and they are. But Du v is a 1 by 1 matrix, so it would not make sense on the right side.

Here’s why the product rule above looks strange: the multiplication by u is a scalar product, not a matrix product. Sometimes you can think of real numbers as 1 by 1 matrices and everything works out just fine, but not here. The product uv doesn’t make sense if you think of the output of u as a 1 by 1 matrix. Neither does the product u Dv.

If you think of v as an n by 1 matrix and Du as a 1 by n matrix, everything works. If you think of v and Du as vectors, then v Du is the outer product of the two vectors. You could think of Du as the gradient of u, but be sure you think of it horizontally, i.e. as a 1 by n matrix. And finally, D(uv) and Dv are Jacobian matrices.

Update: As Harald points out in the comments, the usual product rule applies if you write the scalar-vector product uv as the matrix product vu where now are are thinking of u as a 1 by 1 matrix! Now the product rule looks right

D(vu) = Dv u + v Du

but the product vu looks wrong because you always write scalars on the left. But here u isn’t a scalar!

A few days ago I wrote about finite simple groups and said that I might write more about them. This post is a follow-on to that one.

In my earlier post I said that finite simple groups fell into five broad categories, and that three of these were easy to describe. This post will chip away at one of the categories I said was hard to describe briefly, namely groups of Lie type or classical groups. These are finite groups that are analogous to (continuous) Lie groups. Continue reading →

Today‘s exponential sum curve is simply a triangle.

But yesterday‘s curve was more complex

and tomorrow‘s curve will be more complex as well.

Why is today’s curve so simple? The vertices of the curves are the partial sums of the series

where m is the month, d is the day, and y is the last two digits of the year. Typically the sums are too complicated to work out explicitly by hand, but today’s sum is fairly simple. We have m = 9, d = 6, and y = 18. The three fractions add to (2n + 3n² + n³)/18. Reduced mod 18, the numerators are

0, 6, 6, 6, 12, 12, 12, 0, 0, 0, 6, 6, 6, 12, 12, 12, 0, 0

The repetition in the terms of the sum leads to the straight lines in the plot. The terms in the exponential sum only take on three values, the three cube roots of 1. These three roots are 1, a, and b where

a = exp(2πi/3) = -1/2 + i√3/2

and

b = exp(-2πi/3) = -1/2 – i√3/2

is the complex conjugate of a.

Using Mathematica we have

    Table[ Exp[2 Pi I (2 n + 3 n^2 + n^3)/18], {n, 0, 17}] 
        /. {Exp[2 Pi I/3] -> a, Exp[-2 Pi I/3] -> b}

which produces

1, a, a, a, b, b, b, 1, 1, 1, a, a, a, b, b, b, 1, 1

When we take the partial sums, we get four points in a straight line because they differ by a:

1, 1 + a, 1 + 2a, 1 + 3a

 then three points in a straight line because they differ by b:

(1 + 3a), (1 + 3a) + b, (1 + 3a) + 2b, (1 + 3a) + 3b

and so forth.

There’s no direct way to define the sum of an infinite number of terms. Addition takes two arguments, and you can apply the definition repeatedly to define the sum of any finite number of terms. But an infinite sum depends on a theory of convergence. Without a definition of convergence, you have no way to define the value of an infinite sum. And with different definitions of convergence, you can get different values.

In this post I’ll review two ways of assigning a meaning to divergent series that I’ve written about before, then mention a third way.

Asymptotic series

A few months ago I wrote about an asymptotic series solution to the differential equation

You end up with the solution

which diverges for all x. That is, for each x, the partial sums of the series do not get closer to any number that you could call the sum. In fact, the individual terms of the series eventually get bigger and bigger. Surely this is a useless solution, right?

Actually, it is useful if you change your perspective. Instead of holding x fixed and letting n go to infinity, fix a value of n and let x go to infinity. In that sense, the series converges. For fixed n and large x, this gives accurate approximations to the solution of the differential equation.

Analytic continuation

At the end of a post on Bernoulli numbers I briefly explain the interpretation of the apparently nonsensical equation

1 + 2 + 3 + … = -1/12.

In a nutshell, the Riemann zeta function is defined by a two-step process. First define

for s with real part strictly bigger than 1. Then define the zeta function for the rest of the complex plane (except the point s = 1) by analytic continuation. If the infinite sum for zeta were valid for s = -1, which is it not, then it would equal 1 + 2 + 3 + …

The analytic continuation of the zeta function is defined at -1, and there the function equals -1/12. So to make sense of the sum of the positive integers, interpret the sum as a sort of pun, a funny way to write ζ(-1).

p-adic numbers

This is the most radical way to make sense of divergent series: change your number system so that they aren’t divergent!

The sum

1 + 2 + 4 + 8 + …

diverges because the partial sums (1, 3, 7, 15, …) are not getting closer to anything. But you can make the series converge by changing the way you measure distance between numbers. That’s what p-adic numbers do. For any fixed prime number p, define the distance between two numbers as the reciprocal of the largest power of p that divides their difference. That is, numbers are close together if they differ by a large power of p. We can make sense of the sum above in the 2-adic numbers, i.e. the p-adic numbers with p = 2.

The nth partial sum of the series above is 2ⁿ – 1. The 2-adic distance between 2ⁿ – 1 and -1 is 2^–n, which goes to zero, so the series converges to -1.

1 + 2 + 4 + 8 + … = -1.

Note that all the partial sums are the same, whether in the real numbers or the 2-adics, but the two number systems disagree on whether the partial sums converge.

If that explanation went by too quickly, here’s a 15-minute video expands on the same derivation.

Names for extremely large numbers are kinda pointless. The purpose of a name is to communicate something, and if the meaning of the name is not widely known, the name doesn’t serve that purpose. It’s even counterproductive if two people have incompatible ideas what the word means. It’s much safer to simply use scientific notation for extremely large numbers.

Obscure or confusing

Everyone knows what a million is. Any larger than that and you may run into trouble. The next large number name, billion, means 10⁹ to some people and 10¹² to others.

When writing for those who take one billion to mean 10⁹, your audience may or may not know that one trillion is 10¹² according to that convention. You cannot count on people knowing the names of larger numbers: quadrillion, quintillion, sextillion, etc.

To support this last claim, let’s look at the frequency of large number names according to Google’s Ngram viewer. Presumably the less often a word is used, the less likely people are to recognize it.

Here’s a bar chart for the data from 2005, plotting on a logarithmic scale. The chart has a roughly linear slope, which means the frequency of the words drops exponentially. Million is used more than 24,000 times as often as septillion.

Here’s the raw data.

    |-------------+--------------|
    | Name        |    Frequency |
    |-------------+--------------| 
    | Million     | 0.0096086564 |
    | Billion     | 0.0030243298 |
    | Trillion    | 0.0002595139 |
    | Quadrillion | 0.0000074383 |
    | Quintillion | 0.0000016745 |
    | Sextillion  | 0.0000006676 |
    | Septillion  | 0.0000003970 |
    |-------------+--------------|

Latin prefixes for large numbers

There is a consistency to these names, though they are not well known. Using the convention that these names refer to powers of 1000, the pattern is

[Latin prefix for n] + llion = 1000ⁿ⁺¹

So for example, billion is 1000²⁺¹ because bi- is the Latin prefix for 2. A trillion is 1000³⁺¹ because tri- corresponds to 3, and so forth. A duodecillion is 1000¹³ because the Latin prefix duodec- corresponds to 12.

    |-------------------+---------|
    | Name              | Meaning |
    |-------------------+---------|
    | Billion           |   10^09 |
    | Trillion          |   10^12 |
    | Quadrillion       |   10^15 |
    | Quintillion       |   10^18 |
    | Sextillion        |   10^21 |
    | Septillion        |   10^24 |
    | Octillion         |   10^27 |
    | Nonillion         |   10^30 |
    | Decillion         |   10^33 |
    | Undecillion       |   10^36 |
    | Duodecillion      |   10^39 |
    | Tredecillion      |   10^42 |
    | Quattuordecillion |   10^45 |
    | Quindecillion     |   10^48 |
    | Sexdecillion      |   10^51 |
    | Septendecillion   |   10^54 |
    | Octodecillion     |   10^57 |
    | Novemdecillion    |   10^60 |
    | Vigintillion      |   10^63 |
    |-------------------+---------|

Code

Here’s the Mathematica code that was used to create the plot above.

    BarChart[ 
        {0.0096086564, 0.0030243298, 0.0002595139, 0.0000074383, 
         0.0000016745, 0.0000006676, 0.0000003970}, 
         ChartLabels -> {"million", "billion", "trillion", "quadrillion", 
                         "quintillion", "sextillion", "septillion"}, 
         ScalingFunctions -> "Log", 
         ChartStyle -> "DarkRainbow"
    ]