Every condition that all primes satisfy has a corresponding primality test and corresponding class of pseudoprimes.

The most famous example is Fermat’s little theorem. That theorem says that for all primes p, a certain congruence holds. The corresponding notion of pseudoprime is a composite number that also satisfies Fermat’s congruence.

To make a useful primality test, a criterion should be efficient to compute, and the set of pseudoprimes should be small.

Fermat pseudoprimes

A Fermat pseudoprime base b is a composite number n such that

b^n-1 = 1 (mod n).

The smallest example is 341 because

2³⁴⁰ = 1 mod 341

and 341 = 11*31 is composite. More on Fermat pseudoprimes here.

Wilson pseudoprimes

Fermat’s little theorem leads to a practical primality test, but not all theorems about primes lead to such a practical test. For example, Wilson’s theorem says that if p is prime, then

(p – 1)! = -1 mod p.

A Wilson pseudoprime would be a composite number n such that

(n – 1)! = -1 mod n.

The good news is that the set of Wilson pseudoprimes is small. In fact, it’s empty!

The full statement of Wilson’s theorem is that

(p – 1)! = -1 mod p

if and only if p is prime and so there are no Wilson pseudoprimes.

The bad news is that computing (p – 1)! is more work than testing whether p is prime.

Euler pseudoprimes

Alex Kontorovich had an interesting tweet about the Riemann hypothesis a few days ago.

Why is the Riemann Hypothesis hard? Just one reason (of very many): it’s not an analytic question. Here are the values of zeta on the 1/2-line (where at least 40% of the zeros are, all should be) and the 4/5-line, where none should be. The latter gets arbitrarily close to 0, i.o. pic.twitter.com/qSHhwwCY6X

— Alex Kontorovich (@AlexKontorovich) November 25, 2019

The critical strip of the Riemann zeta function is the portion of the complex plane with real part between 0 and 1. The Riemann hypothesis conjectures that the zeros of the zeta function in this region all have real part 1/2. To put it another way, the Riemann hypothesis says that ζ(x + it) is never zero unless x = 1/2. However, according to Alex Kontorovich’s tweet, the function gets arbitrarily close to zero infinitely often for other values of x.

I wrote a little Mathematica code to produce graphs like the ones above. Here is a plot of ζ(1/2 + it).

    ParametricPlot[
        {Re[Zeta[1/2 + I t]], Im[Zeta[1/2 + I t]]},
        {t, 0, 100}, 
        AspectRatio -> 1, 
        PlotRange -> {{-2, 6}, {-3, 3}}
    ]

At first I didn’t specify the aspect ratio and I got nearly circular arcs. Then I realized that was an artifact of Mathematica’s default aspect ratio. Also, I set the plot range so the image above would be comparable with the next image.

Notice all the lines crossing the origin. These correspond to the zeros of ζ along the line Re(x) = 1/2.

Next I changed the 1/2 to 1/3.

If you look closely you’ll see a gap around the origin.

Here’s a closeup of the origin in both graphs. First for x = 1/2

and now for x = 1/3.

I hadn’t seen the result in Kontorovich’s tweet before. I don’t know whether it holds for all x or just for certain values of x. I assume the former. But apparently it at least holds for x = 4/5. So we should be able to find values of |&zeta(4/5 + it)| as small as we like by taking t large enough, and we should always be able to find more such values by looking further out. In practice, you might have to very far out before you find a small value. Looking as far as 1000, for example, it seems the minimum is about 0.2.

    Plot[
        Abs[Zeta[4/5 + I t]], 
        {t, 0, 1000}, 
        PlotRange -> {0, 1}
    ]

If you ask Mathematica to find the minimum in the graph above, it won’t give a reasonable answer; there are too many local minima. If instead you ask it to look repeatedly over small intervals, it does much better. The following minimizes |ζ(4/5 + it)| over the interval [i, i+1].

    f[i_] := FindMinimum[
        {Abs[Zeta[4/5 + I t]], i <= t <= i + 1}, 
        {t, i}
    ]

It returns a pair: the minimum and where it occurred. The following will look for places where |ζ(4/5 + it)| is less than 0.2.

    For[i = 0, i < 1000, i++, 
        If[ First[f[i]] < 0.20, 
            Print[f[i]]
        ]
    ]

It finds two such values.

{0.191185, {t->946.928}}

{0.195542, {t->947.}}

As I write this I have a longer program running, and so far the smallest value I’ve found is 0.1809 which occurs at t = 1329.13. According to Kontorovich you can find as small a value as you like, say less than 0.1 or 0.001, but apparently it might take a very long time.

Update: The minimum over 0 ≤ t ≤ 10,000 is 0.142734, which occurs at 7563.56.

More Riemann zeta posts

• Distribution of the zeros of ζ
• Bernoulli numbers, Riemann zeta, and strange sums
• Working with power law data

Any positive number can be found at the beginning of a factorial. That is, for every positive positive integer n, there is an integer m such that the leading digits of m! are the digits of n.

There’s a tradition in math to use the current year when you need an arbitrary numbers; you’ll see this in competition problems and recreational math articles. So let’s demonstrate the opening statement with n = 2019. Then the smallest solution is m = 3177, i.e.

3177! = 2019…000

The factorial of 3177 is a number with 9749 digits, the first of which are 2019, and the last 793 of which are zeros.

The solution m = 3177 was only the first. The next solution is 6878, and there are infinitely more.

Not only does every number appear at the beginning of a factorial, it appears at the beginning of infinitely many factorials.

We can say even more. Persi Diaconis proved that factorials obey Benford’s law, and so we can say how often a number n appears at the beginning of a factorial.

If a sequence of numbers, like factorials, obeys Benford’s law, then the leading digit d in base b appears with probability

log_b(1 + 1/d).

If we’re interested in 4-digit numbers like 2019, we can think of these as base 10,000 digits [1]. This means that the proportion factorials that begin with 2019 equals

log₁₀₀₀₀(1 + 1/2019)

or about 1 in every 18,600 factorials.

By the way, powers of 2 also obey Benford’s law, and so you can find any number at the beginning of a power of 2. For example,

2²⁰⁴⁴ = 2019…

Related: Benford’s law blog posts

[1] As pointed out in the comments, this approach underestimates the frequency of factorials that start with 2019. It would count numbers of the form 2019 xxxx xxxx, but not numbers of the form 201 9xxx xxxx etc. The actual frequency would be 4x higher.

Are there infinitely many positive integers n such that tan(n) > n?

David P. Bellamy and Felix Lazebnik [1] asked in 1998 whether there were infinitely many solutions to |tan(n)| > n and tan(n) > n/4. In both cases the answer is yes. But at least as recently as 2014 the problem at the top of the page was still open [2].

It seems that tan(n) is not often greater than n. There are only five instances for n less than one billion:

1
260515
37362253
122925461
534483448

In fact, there are no more solutions if you search up to over two billion as the following C code shows.

    #include <math.h>
    #include <stdio.h>
    #include <limits.h>

    int main() {
       for (int n = 0; n < INT_MAX; n++) 
          if (tan(n) > n)
             printf("%d\n", n);
    }

If there are infinitely many solutions, it would be interesting to know how dense they are.

Update: The known numbers for which tan(n) > n are listed in OEIS sequence A249836. According to the OEIS site it is still unknown whether the complete list is finite or infinite.

***

[1] David P. Bellamy, Felix Lazebnik, and Jeffrey C. Lagarias, Problem E10656: On the number of positive integer solutions of tan(n) > n, Amer. Math. Monthly 105 (1998) 366.

[2] Felix Lazebnik. Surprises. Mathematics Magazine , Vol. 87, No. 3 (June 2014), pp. 212-22

Primes usually look odd. They’re literally odd [1], but they typically don’t look like they have a pattern, because a pattern would often imply a way to factor the number.

However, 12345678910987654321 is prime!

I posted this on Twitter, and someone with the handle lagomoof replied that the analogous numbers are true for bases 2, 3, 4, 6, 9, 10, 16, and 40. So, for example, the hexadecimal number 123456789abcdef10fedcba987654321 would be prime. The following Python code proves this is true.

    from sympy import isprime

    for b in range(2, 41):
        n = 0
        for i in range(0, b):
            n += (i+1)*b**i
        for i in range(b+1, 2*b):
            n += (2*b-i)*b**i
        print(b, isprime(n))

By the way, some have suggested that these numbers are palindromes. They’re not quite because of the 10 in the middle. You can show that the only prime palindrome with an even number of digits is 11. This is an example of how a pattern in the digits leads to a way to factor the number.

More prime number posts

• Pi primes
• Mersenne prime trend
• Prime interruption

[1] “All primes are odd except 2, which is the oddest of all.” — Concrete Mathematics