Wilson prime

A Wilson prime is a special kind of prime number. A prime number p is a Wilson prime if (and only if [ ${\displaystyle ⟺}$ ])

${\displaystyle \frac{(p-1)!+1}{p^2}=n}$

where n is a positive integer (sometimes called natural number). Wilson primes were first described by Emma Lehmer.^[1]

The only known Wilson primes are 5, 13, and 563 Template:OEIS; if any others exist, they must be greater than 5Template:E.^[2] It has been conjectured^[3] that there are an infinite number of Wilson primes, and that the number of Wilson primes in an interval ${\displaystyle [x,y]}$ is about

${\displaystyle \frac{\log (\log y)}{\log x}}$.

Compare this with Wilson's theorem, which states that every prime p divides (p − 1)! + 1.

• Wall-Sun-Sun prime
• Wieferich prime
• Wolstenholme prime

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• The Prime Glossary: Wilson prime
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• Status of the search for Wilson primes
• Wilson Quotients for composite moduli
• On congruences involving Bernoulli numbers and the quotients of Fermat and Wilson

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