Wall–Sun–Sun prime

In number theory, a Wall–Sun–Sun prime or Fibonacci–Wieferich prime is a certain kind of prime number which is conjectured to exist, although none are known.

Definition

Let [math]\displaystyle{ p }[/math] be a prime number. When each term in the sequence of Fibonacci numbers [math]\displaystyle{ F_n }[/math] is reduced modulo [math]\displaystyle{ p }[/math], the result is a periodic sequence. The (minimal) period length of this sequence is called the Pisano period and denoted [math]\displaystyle{ \pi(p) }[/math]. Since [math]\displaystyle{ F_0 = 0 }[/math], it follows that p divides [math]\displaystyle{ F_{\pi(p)} }[/math]. A prime p such that p² divides [math]\displaystyle{ F_{\pi(p)} }[/math] is called a Wall–Sun–Sun prime.

Equivalent definitions

If [math]\displaystyle{ \alpha(m) }[/math] denotes the rank of apparition modulo [math]\displaystyle{ m }[/math] (i.e., [math]\displaystyle{ \alpha(m) }[/math] is the smallest positive index such that [math]\displaystyle{ m }[/math] divides [math]\displaystyle{ F_{\alpha(m)} }[/math]), then a Wall–Sun–Sun prime can be equivalently defined as a prime [math]\displaystyle{ p }[/math] such that [math]\displaystyle{ p^2 }[/math] divides [math]\displaystyle{ F_{\alpha(p)} }[/math].

For a prime p ≠ 2, 5, the rank of apparition [math]\displaystyle{ \alpha(p) }[/math] is known to divide [math]\displaystyle{ p - \left(\tfrac{p}{5}\right) }[/math], where the Legendre symbol [math]\displaystyle{ \textstyle\left(\frac{p}{5}\right) }[/math] has the values

[math]\displaystyle{ \left(\frac{p}{5}\right) = \begin{cases} 1 &\text{if }p \equiv \pm1 \pmod 5;\\ -1 &\text{if }p \equiv \pm2 \pmod 5.\end{cases} }[/math]

This observation gives rise to an equivalent characterization of Wall–Sun–Sun primes as primes [math]\displaystyle{ p }[/math] such that [math]\displaystyle{ p^2 }[/math] divides the Fibonacci number [math]\displaystyle{ F_{p - \left(\frac{p}{5}\right)} }[/math].^[1]

A prime [math]\displaystyle{ p }[/math] is a Wall–Sun–Sun prime if and only if [math]\displaystyle{ \pi(p^2) = \pi(p) }[/math].

A prime [math]\displaystyle{ p }[/math] is a Wall–Sun–Sun prime if and only if [math]\displaystyle{ L_p \equiv 1 \pmod{p^2} }[/math], where [math]\displaystyle{ L_p }[/math] is the [math]\displaystyle{ p }[/math]-th Lucas number.^[2]:42

McIntosh and Roettger establish several equivalent characterizations of Lucas–Wieferich primes.^[3] In particular, let [math]\displaystyle{ \epsilon = \left(\tfrac{p}{5}\right) }[/math]; then the following are equivalent:

• [math]\displaystyle{ F_{p - \epsilon} \equiv 0 \pmod{p^2} }[/math]
• [math]\displaystyle{ L_{p - \epsilon} \equiv 2\epsilon \pmod{p^4} }[/math]
• [math]\displaystyle{ L_{p - \epsilon} \equiv 2\epsilon \pmod{p^3} }[/math]
• [math]\displaystyle{ F_p \equiv \epsilon \pmod{p^2} }[/math]
• [math]\displaystyle{ L_p \equiv 1 \pmod{p^2} }[/math]

Existence

Unsolved problem in mathematics: Are there any Wall–Sun–Sun primes? If yes, are there an infinite number of them? (more unsolved problems in mathematics)

In a study of the Pisano period [math]\displaystyle{ k(p) }[/math], Donald Dines Wall determined that there are no Wall–Sun–Sun primes less than [math]\displaystyle{ 10000 }[/math]. In 1960, he wrote:^[4]

The most perplexing problem we have met in this study concerns the hypothesis [math]\displaystyle{ k(p^2) \neq k(p) }[/math]. We have run a test on digital computer which shows that [math]\displaystyle{ k(p^2) \neq k(p) }[/math] for all [math]\displaystyle{ p }[/math] up to [math]\displaystyle{ 10000 }[/math]; however, we cannot prove that [math]\displaystyle{ k(p^2) = k(p) }[/math] is impossible. The question is closely related to another one, "can a number [math]\displaystyle{ x }[/math] have the same order mod [math]\displaystyle{ p }[/math] and mod [math]\displaystyle{ p^2 }[/math]?", for which rare cases give an affirmative answer (e.g., [math]\displaystyle{ x=3, p=11 }[/math]; [math]\displaystyle{ x=2, p=1093 }[/math]); hence, one might conjecture that equality may hold for some exceptional [math]\displaystyle{ p }[/math].

It has since been conjectured that there are infinitely many Wall–Sun–Sun primes.^[5] No Wall–Sun–Sun primes are known (As of August 2022).

In 2007, Richard J. McIntosh and Eric L. Roettger showed that if any exist, they must be > 2×10¹⁴.^[3] Dorais and Klyve extended this range to 9.7×10¹⁴ without finding such a prime.^[6]

In December 2011, another search was started by the PrimeGrid project,^[7] however it was suspended in May 2017.^[8] In November 2020, PrimeGrid started another project that searches for Wieferich and Wall–Sun–Sun primes simultaneously.^[9] The project ended in December 2022, definitely proving that any Wall–Sun–Sun prime must exceed [math]\displaystyle{ 2^{64} }[/math] (about [math]\displaystyle{ 18\cdot 10^{18} }[/math]).^[10]

History

Wall–Sun–Sun primes are named after Donald Dines Wall,^[4][11] Zhi Hong Sun and Zhi Wei Sun; Z. H. Sun and Z. W. Sun showed in 1992 that if the first case of Fermat's Last Theorem was false for a certain prime p, then p would have to be a Wall–Sun–Sun prime.^[12] As a result, prior to Andrew Wiles' proof of Fermat's Last Theorem, the search for Wall–Sun–Sun primes was also the search for a potential counterexample to this centuries-old conjecture.

Generalizations

A tribonacci–Wieferich prime is a prime p satisfying h(p) = h(p²), where h is the least positive integer satisfying [T_h,T_h+1,T_h+2] ≡ [T₀, T₁, T₂] (mod m) and T_n denotes the n-th tribonacci number. No tribonacci–Wieferich prime exists below 10¹¹.^[13]

A Pell–Wieferich prime is a prime p satisfying p² divides P_p−1, when p congruent to 1 or 7 (mod 8), or p² divides P_p+1, when p congruent to 3 or 5 (mod 8), where P_n denotes the n-th Pell number. For example, 13, 31, and 1546463 are Pell–Wieferich primes, and no others below 10⁹ (sequence A238736 in the OEIS). In fact, Pell–Wieferich primes are 2-Wall–Sun–Sun primes.

Near-Wall–Sun–Sun primes

A prime p such that [math]\displaystyle{ F_{p - \left(\frac{p}{5}\right)} \equiv Ap \pmod{p^2} }[/math] with small |A| is called near-Wall–Sun–Sun prime.^[3] Near-Wall–Sun–Sun primes with A = 0 would be Wall–Sun–Sun primes. PrimeGrid recorded cases with |A| ≤ 1000.^[14] A dozen cases are known where A = ±1 (sequence A347565 in the OEIS).

Wall–Sun–Sun primes with discriminant D

Wall–Sun–Sun primes can be considered for the field [math]\displaystyle{ Q_{\sqrt{D}} }[/math] with discriminant D. For the conventional Wall–Sun–Sun primes, D = 5. In the general case, a Lucas–Wieferich prime p associated with (P, Q) is a Wieferich prime to base Q and a Wall–Sun–Sun prime with discriminant D = P² – 4Q.^[1] In this definition, the prime p should be odd and not divide D.

It is conjectured that for every natural number D, there are infinitely many Wall–Sun–Sun primes with discriminant D.

The case of [math]\displaystyle{ (P,Q) = (k,-1) }[/math] corresponds to the k-Wall–Sun–Sun primes, for which Wall–Sun–Sun primes represent the special case k = 1. The k-Wall–Sun–Sun primes can be explicitly defined as primes p such that p² divides the k-Fibonacci number [math]\displaystyle{ F_k(\pi_k(p)) }[/math], where F_k(n) = U_n(k, −1) is a Lucas sequence of the first kind with discriminant D = k² + 4 and [math]\displaystyle{ \pi_k(p) }[/math] is the Pisano period of k-Fibonacci numbers modulo p.^[15] For a prime p ≠ 2 and not dividing D, this condition is equivalent to either of the following.

• p² divides [math]\displaystyle{ F_k\left(p - \left(\tfrac{D}{p}\right)\right) }[/math], where [math]\displaystyle{ \left(\tfrac{D}{p}\right) }[/math] is the Kronecker symbol;
• V_p(k, −1) ≡ k (mod p²), where V_n(k, −1) is a Lucas sequence of the second kind.

The smallest k-Wall–Sun–Sun primes for k = 2, 3, ... are

13, 241, 2, 3, 191, 5, 2, 3, 2683, ... (sequence A271782 in the OEIS)

See also

• Wieferich prime
• Wolstenholme prime
• Wilson prime
• PrimeGrid
• Fibonacci prime
• Pisano period
• Table of congruences

References

Further reading

• Crandall, Richard E.; Pomerance, Carl (2001). Prime Numbers: A Computational Perspective. Springer. p. 29. ISBN 0-387-94777-9. https://archive.org/details/primenumberscomp00cran_805. 
• Saha, Arpan; Karthik, C. S. (2011). "A Few Equivalences of Wall–Sun–Sun Prime Conjecture". arXiv:1102.1636 [math.NT].

External links

• Chris Caldwell, The Prime Glossary: Wall–Sun–Sun prime at the Prime Pages.
• Weisstein, Eric W.. "Wall–Sun–Sun prime". http://mathworld.wolfram.com/Wall-Sun-SunPrime.html. 
• Richard McIntosh, Status of the search for Wall–Sun–Sun primes (October 2003)
• OEIS sequence A000129 (Primes p that divide their Pell quotients, where the Pell quotient of p is A000129(p - (2/p))/p and (2/p) is a Jacobi symbol)

0.00 (0 votes) Original source: https://en.wikipedia.org/wiki/Wall–Sun–Sun prime. Read more