Primefree sequence explained

gcd(a_1,a₂₎

is equal to 1, and such that for

n>2

there are no primes in the sequence of numbers calculated from the formula

a_n=a_n-1+a_n-2

.The first primefree sequence of this type was published by Ronald Graham in 1964.

Wilf's sequence

A primefree sequence found by Herbert Wilf has initial terms

a₁=20615674205555510,a₂=3794765361567513

The proof that every term of this sequence is composite relies on the periodicity of Fibonacci-like number sequences modulo the members of a finite set of primes. For each prime

, the positions in the sequence where the numbers are divisible by

repeat in a periodic pattern, and different primes in the set have overlapping patterns that result in a covering set for the whole sequence.

Nontriviality

The requirement that the initial terms of a primefree sequence be coprime is necessary for the question to be non-trivial. If the initial terms share a prime factor

(e.g., set

a_1=xp

and

a_2=yp

for some

and

both greater than 1), due to the distributive property of multiplication

a_3=(x+y)p

and more generally all subsequent values in the sequence will be multiples of

. In this case, all the numbers in the sequence will be composite, but for a trivial reason.

The order of the initial terms is also important. In Paul Hoffman's biography of Paul Erdős, The man who loved only numbers, the Wilf sequence is cited but with the initial terms switched. The resulting sequence appears primefree for the first hundred terms or so, but term 138 is the 45-digit prime

439351292910452432574786963588089477522344721

.^[1]

Other sequences

Several other primefree sequences are known:

a₁=331635635998274737472200656430763,a₂=1510028911088401971189590305498785

(sequence A083104 in the OEIS; Graham 1964),

a₁=62638280004239857,a₂=49463435743205655

(sequence A083105 in the OEIS; Knuth 1990), and

a₁=407389224418,a₂=76343678551

(sequence A082411 in the OEIS; Nicol 1999).The sequence of this type with the smallest known initial terms has

a₁=106276436867,a₂=35256392432

(sequence A221286 in the OEIS; Vsemirnov 2004).

References

10.2307/2689243 . Graham, Ronald L. . Ronald Graham . A Fibonacci-like sequence of composite numbers . Mathematics Magazine . 37 . 1964 . 5 . 322–324 . 2689243.
10.2307/2691504 . Knuth, Donald E. . Donald Knuth . A Fibonacci-like sequence of composite numbers . Mathematics Magazine . 63 . 1 . 21–25 . 1990 . 1042933 . 2691504.
Wilf, Herbert S. . Herbert Wilf . Letters to the Editor . Mathematics Magazine . 2690956 . 63 . 284 . 1990. 10.1080/0025570X.1990.11977539 .
Nicol, John W. . A Fibonacci-like sequence of composite numbers . Electronic Journal of Combinatorics . 6 . 1 . 1999 . 44 . 10.37236/1476 . 1728014.
Vsemirnov, M. . A new Fibonacci-like sequence of composite numbers . Journal of Integer Sequences . 7 . 2004 . 3 . 04.3.7 . 2004JIntS...7...37V . 2110778 .

External links

Problem 31. Fibonacci- all composites sequence. The prime puzzles and problems connection.

Notes and References

A108156.