Difference between revisions of "Liskovets-Gallot conjectures"

Definitions

Valery Liskovets studied the list of k•2ⁿ+1 primes and observed, that the k's (k divisible by 3) got an irregular contribution of odd and even exponents yielding a prime.

Examples: (for 1 <= n <= 100000)

So Liskovets formulated the conjecture:

"There exist k, 3|k, such that primes k•2ⁿ+1 do exist but only with odd n /only with even n."

Yves Gallot extended this for k•2ⁿ-1 numbers and gave also the first solutions as:

k•2ⁿ+1 is composite for all even n for k=66741

k•2ⁿ+1 is composite for all odd n for k=95283

k•2ⁿ-1 is composite for all even n for k=39939

k•2ⁿ-1 is composite for all odd n for k=172677

Proof

The verification of these conjectures has to be done in the same manner like the Riesel problem: find a prime for all k-values less than the given with the needed condition.

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Links

• Problem 36 "The Liskovets-Gallot numbers" from PP&P connection by Carlos Rivera