Somer-Lucas pseudoprime

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In mathematics, in particular number theory, an odd composite number N is a Somer-Lucas d-pseudoprime (with given d $\le$ 1) if there exists a nondegenerate Lucas sequence

U (P, Q)

with

U 0 = 0, U 1 = 1, D = P 2 - 4 Q

,

such that

(N, D) = 1

and the rank appearance of N in the sequence $U (P, Q)$ is

(1 / a)(N - (D / N))

,

where

(D / N)

is the Jacobi symbol.

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Category: Pseudoprimes

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