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Primality test for numbers of the form ${(2 p)}^{2^{n}} + 1$

Yingpu Deng; Dandan Huang — 2015

Acta Arithmetica

We describe a primality test for $M = {(2 p)}^{2^{n}} + 1$ with an odd prime p and a positive integer n, which are a particular type of generalized Fermat numbers. We also present special primality criteria for all odd prime numbers p not exceeding 19. All these primality tests run in deterministic polynomial time in the input size log₂M. A special 2pth power reciprocity law is used to deduce our result.

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