3^1681130 + 3⁴⁴⁵⁷⁸¹ + 1

This prime's information:

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Lei Zhou writes (5 Sep 2022):  (report abuse)

This is a balanced ternary prime with only 3 non-0 digits in balanced ternary base. p-1 = 3^1681130+3^445781 = 3^445781 * Product(Phi(m,3)), where m = (2, 6, 18, 634,866, 1902, 2598, 5706, 7794, 274522, 823566, 2470698). OpenPFGW proves that p is a Fermat and Lucas PRP in about 1 day. Then the Pari-GP code of CHG.GP proves that p is a prime. : $ gp Input file is: cp_1681130_+3_445781_c1_+1.in Certificate file is: cp_1681130_+3_445781_c1_+1.out ... Search for factors congruent to 1. Running CHG with h = 16, u = 7. Right endpoint has 161883 digits. Done! Time elapsed: 810732137ms. ... Running CHG with h = 7, u = 2. Right endpoint has 57119 digits. Done! Time elapsed: 4457878ms. A certificate has been saved to the file: cp_1681130_+3_445781_c1_+1.out Running David Broadhurst's verifier on the saved certificate... Testing a PRP called "cp_1681130_+3_445781_c1_+1.in". ... Validated in 116 sec. Congratulations! n is prime! Goodbye! The above proof was generated in about 33 days using a Intel(R) Xeon(R) Silver 4215 CPU @ 2.50GHz as a single thread. This is the most time consuming prime proof using CHG method up to date (Sept. 1st, 2022). A full certificate can be found at HERE

Verification data:

The Top 5000 Primes is a list for proven primes only. In order to maintain the integrity of this list, we seek to verify the primality of all submissions.  We are currently unable to check all proofs (ECPP, KP, ...), but we will at least trial divide and PRP check every entry before it is included in the list.