These are the *Primo* (https://www.rieselprime.de/ziki/Primo) (an elliptic curve primality proving (https://primes.utm.edu/prove/prove4_2.html, https://en.wikipedia.org/wiki/Elliptic_curve_primality, https://primes.utm.edu/glossary/xpage/ECPP.html, https://mathworld.wolfram.com/EllipticCurvePrimalityProving.html) implementation) primality certificates (https://en.wikipedia.org/wiki/Primality_certificate, https://primes.utm.edu/glossary/xpage/Certificate.html, https://mathworld.wolfram.com/PrimalityCertificate.html) for the minimal primes > 10<sup>300</sup> in bases 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 18, 20, 22, 24, 28, 30 (local copy from factordb (http://factordb.com/)).

e.g. File "certificate9_149" is the primality certificate for the 149th minimal prime in base 9, i.e. the primality certificate for the prime 76<sub>329</sub>2 in base 9, which equals the prime (31×9<sup>330</sup>−19)/4.

Primes which either *N*−1 or *N*+1 is trivially fully factored (i.e. primes of the form *k*×*b*<sup>*n*</sup>±1, with small *k*) do not need primality certificates, since they can be easily proven primes using *N*−1 test (https://primes.utm.edu/prove/prove3_1.html) or *N*+1 test (https://primes.utm.edu/prove/prove3_2.html), these primes are:

the 3176th minimal prime in base 13, 81010<sub>415</sub>1, which equals 17746×13<sup>416</sup>+1, *N*−1 is trivially fully factored

the 3177th minimal prime in base 13, 8110<sub>435</sub>1, which equals 1366×13<sup>436</sup>+1, *N*−1 is trivially fully factored

the 3188th minimal prime in base 13, 930<sub>1551</sub>1, which equals 120×13<sup>1552</sup>+1, *N*−1 is trivially fully factored

the 3191st minimal prime in base 13, 390<sub>6266</sub>1, which equals 48×13<sup>6267</sup>+1, *N*−1 is trivially fully factored

the 649th minimal prime in base 14, 34D<sub>708</sub>, which equals 47×14<sup>708</sup>−1, *N*+1 is trivially fully factored

the 650th minimal prime in base 14, 4D<sub>19698</sub>, which equals 5×14<sup>19698</sup>−1, *N*+1 is trivially fully factored

the 2335th minimal prime in base 16, 88F<sub>545</sub>, which equals 137×16<sup>545</sup>−1, *N*+1 is trivially fully factored

the 3310th minimal prime in base 20, JCJ<sub>629</sub>, which equals 393×20<sup>629</sup>−1, *N*+1 is trivially fully factored

the 3408th minimal prime in base 24, 88N<sub>5951</sub>, which equals 201×24<sup>5951</sup>−1, *N*+1 is trivially fully factored

the 25509th minimal prime in base 28, EB0<sub>405</sub>1, which equals 403×28<sup>406</sup>+1, *N*−1 is trivially fully factored

the 2616th minimal prime in base 30, C0<sub>1022</sub>1, which equals 12×30<sup>1023</sup>+1, *N*−1 is trivially fully factored

the 2619th minimal prime in base 30, OT<sub>34205</sub>, which equals 25×30<sup>34205</sup>−1, *N*+1 is trivially fully factored

Also the case where *N*−1 or *N*+1 is product of a Cunningham number (of the form *b*<sup>*n*</sup>±1, see https://en.wikipedia.org/wiki/Cunningham_number, https://mathworld.wolfram.com/CunninghamNumber.html, https://en.wikipedia.org/wiki/The_Cunningham_project, https://primes.utm.edu/glossary/xpage/CunninghamProject.html, https://www.rieselprime.de/ziki/Cunningham_project, https://homes.cerias.purdue.edu/~ssw/cun/index.html, https://maths-people.anu.edu.au/~brent/factors.html, http://myfactors.mooo.com/, https://stdkmd.net/nrr/repunit/repunitnote.htm) and a small number, and this Cunningham number is ≥ 1/4 factored (https://en.wikipedia.org/wiki/Integer_factorization, https://www.rieselprime.de/ziki/Factorization, https://mathworld.wolfram.com/PrimeFactorization.html), see the article http://www.ams.org/journals/mcom/1975-29-130/S0025-5718-1975-0384673-1/S0025-5718-1975-0384673-1.pdf for the case that either *N*−1 or *N*+1 (or both) can be ≥ 1/3 factored, if either *N*−1 or *N*+1 (or both) can be ≥ 1/4 factored but neither can be ≥ 1/3 factored, then we need to use *CHG* (https://mersenneforum.org/attachment.php?attachmentid=21133&d=1571237465, https://raw.githubusercontent.com/xayahrainie4793/text-file-stored/main/CHG.GP.txt, https://primes.utm.edu/bios/page.php?id=797) to prove its primality (see https://mersenneforum.org/showpost.php?p=528149&postcount=3), for the examples of the numbers which are proven prime by *CHG*, see https://primes.utm.edu/primes/page.php?id=126454, https://primes.utm.edu/primes/page.php?id=131964, https://primes.utm.edu/primes/page.php?id=123456, https://primes.utm.edu/primes/page.php?id=130933, https://stdkmd.net/nrr/cert/1/ (search for "CHG"), https://stdkmd.net/nrr/cert/2/ (search for "CHG"), https://stdkmd.net/nrr/cert/3/ (search for "CHG"), https://stdkmd.net/nrr/cert/4/ (search for "CHG"), https://stdkmd.net/nrr/cert/5/ (search for "CHG"), https://stdkmd.net/nrr/cert/6/ (search for "CHG"), https://stdkmd.net/nrr/cert/7/ (search for "CHG"), https://stdkmd.net/nrr/cert/8/ (search for "CHG"), https://stdkmd.net/nrr/cert/9/ (search for "CHG"), however, *factordb* (http://factordb.com/) lacks the ability to verify *CHG* proofs, see https://mersenneforum.org/showpost.php?p=608362&postcount=165: (thus these numbers also do not need primality certificates)

(below, "*R*<sub>*n*</sub>(*b*)" means the repunit (https://en.wikipedia.org/wiki/Repunit, https://primes.utm.edu/glossary/xpage/Repunit.html, https://primes.utm.edu/glossary/xpage/GeneralizedRepunitPrime.html, https://www.rieselprime.de/ziki/Repunit, https://mathworld.wolfram.com/Repunit.html) in base *b* with length *n*, i.e. *R*<sub>*n*</sub>(*b*) = (*b*<sup>*n*</sup>−1)/(*b*−1), "*S*<sub>*n*</sub>(*b*)" means *b*<sup>*n*</sup>+1, the special cases of *R*<sub>*n*</sub>(10) and *S*<sub>*n*</sub>(10) are in https://stdkmd.net/nrr/repunit/ and https://stdkmd.net/nrr/repunit/10001.htm, respectively, in fact, *R*<sub>*n*</sub>(*b*) and *S*<sub>*n*</sub>(*b*) are 111...111 and 1000...0001 in base *b*, respectively)

  the 3168th minimal prime in base 13, 9<sub>308</sub>1, *N*−1 is 117×*R*<sub>308</sub>(13), thus factor *N*−1 is equivalent to factor 13<sup>308</sup>−1, and for the factorization of 13<sup>308</sup>−1, see http://myfactorcollection.mooo.com:8090/cgi-bin/showSingleEntry?Base=13&Exp=308&c0=-&EN=

  the 3179th minimal prime in base 13, B<sub>563</sub>C, *N*−1 is 11×*R*<sub>564</sub>(13), thus factor *N*−1 is equivalent to factor 13<sup>564</sup>−1, and for the factorization of 13<sup>564</sup>−1, see http://myfactorcollection.mooo.com:8090/cgi-bin/showSingleEntry?Base=13&Exp=564&c0=-&EN=

  the 3180th minimal prime in base 13, 1B<sub>576</sub>, *N*−1 is 23×*R*<sub>576</sub>(13), thus factor *N*−1 is equivalent to factor 13<sup>576</sup>−1, and for the factorization of 13<sup>576</sup>−1, see http://myfactorcollection.mooo.com:8090/cgi-bin/showSingleEntry?Base=13&Exp=576&c0=-&EN=

Although these numbers also have *N*−1 or *N*+1 is product of a Cunningham number and a small number, but since the corresponding Cunningham numbers are < 25% factored, these numbers still need primality certificates:

the 151st minimal prime in base 9, 30<sub>1158</sub>11, *N*−1 is 9×*S*<sub>2319</sub>(3), thus factor *N*−1 is equivalent to factor 3<sup>2319</sup>+1, *N*−1 is only 12.693% factored, and for the factorization of 3<sup>2319</sup>+1, see http://myfactorcollection.mooo.com:8090/cgi-bin/showSingleEntry?Base=3&Exp=2319&c0=%2B&EN=

the 3187th minimal prime in base 13, 7<sub>1504</sub>1, *N*−1 is 91×*R*<sub>1504</sub>(13), thus factor *N*−1 is equivalent to factor 13<sup>1504</sup>−1, *N*−1 is only 28.604% factored (since 28.604% is between 25% and 33.3333%, *CHG* proof is possible, however, since *factordb* (http://factordb.com/) lacks the ability to verify *CHG* proofs, thus there is still primality certificate in *factordb*), and for the factorization of 13<sup>1504</sup>−1, see http://myfactorcollection.mooo.com:8090/cgi-bin/showSingleEntry?Base=13&Exp=1504&c0=-&EN=

the 2342nd minimal prime in base 16, 90<sub>3542</sub>91, *N*−1 is 144×*S*<sub>3543</sub>(16), thus factor *N*−1 is equivalent to factor 16<sup>3543</sup>+1, *N*−1 is only 1.255% factored, and for the factorization of 16<sup>3543</sup>+1, see http://myfactorcollection.mooo.com:8090/cgi-bin/showSingleEntry?Base=16&Exp=3543&c0=%2B&EN=