20200802, 20:24  #12 
May 2007
Kansas; USA
2801_{16} Posts 

20200804, 09:58  #13 
Just call me Henry
"David"
Sep 2007
Cambridge (GMT/BST)
1011001110100_{2} Posts 

20200804, 12:09  #14 
"Mark"
Apr 2003
Between here and the
2^{3}×751 Posts 

20200804, 13:52  #15 
Just call me Henry
"David"
Sep 2007
Cambridge (GMT/BST)
2^{2}·3·479 Posts 
Yes that could make sense.
Last fiddled with by henryzz on 20200804 at 15:08 
20200804, 19:36  #16 
May 2007
Kansas; USA
7^{2}·11·19 Posts 
Agreed

20201022, 07:52  #17 
Nov 2016
9C0_{16} Posts 
Is srsieve2 updated? If so, can you use it to reserve the S3 problem in Sierpinski conjectures and proofs and the R43 problem in Riesel conjectures and proofs? (the latter is a 1k base and I have already used PARI to search it to 12K with no (probable) prime found)

20201022, 12:14  #18 
"Mark"
Apr 2003
Between here and the
2^{3}·751 Posts 
I have not made the change. Too busy.

20201101, 00:25  #19 
Nov 2016
2^{6}·3·13 Posts 
See the edit https://github.com/curtisbright/mepn...914128b3303960 in GitHub, you can just remove srsieve divisible by 2 check.

20201101, 00:36  #20 
Nov 2016
2^{6}·3·13 Posts 
By the way, this removing is original used for solving the "minimal prime problem" for odd bases, in 2015, a megadigit (probable) prime (106*23^8008737)/11 (which is 9{E_800873} in base 23, and the largest minimal prime in base 23) was found to solve the "minimal prime problem" in base 23 (see PRP top link), if one allows probable primes in place of proven primes.
The "minimal prime problem" is solved only for bases 2~16, 18, 20, 22~24, 30, 42, bases <=30 are still reserving (see https://github.com/curtisbright/mepn...ee/master/data, like the CRUS reserving for unproven Sierpinski/Riesel problems) and currently at width 200K and above, but bases 31~50 (see https://github.com/RaymondDevillers/primes) are currently only at width 10K, you can also reserve them like the CRUS reserving. Note: There are some minimal prime for base 31~50 with width > 10K found by CRUS: Base 37: (families FY{a} and R8{a} can be removed) 590*37^220211 (= FY{a_22021}) 1008*37^208951 (= R8{a_20895}) Base 45: (families O{0}1 and AO{0}1 can be removed, and hence families O{0}1F1, O{0}ZZ1, unless they have small (probable) prime) 24*45^18522+1 (= O{0_18521}1) 474*45^44791+1 (= AO{0_44790}1) [this prime is not minimal prime] Base 49: (families 11c{0}1, Fd{0}1, SL{m} and Yd{m} can be removed, and hence families S6L{m}, YUUd{m}, YUd{m}, unless they have small (probable) prime) 2488*49^29737+1 (= 11c{0_29736}1) 774*49^18341+1 (= Fd{0_18340}1) 1394*49^526981 (= SL{m_52698}) 1706*49^163371 (= Yd{m_16337}) Also, I have found a minimal prime with width > 10K in base 40: (13998*40^12381+29)/13, which equals Qa{U_12380}X in base 40 (the only other unsolved family in base 40 (S{Q}d (86*40^n+37)/3) was tested by me to width 87437, no (probable) prime found Last fiddled with by sweety439 on 20201101 at 00:38 