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Reservations
Reserving the following 1ker's to n=100K
R859 R866 R879 R908 R968 R1021 R1025 S935 S939 S968 S983 S1013 S1026 |
1 Attachment(s)
S914, S917 and S930 last k's tested to n=100K.
No primes. Bases released. |
The following are complete to n=25K and released:
S754; k=99, 159, 199, & 214 remain; highest prime 241*754^15618+1 S892; k=46, 51, 93, 118, & 151 remain; highest prime 16*892^5475+1 That completes the 6kers. |
R578
1 Attachment(s)
Riesel 578 is complete to n=25K.
Results attached. Base released. |
I'd like to take S588 from 25K to 50K (maybe more later; above 60K would make for a top 5000 prime).
According to vmod's new script, this is the highest-weight 1k conjecture still unreserved at n=25K. |
Reserving all remaining 8-kers to n=25K as follows:
R712 S504 S558 S680 S716 |
Riesel 866
Riesel 866, the last k, tested n=25K-100K. Nothing found.
Results emailed. Base released |
The following 7kers are complete to n=25K and released:
R643; k=114, 162, 174, & 206 remain; highest prime 216*643^16186-1 R780; k=109, 122, & 221 remain; highest prime 25*780^19167-1 R893; k=22, 40, 50, 94, & 134 remain; highest prime 122*893^11208-1 S678; k=106, 122, 132, 171, & 188 remain; highest prime 29*678^10818+1 S873; k=24, 68, 116, 150, & 206 remain; highest prime 88*873^6970+1 |
Riesel 879
Riesel 879, the last k, tested n=25K-100K. Nothing found.
Results emailed. Base released |
The following 7kers are complete to n=25K and released:
R680; k=59 & 116 remain; highest prime 101*680^16836-1 S806; k=122, 140, & 163 remain; highest prime 121*806^19766+1 S922; k=30, 138, & 214 remain; highest prime 142*922^16611+1 I finally got several with good groupings of primes to add one 2ker and two 3kers to the proven/1K/2K/3K lists. Only 2 more 7kers to go. |
Riesel 968
Riesel 968, the last k, tested n=50K-100K. Nothing found.
Results emailed. Base released |
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