mersenneforum.org Aliquot sequences that start on the integer powers n^i
 User Name Remember Me? Password
 Register FAQ Search Today's Posts Mark Forums Read

 2018-10-15, 20:19 #34 RichD     Sep 2008 Kansas 22·3·5·53 Posts 13^79 terminates with a p13.
 2018-10-15, 22:34 #35 richs     "Rich" Aug 2002 Benicia, California 1,171 Posts 6^93 aliqueit: Code: Verifying index 98... Sequence merges with earlier sequence 1964525685310696048861640520577309969855714580014343466931029624497848886 = 2 * 61 * 6343 * 224951 * 432261855658664827 * 26107682809895863587997006586579985155412533
 2018-10-16, 07:52 #36 LaurV Romulan Interpreter     Jun 2011 Thailand 8,963 Posts It means nothing, you must continue it until it ends or you are getting bored of it. Aliqueit gives this message when a term lower than the starting term is reached (which makes sense when we work all sequences from 0 to 3M in order, as we usually do, we merge the higher sequence into the lower one, but in this context, unless we are going to work all sequences starting with 73 digits... we do not know what the lower sequence does, so it makes no sense to stop here). Aliqueit has a continuation switch that allows it to continue working in this case, use it. Last fiddled with by LaurV on 2018-10-16 at 07:55
 2018-10-16, 11:13 #37 kar_bon     Mar 2006 Germany 2,857 Posts 11^14 terminates in p=41 After reaching the 120-digit level at index 1000 (with a 2^4) I decided to continue and getting the downdriver at index 1008. Lucky falling for more than 110 digits after a small increase.
2018-10-16, 13:17   #38
richs

"Rich"
Aug 2002
Benicia, California

1,171 Posts

Quote:
 Originally Posted by LaurV It means nothing, you must continue it until it ends or you are getting bored of it. Aliqueit gives this message when a term lower than the starting term is reached (which makes sense when we work all sequences from 0 to 3M in order, as we usually do, we merge the higher sequence into the lower one, but in this context, unless we are going to work all sequences starting with 73 digits... we do not know what the lower sequence does, so it makes no sense to stop here). Aliqueit has a continuation switch that allows it to continue working in this case, use it.
I had not reserved 6^93; I was using it to play with aliqueit on a number with a fair number of digits. Just found it interesting.

 2018-10-16, 20:30 #39 MisterBitcoin     "Nuri, the dragon :P" Jul 2016 Good old Germany 2E616 Posts Drop 12^75, C108 cofactor not ECMÂ´ed.
 2018-10-21, 17:32 #40 garambois     Oct 2011 24×23 Posts All is done. Thank you for your help !
 2018-10-25, 08:38 #41 garambois     Oct 2011 24×23 Posts I would like to thank a lot Karsten Bonath once again. He has further improved the page by adding tooltips that show aliquot sequence merges. Now, the page contains even more information about "Aliquot sequences starting on integer powers n^i".
 2018-10-25, 11:47 #42 RichD     Sep 2008 Kansas C6C16 Posts 12^94 terminates with a p74.
 2018-10-25, 14:13 #43 kar_bon     Mar 2006 Germany 285710 Posts 12^88 and 12^96 terminate Merge for n=12^35 35 380 3876:i5
 2018-10-26, 10:40 #44 LaurV Romulan Interpreter     Jun 2011 Thailand 896310 Posts I have just seen (and factored) the C112 which enabled the termination of 6^146. (edit: Stone drop...) Last fiddled with by LaurV on 2018-10-26 at 10:42

 Thread Tools

 Similar Threads Thread Thread Starter Forum Replies Last Post fivemack FactorDB 45 2020-05-16 15:22 schickel FactorDB 18 2013-06-12 16:09 garambois Aliquot Sequences 34 2012-06-10 21:53 Andi47 FactorDB 21 2011-12-29 21:11 schickel mersennewiki 0 2008-12-30 07:07

All times are UTC. The time now is 14:23.

Fri Dec 4 14:23:08 UTC 2020 up 1 day, 10:34, 0 users, load averages: 1.39, 1.46, 1.66

Powered by vBulletin® Version 3.8.11
Copyright ©2000 - 2020, Jelsoft Enterprises Ltd.

This forum has received and complied with 0 (zero) government requests for information.

Permission is granted to copy, distribute and/or modify this document under the terms of the GNU Free Documentation License, Version 1.2 or any later version published by the Free Software Foundation.
A copy of the license is included in the FAQ.