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Difference between revisions of "Riesel problem 1"
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The '''Riesel problem''' consists in determining the smallest [[Riesel number]]. | The '''Riesel problem''' consists in determining the smallest [[Riesel number]]. | ||
− | In 1956, [[Hans Riesel]] showed that there are an infinite number of integers ''k'' such that | + | ==Explanations== |
− | It is conjectured that | + | In 1956, [[Hans Riesel]] showed that there are an infinite number of integers ''k'' such that {{Kbn|k|2|n}} is not prime for any integer ''n''. He showed that the number ''k = {{Num|509203}}'' has this property. |
+ | It is conjectured that this ''k'' is the smallest such number that has this property. To prove this, it suffices to show that there exists a value ''n'' such that {{Kbn|k|2|n}} is prime for each ''k'' < {{Num|509203}}. | ||
+ | |||
+ | Currently there are '''{{#expr:{{PAGESINCATEGORY:PrimeGrid Riesel Problem}}-1}}''' ''k''-values smaller than {{Num|509203}} that have no known prime which are reserved by the [[PrimeGrid Riesel Problem]] search. | ||
+ | |||
+ | ==Frequencies== | ||
+ | ===Definition=== | ||
+ | Let ''f<sub>m</sub>'' define the number of ''k''-values (''k'' < {{Num|509203}}, odd ''k'', {{Num|254601}} candidates) with a first prime of {{Kbn|k|2|n}} with ''n'' in the interval 2<sup>m</sup> ≤ n < 2<sup>m+1</sup> <ref>[http://www.prothsearch.com/rieselprob.html Riesel problem] by [[Wilfrid Keller]]</ref>. | ||
+ | |||
+ | ===Data table=== | ||
+ | The following table shows the current available ''k''-values in this Wiki and the targeted values shown by W.Keller for any ''m'' ≤ 23. | ||
+ | |||
+ | {| class="wikitable" style="text-align:right;" | ||
+ | !''m''!!remain!!current!!target | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f0|0]] || {{Num|254601}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f0|pages|R}}}} || {{Num|39867}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f1|1]] || {{Num|214734}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f1|pages|R}}}} || {{Num|59460}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f2|2]] || {{Num|155274}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f2|pages|R}}}} || {{Num|62311}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f3|3]] || {{Num|92963}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f3|pages|R}}}} || {{Num|45177}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f4|4]] || {{Num|47786}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f4|pages|R}}}} || {{Num|24478}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f5|5]] || {{Num|23308}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f5|pages|R}}}} || {{Num|11668}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f6|6]] || {{Num|11640}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f6|pages|R}}}} || {{Num|5360}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f7|7]] || {{Num|6280}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f7|pages|R}}}} || {{Num|2728}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f8|8]] || {{Num|3552}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f8|pages|R}}}} || {{Num|1337}} | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f9|9]] || {{Num|2215}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f9|pages|R}}}} || 785 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f10|10]] || {{Num|1430}} || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f10|pages|R}}}} || 467 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f11|11]] || 963 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f11|pages|R}}}} || 289 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f12|12]] || 674 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f12|pages|R}}}} || 191 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f13|13]] || 483 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f13|pages|R}}}} || 125 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f14|14]] || 358 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f14|pages|R}}}} || 87 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f15|15]] || 271 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f15|pages|R}}}} || 62 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f16|16]] || 209 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f16|pages|R}}}} || 38 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f17|17]] || 171 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f17|pages|R}}}} || 35 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f18|18]] || 136 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f18|pages|R}}}} || 25 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f19|19]] || 111 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f19|pages|R}}}} || 22 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f20|20]] || 89 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f20|pages|R}}}} || 18 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f21|21]] || 71 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f21|pages|R}}}} || 13 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f22|22]] || 58 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f22|pages|R}}}} || 8 | ||
+ | |- | ||
+ | | [[:Category:Riesel prime riesel f23|23]] || 50 || {{Num|{{PAGESINCATEGORY:Riesel prime riesel f23|pages|R}}}} || ≥ 1 | ||
+ | |- | ||
+ | | [[:Category:PrimeGrid Riesel Problem|unknown]] || 49 || {{Num|{{#expr:{{PAGESINCATEGORY:PrimeGrid Riesel Problem|pages|R}}-1}}}} || 0 | ||
+ | |} | ||
+ | |||
+ | ==Notes== | ||
+ | <references /> | ||
==See also== | ==See also== |
Revision as of 15:46, 13 July 2020
This article is only a stub. You can help PrimeWiki by expanding it. |
The Riesel problem consists in determining the smallest Riesel number.
Contents
Explanations
In 1956, Hans Riesel showed that there are an infinite number of integers k such that k•2n-1 is not prime for any integer n. He showed that the number k = 509,203 has this property. It is conjectured that this k is the smallest such number that has this property. To prove this, it suffices to show that there exists a value n such that k•2n-1 is prime for each k < 509,203.
Currently there are -1 k-values smaller than 509,203 that have no known prime which are reserved by the PrimeGrid Riesel Problem search.
Frequencies
Definition
Let fm define the number of k-values (k < 509,203, odd k, 254,601 candidates) with a first prime of k•2n-1 with n in the interval 2m ≤ n < 2m+1 [1].
Data table
The following table shows the current available k-values in this Wiki and the targeted values shown by W.Keller for any m ≤ 23.
m | remain | current | target |
---|---|---|---|
0 | 254,601 | 0 | 39,867 |
1 | 214,734 | 0 | 59,460 |
2 | 155,274 | 0 | 62,311 |
3 | 92,963 | 0 | 45,177 |
4 | 47,786 | 0 | 24,478 |
5 | 23,308 | 0 | 11,668 |
6 | 11,640 | 0 | 5,360 |
7 | 6,280 | 0 | 2,728 |
8 | 3,552 | 0 | 1,337 |
9 | 2,215 | 0 | 785 |
10 | 1,430 | 0 | 467 |
11 | 963 | 0 | 289 |
12 | 674 | 0 | 191 |
13 | 483 | 0 | 125 |
14 | 358 | 0 | 87 |
15 | 271 | 0 | 62 |
16 | 209 | 0 | 38 |
17 | 171 | 0 | 35 |
18 | 136 | 0 | 25 |
19 | 111 | 0 | 22 |
20 | 89 | 0 | 18 |
21 | 71 | 0 | 13 |
22 | 58 | 0 | 8 |
23 | 50 | 0 | ≥ 1 |
unknown | 49 | -1 | 0 |