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In mathematics, a Riesel number is an odd natural number k for which is Composite number for all natural numbers n . In other words, when k is a Riesel number, all members of the following set are composite:
If the form is instead , then k is a Sierpiński number.
To check if there are k < 509203, the Riesel Sieve (analogous to Seventeen or Bust for Sierpiński numbers) started with 101 candidates k. As of December 2022, 57 of these k had been eliminated by Riesel Sieve, PrimeGrid, or outside persons. The remaining 41 values of k that have yielded only composite numbers for all values of n so far tested are
The most recent elimination was in August 2024, when 107347 × 223427517 − 1 was found to be prime by Ryan Propper. This number is 7,052,391 digits long.
As of January 2023, PrimeGrid has searched the remaining candidates up to n = 14,900,000.
Related sequences are (not allowing n = 0), for odd ks, see or (not allowing n = 0).
The smallest n which 2 n − k is prime are (for odd ks, and this sequence requires that 2 n > k)
The odd ks which k − 2 n are all composite for all 2 n < k (the de Polignac numbers) are
The unknown values of ks are (for which 2 n > k)
Example 1: All numbers congruent to 84687 mod 10124569 and not congruent to 1 mod 5 are Riesel numbers base 6, because of the covering set {7, 13, 31, 37, 97}. Besides, these k are not trivial since gcd( k + 1, 6 − 1) = 1 for these k. (The Riesel base 6 conjecture is not proven, it has 3 remaining k, namely 1597, 9582 and 57492)
Example 2: 6 is a Riesel number to all bases b congruent to 34 mod 35, because if b is congruent to 34 mod 35, then 6× b n − 1 is divisible by 5 for all even n and divisible by 7 for all odd n. Besides, 6 is not a trivial k in these bases b since gcd(6 − 1, b − 1) = 1 for these bases b.
Example 3: All squares k congruent to 12 mod 13 and not congruent to 1 mod 11 are Riesel numbers base 12, since for all such k, k×12 n − 1 has algebraic factors for all even n and divisible by 13 for all odd n. Besides, these k are not trivial since gcd( k + 1, 12 − 1) = 1 for these k. (The Riesel base 12 conjecture is proven)
Example 4: If k is between a multiple of 5 and a multiple of 11, then k×109 n − 1 is divisible by either 5 or 11 for all positive integers n. The first few such k are 21, 34, 76, 89, 131, 144, ... However, all these k < 144 are also trivial k (i. e. gcd( k − 1, 109 − 1) is not 1). Thus, the smallest Riesel number base 109 is 144. (The Riesel base 109 conjecture is not proven, it has one remaining k, namely 84)
Example 5: If k is square, then k×49 n − 1 has algebraic factors for all positive integers n. The first few positive squares are 1, 4, 9, 16, 25, 36, ... However, all these k < 36 are also trivial k (i. e. gcd( k − 1, 49 − 1) is not 1). Thus, the smallest Riesel number base 49 is 36. (The Riesel base 49 conjecture is proven)
We want to find and proof the smallest Riesel number base b for every integer b ≥ 2. It is a conjecture that if k is a Riesel number base b, then at least one of the three conditions holds:
In the following list, we only consider those positive integers k such that gcd( k − 1, b − 1) = 1, and all integer n must be ≥ 1.
Note: k-values that are a multiple of b and where k−1 is not prime are included in the conjectures (and included in the remaining k with color if no primes are known for these k-values) but excluded from testing (Thus, never be the k of "largest 5 primes found"), since such k-values will have the same prime as k / b.
| b | conjectured smallest Riesel k | covering set / algebraic factors | remaining k with no known primes (red indicates the k-values that are a multiple of b and k−1 is not prime) | number of remaining k with no known primes (excluding the red ks) | testing limit of n (excluding the red ks) | largest 5 primes found (excluding red ks) |
| 2 | 509203 | {3, 5, 7, 13, 17, 241} | 23669, 31859, 38473, 46663, , , 67117, 74699, , 81041, , , 107347, 121889, , 129007, , 143047, , , 161669, , , , 206231, , 215443, 226153, 234343, , 245561, 250027, , , , , , , 315929, 319511, , 324011, , 325123, 327671, 336839, 342847, 344759, 362609, 363343, 364903, 365159, 368411, 371893, , 384539, 386801, , 397027, 409753, , , , 444637, , , 470173, 474491, 477583, 485557, , , 494743, | 42 | PrimeGrid is currently searching every remaining k at n > 14.5M | 97139×218397548−1 93839×215337656−1 192971×214773498−1 206039×213104952−1 2293×212918431−1 |
| 3 | 63064644938 | {5, 7, 13, 17, 19, 37, 41, 193, 757} | 3677878, 6878756, 10463066, 10789522, , 16874152, 18137648, , 21368582, 29140796, 31064666, , , , 38394682, 40175404, 40396658, , 51672206, 52072432, , 56244334, 59254534, , 62126002, 62402206, , 65337866, 71248336, , , , 94210372, , 97621124, , 103101766, 103528408, 107735486, 111036578, 115125596, , ... | 100714 | k = 3677878 at n = 5M, 4M < k ≤ 2.147G at n = 1.07M, 2.147G < k ≤ 6G at n = 500K, 6G < k ≤ 10G at n = 250K, 10G < k ≤ 63G at n = 100K, , k > 63G at n = 655K | 676373272×31072675−1 1068687512×31067484−1 1483575692×31067339−1 780548926×31064065−1 1776322388×31053069−1 |
| 4 | 9 | 9×4 n − 1 = (3×2 n − 1) × (3×2 n + 1) | none (proven) | 0 | − | 8×41−1 6×41−1 5×41−1 3×41−1 2×41−1 |
| 5 | 346802 | {3, 7, 13, 31, 601} | 4906, 23906, , 26222, 35248, 68132, 71146, 76354, 81134, 92936, 102952, 109238, 109862, , , 127174, , 131848, 134266, 143632, 145462, 145484, 146756, 147844, 151042, 152428, 154844, 159388, 164852, 170386, 170908, , , 182398, 187916, 189766, 190334, 195872, 201778, 204394, 206894, 231674, 239062, 239342, 246238, 248546, 259072, , 265702, 267298, 271162, 285598, 285728, 298442, 304004, 313126, 318278, 325922, 335414, 338866, | 54 | PrimeGrid is currently searching every remaining k at n > 4.8M | 3622×57558139-1 136804×54777253-1 52922×54399812-1 177742×54386703-1 213988×54138363-1 |
| 6 | 84687 | {7, 13, 31, 37, 97} | 1597, , | 1 | 5M | 36772×61723287−1 43994×6569498−1 77743×6560745−1 51017×6528803−1 57023×6483561−1 |
| 7 | 408034255082 | {5, 13, 19, 43, 73, 181, 193, 1201} | 315768, 1356018, , 2494112, 2631672, 3423408, 4322834, 4326672, 4363418, 4382984, 4870566, 4990788, 5529368, 6279074, 6463028, 6544614, 7446728, 7553594, 8057622, 8354966, 8389476, 8640204, 8733908, , 9829784, 10096364, 10098716, 10243424, 10289166, 10394778, 10494794, 10965842, 11250728, 11335962, 11372214, 11522846, 11684954, 11943810, 11952888, 11983634, 12017634, 12065672, 12186164, 12269808, 12291728, 12801926, 13190732, 13264728, 13321148, 13635266, 13976426, ... | 16399 ks ≤ 1G | k ≤ 2M at n = 1M, 2M < k ≤ 10M at n = 500K, 10M < k ≤ 110M at n = 150K, 110M < k ≤ 300M at n = 100K, 300M < k ≤ 1G at n = 25K | 1620198×7684923−1 7030248×7483691−1 7320606×7464761−1 5646066×7460533−1 9012942×7425310−1 |
| 8 | 14 | {3, 5, 13} | none (proven) | 0 | − | 11×818−1 5×84−1 12×83−1 7×83−1 2×82−1 |
| 9 | 4 | 4×9 n − 1 = (2×3 n − 1) × (2×3 n + 1) | none (proven) | 0 | − | 2×91−1 |
| 10 | 10176 | {7, 11, 13, 37} | 4421 | 1 | 1.72M | 7019×10881309−1 8579×10373260−1 6665×1060248−1 1935×1051836−1 1803×1045882−1 |
| 11 | 862 | {3, 7, 19, 37} | none (proven) | 0 | − | 62×1126202−1 308×11444−1 172×11187−1 284×11186−1 518×1178−1 |
| 12 | 25 | {13} for odd n, 25×12 n − 1 = (5×12 n/2 − 1) × (5×12 n/2 + 1) for even n | none (proven) | 0 | − | 24×124−1 18×122−1 17×122−1 13×122−1 10×122−1 |
| 13 | 302 | {5, 7, 17} | none (proven) | 0 | − | 288×13109217−1 146×1330−1 92×1323−1 102×1320−1 300×1310−1 |
| 14 | 4 | {3, 5} | none (proven) | 0 | − | 2×144−1 3×141−1 |
| 15 | 36370321851498 | {13, 17, 113, 211, 241, 1489, 3877} | 381714, 4502952, 5237186, , 7256276, 8524154, 11118550, 11176190, 12232180, 15691976, 16338798, 16695396, 18267324, 18709072, 19615792, ... | 14 ks ≤ 20M | k ≤ 10M at n = 1M, 10M < k ≤ 20M at n = 250K | 4242104×15728840−1 9756404×15527590−1 9105446×15496499−1 5854146×15428616−1 9535278×15375675−1 |
| 16 | 9 | 9×16 n − 1 = (3×4 n − 1) × (3×4 n + 1) | none (proven) | 0 | − | 8×161−1 5×161−1 3×161−1 2×161−1 |
| 17 | 86 | {3, 5, 29} | none (proven) | 0 | − | 44×176488−1 36×17243−1 10×17117−1 26×17110−1 58×1735−1 |
| 18 | 246 | {5, 13, 19} | none (proven) | 0 | − | 151×18418−1 78×18172−1 50×18110−1 79×1863−1 237×1844−1 |
| 19 | 144 | {5} for odd n, 144×19 n − 1 = (12×19 n/2 − 1) × (12×19 n/2 + 1) for even n | none (proven) | 0 | − | 134×19202−1 104×1918−1 38×1911−1 128×1910−1 108×196−1 |
| 20 | 8 | {3, 7} | none (proven) | 0 | − | 2×2010−1 6×202−1 5×202−1 7×201−1 3×201−1 |
| 21 | 560 | {11, 13, 17} | none (proven) | 0 | − | 64×212867−1 494×21978−1 154×21103−1 84×2188−1 142×2148−1 |
| 22 | 4461 | {5, 23, 97} | 3656 | 1 | 2M | 3104×22161188−1 4001×2236614−1 2853×2227975−1 1013×2226067−1 4118×2212347−1 |
| 23 | 476 | {3, 5, 53} | 404 | 1 | 1.35M | 194×23211140−1 134×2327932−1 394×2320169−1 314×2317268−1 464×237548−1 |
| 24 | 4 | {5} for odd n, 4×24 n − 1 = (2×24 n/2 − 1) × (2×24 n/2 + 1) for even n | none (proven) | 0 | − | 3×241−1 2×241−1 |
| 25 | 36 | 36×25 n − 1 = (6×5 n − 1) × (6×5 n + 1) | none (proven) | 0 | − | 32×254−1 30×252−1 26×252−1 12×252−1 2×252−1 |
| 26 | 149 | {3, 7, 31, 37} | none (proven) | 0 | − | 115×26520277−1 32×269812−1 73×26537−1 80×26382−1 128×26300−1 |
| 27 | 8 | 8×27 n − 1 = (2×3 n − 1) × (4×9 n + 2×3 n + 1) | none (proven) | 0 | − | 6×272−1 4×271−1 2×271−1 |
| 28 | 144 | {29} for odd n, 144×28 n − 1 = (12×28 n/2 − 1) × (12×28 n/2 + 1) for even n | none (proven) | 0 | − | 107×2874−1 122×2871−1 101×2853−1 14×2847−1 90×2836−1 |
| 29 | 4 | {3, 5} | none (proven) | 0 | − | 2×29136−1 |
| 30 | 1369 | {7, 13, 19} for odd n, 1369×30 n − 1 = (37×30 n/2 − 1) × (37×30 n/2 + 1) for even n | 659, 1024 | 2 | 500K | 239×30337990−1 249×30199355−1 225×30158755−1 774×30148344−1 25×3034205−1 |
| 31 | 134718 | {7, 13, 19, 37, 331} | 55758 | 1 | 3M | 6962×312863120−1 126072×31374323−1 43902×31251859−1 55940×31197599−1 101022×31133208−1 |
| 32 | 10 | {3, 11} | none (proven) | 0 | − | 3×3211−1 2×326−1 9×323−1 8×322−1 5×322−1 |
Conjectured smallest Riesel number base n are (start with n = 2)
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