User:Lériendil/Third-superparticulars and semiparticulars by prime subgroup: Difference between revisions
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== 4-prime no-threes subgroups and 5-prime subgroups == | == 4-prime no-threes subgroups and 5-prime subgroups == | ||
=== 7-add-one-limit (L7.p) === | === 5-add-two-limit (L5.p.q) === | ||
==== 7-add-one-limit (L7.p) ==== | |||
== See also == | == See also == | ||
* [[User:Lériendil/Square_and_triangle_superparticulars_by_prime_subgroup|Square and triangle superparticulars by prime subgroup]] | * [[User:Lériendil/Square_and_triangle_superparticulars_by_prime_subgroup|Square and triangle superparticulars by prime subgroup]] | ||
Revision as of 02:46, 26 July 2024
Some shorthand notation used here:
- Sk stands for k^2/[(k-1)(k+1)] by standard convention (the kth square superparticular).
- Gk stands for S(k-1)*Sk*S(k+1) (the kth third-particular).
- Rk stands for S(k-1)/S(k+1) (the kth semiparticular).
- Tk = Sk * S(k+1) stands for [k(k+1)/2]/[(k-1)(k+2)/2] (the kth triangle superparticular).
- Lp refers to the p-limit, i.e. the subgroup of primes less than or equal to p.
- Lp(-q) refers to the p limit with the prime q omitted: e.g. L17(-11) refers to the 2.3.5.7.13.17 subgroup; these omissions can be stacked so that L23(-5.17) refers to the group 2.3.7.11.13.19.23.
Note that not all members of Gk and Rk are superparticular. In particular, G(3k) is throdd-particular, and R(4k) is odd-particular. Such ratios will be excluded from consideration in this chart, though they will appear on companion no-twos and no-threes pages.
This list eventually aims to be complete to the 17-add-two-limit and the 29-add-one-limit, i.e. the union of the class of subgroups with at most one prime greater than 29, which is a superset of the 31-limit, and the class of subgroups with at most two primes greater than 17, which is a superset of the 23-limit.
2- and 3-prime subgroups (2.p, 2.3.p, and 2.5.p)
Note that the following lists are complete and the insertion of higher primes will add no new inclusions to them.
2-prime subgroups (2.p)
| Third-particular | Subgroup | Comma | |
|---|---|---|---|
| Ratio | Smonzo | ||
| G4 = R3 | 2.5 | 5/4 | [-2 1⟩ |
| G5 | 2.7 | 8/7 | [3 -1⟩ |
3-prime subgroups (2.3.p)
| Third-particular | Subgroup | Comma | Semiparticular | Subgroup | Comma | ||
|---|---|---|---|---|---|---|---|
| Ratio | Smonzo | Ratio | Smonzo | ||||
| G7 = S4 | L5 | 16/15 | [4 -1 -1⟩ | R7 = S9 | L5 | 81/80 | [-4 4 -1⟩ |
| R5 = T7 | 2.3.7 | 28/27 | [2 -3 1⟩ | ||||
| G10 | 2.3.11 | 33/32 | [-5 1 1⟩ | R10 | 2.3.11 | 243/242 | [-1 5 -2⟩ |
3-prime subgroups (2.5.p)
| Superparticular | Subgroup | Comma | |
|---|---|---|---|
| Ratio | Smonzo | ||
| R6 | 2.5.7 | 50/49 | [1 2 -2⟩ |
| G14 | 2.5.13 | 65/64 | [-6 1 1⟩ |
4-prime subgroups with threes
Note that the following lists are complete and the insertion of higher primes will add no new inclusions to them.
5-add-one-limit (L5.p)
| Third-particular | Subgroup | Comma | Semiparticular | Subgroup | Comma | ||
|---|---|---|---|---|---|---|---|
| Ratio | Smonzo | Ratio | Smonzo | ||||
| G8 = T6 | L7 | 21/20 | [-2 1 -1 1⟩ | ||||
| G26 = S15 | L7 | 225/224 | [-5 2 2 -1⟩ | R26 | L7 | 4375/4374 | [-1 -7 4 1⟩ |
| G11 | L5.13 | 40/39 | [3 -1 1 -1⟩ | R11 = T25 | L5.13 | 325/324 | [-2 -4 2 1⟩ |
| R14 = S26 | L5.13 | 676/675 | [2 -3 -2 2⟩ | ||||
| G17 | L5.19 | 96/95 | [5 1 -1 -1⟩ | R17 | L5.19 | 1216/1215 | [6 -5 -1 1⟩ |
Higher primes
| Third-particular | Subgroup | Comma | Semiparticular | Subgroup | Comma | ||
|---|---|---|---|---|---|---|---|
| Ratio | Smonzo | Ratio | Smonzo | ||||
| G25 | 2.3.13.23 | 208/207 | [4 -2 1 -1⟩ | R25 | 2.3.13.23 | 3888/3887 | [4 5 -2 -1⟩ |