Projective Planes of Order 49 Related to t12


I am currently compiling a list of known projective planes of order 49. As part of this enumeration, here are listed the plane t12 and all known planes of order 49 obtained from it by dualizing and deriving. Coming soon: also planes related by the method of lifting quotients. This list is currently incomplete; check back later for a complete enumeration.

Following the table is a key to the table.


Known Projective Planes of Order 49 Related to t12

Entry Plane |Autgp| Point Orbits Line Orbits 7-rank
1 Translation Plane t12, dual dt12 230496 23,4,8,162,2401 1,983,196,392,7842 941
2 t12_0_0, dt12_0_0 2058 1,756,2058 18,42,4949 987
3 t12_0_1, dt12_0_1 2058 1,756,2058 18,42,4949 987
4 t12_0_2, dt12_0_2 2058 1,756,2058 18,42,4949 987
5 t12_0_3, dt12_0_3 2058 1,756,2058 18,42,4949 987
6 t12_0_4, dt12_0_4 2058 1,756,2058 18,42,4949 987
7 t12_0_5, dt12_0_5 2058 1,756,2058 18,42,4949 987
8 t12_0_6, dt12_0_6 2058 1,756,2058 18,42,4949 987
9 t12_0_7, dt12_0_7 2058 1,756,2058 18,42,4949 987
10 t12_1_0, dt12_1_0 2058 1,756,2058 18,42,4949 987
11 t12_1_1, dt12_1_1 2058 1,756,2058 18,42,4949 987
12 t12_1_2, dt12_1_2 2058 1,756,2058 18,42,4949 987
13 t12_1_3, dt12_1_3 2058 1,756,2058 18,42,4949 987
14 t12_1_4, dt12_1_4 2058 1,756,2058 18,42,4949 987
15 t12_1_5, dt12_1_5 2058 1,756,2058 18,42,4949 987
16 t12_1_6, dt12_1_6 2058 1,756,2058 18,42,4949 987
17 t12_1_7, dt12_1_7 2058 1,756,2058 18,42,4949 987
18 t12_2_0, dt12_2_0 2058 1,756,2058 18,42,4949 987
19 t12_2_1, dt12_2_1 2058 1,756,2058 18,42,4949 987
20 t12_2_2, dt12_2_2 2058 1,756,2058 18,42,4949 987
21 t12_2_3, dt12_2_3 2058 1,756,2058 18,42,4949 987
22 t12_3_0, dt12_3_0 2058 1,756,2058 18,42,4949 987
23 t12_3_1, dt12_3_1 2058 1,756,2058 18,42,4949 987
24 t12_4_0, dt12_4_0 2058 1,756,2058 18,42,4949 987
25 t12_5_0, dt12_5_0 2058 1,756,2058 18,42,4949 987
26 t12_6_0, dt12_6_0 2058 1,756,2058 18,42,4949 987

Key to the table

Only one line is displayed for both a plane and its dual, an asterisk (*) in the first column indicating that the plane is self-dual. Each line includes the following information and isomorphism invariants for each plane.


/ revised June, 2010