clan: 7-(24,12,2128), 2 times reduced t
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23
Tran van Trung construction with complementary design for 5-(23,11,6384) (# 9325)
design 6-(24,12,6384) (# 9328) with respect to smaller t
Tran van Trung construction (left) for 5-(23,12,10944) (# 9333) : der= 5-(23,11,6384) and res= 5-(23,12,10944) - the given design is the residual.
supplementary design of 6-(24,12,12180) (# 9337) with respect to smaller t

# 3024: 5-(24,12,17334)

clan: 5-(24,12,17334)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3025: 5-(24,12,17340)

clan: 5-(24,12,17340)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3026: 5-(24,12,17346)

clan: 5-(24,12,17346)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3027: 5-(24,12,17352)

clan: 5-(24,12,17352)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3028: 5-(24,12,17358)

clan: 5-(24,12,17358)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3029: 5-(24,12,17364)

clan: 5-(24,12,17364)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3030: 5-(24,12,17370)

clan: 5-(24,12,17370)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3031: 5-(24,12,17376)

clan: 5-(24,12,17376)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3032: 5-(24,12,17382)

clan: 5-(24,12,17382)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3033: 5-(24,12,17388)

clan: 5-(24,12,17388)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3034: 5-(24,12,17394)

clan: 11-(30,15,1338), 3 times derived, 3 times residual
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3035: 5-(24,12,17400)

clan: 5-(24,12,17400)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3036: 5-(24,12,17406)

clan: 5-(24,12,17406)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3037: 5-(24,12,17412)

clan: 5-(24,12,17412)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3038: 5-(24,12,17418)

clan: 5-(24,12,17418)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3039: 5-(24,12,17424)

clan: 5-(24,12,17424)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3040: 5-(24,12,17430)

clan: 5-(24,12,17430)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3041: 5-(24,12,17436)

clan: 5-(24,12,17436)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3042: 5-(24,12,17448)

clan: 5-(24,12,17448)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3043: 5-(24,12,17454)

clan: 5-(24,12,17454)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3044: 5-(24,12,1746)

clan: 5-(24,12,1746)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3045: 5-(24,12,17460)

clan: 5-(24,12,17460)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3046: 5-(24,12,17466)

clan: 5-(24,12,17466)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3047: 5-(24,12,17472)

clan: 13-(32,16,336), 4 times derived, 4 times residual
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3048: 5-(24,12,17478)

clan: 5-(24,12,17478)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3049: 5-(24,12,17484)

clan: 5-(24,12,17484)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3050: 5-(24,12,17490)

clan: 5-(24,12,17490)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3051: 5-(24,12,17496)

clan: 5-(24,12,17496)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3052: 5-(24,12,17502)

clan: 5-(24,12,17502)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3053: 5-(24,12,17508)

clan: 5-(24,12,17508)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3054: 5-(24,12,17514)

clan: 5-(24,12,17514)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3055: 5-(24,12,17520)

clan: 5-(24,12,17520)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3056: 5-(24,12,17526)

clan: 5-(24,12,17526)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3057: 5-(24,12,17532)

clan: 5-(24,12,17532)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3058: 5-(24,12,17538)

clan: 5-(24,12,17538)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3059: 5-(24,12,17544)

clan: 5-(24,12,17544)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3060: 5-(24,12,17550)

clan: 11-(30,15,1350), 3 times derived, 3 times residual
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3061: 5-(24,12,17562)

clan: 5-(24,12,17562)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3062: 5-(24,12,17568)

clan: 5-(24,12,17568)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3063: 5-(24,12,17574)

clan: 5-(24,12,17574)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3064: 5-(24,12,17580)

clan: 5-(24,12,17580)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3065: 5-(24,12,17586)

clan: 5-(24,12,17586)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3066: 5-(24,12,17592)

clan: 5-(24,12,17592)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3067: 5-(24,12,17598)

clan: 5-(24,12,17598)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3068: 5-(24,12,17604)

clan: 5-(24,12,17604)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3069: 5-(24,12,17610)

clan: 5-(24,12,17610)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3070: 5-(24,12,17616)

clan: 5-(24,12,17616)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3071: 5-(24,12,17622)

clan: 5-(24,12,17622)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3072: 5-(24,12,17628)

clan: 13-(32,16,339), 4 times derived, 4 times residual
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3073: 5-(24,12,17634)

clan: 5-(24,12,17634)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3074: 5-(24,12,1764)

clan: 5-(24,12,1764)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3075: 5-(24,12,17640)

clan: 5-(24,12,17640)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3076: 5-(24,12,17646)

clan: 5-(24,12,17646)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3077: 5-(24,12,17652)

clan: 5-(24,12,17652)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3078: 5-(24,12,17658)

clan: 5-(24,12,17658)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3079: 5-(24,12,17664)

clan: 5-(24,12,17664)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3080: 5-(24,12,17670)

clan: 7-(24,12,2170), 2 times reduced t
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23
design 6-(24,12,6510) (# 9796) with respect to smaller t
Tran van Trung construction with complementary design for 5-(23,11,6510) (# 9797)
Tran van Trung construction (right) for 5-(23,11,6510) (# 9797) : der= 5-(23,11,6510) and res= 5-(23,12,11160) - the given design is the derived.
Tran van Trung construction (left) for 5-(23,12,11160) (# 9798) : der= 5-(23,11,6510) and res= 5-(23,12,11160) - the given design is the residual.

# 3081: 5-(24,12,17676)

clan: 5-(24,12,17676)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3082: 5-(24,12,17682)

clan: 5-(24,12,17682)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3083: 5-(24,12,17688)

clan: 5-(24,12,17688)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3084: 5-(24,12,17694)

clan: 5-(24,12,17694)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3085: 5-(24,12,17700)

clan: 5-(24,12,17700)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3086: 5-(24,12,17706)

clan: 11-(30,15,1362), 3 times derived, 3 times residual
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3087: 5-(24,12,17712)

clan: 5-(24,12,17712)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3088: 5-(24,12,17718)

clan: 5-(24,12,17718)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3089: 5-(24,12,17724)

clan: 5-(24,12,17724)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3090: 5-(24,12,17730)

clan: 5-(24,12,17730)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3091: 5-(24,12,17736)

clan: 5-(24,12,17736)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3092: 5-(24,12,17742)

clan: 5-(24,12,17742)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3093: 5-(24,12,17748)

clan: 5-(24,12,17748)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3094: 5-(24,12,17754)

clan: 5-(24,12,17754)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3095: 5-(24,12,17760)

clan: 5-(24,12,17760)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3096: 5-(24,12,17766)

clan: 5-(24,12,17766)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3097: 5-(24,12,17772)

clan: 5-(24,12,17772)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3098: 5-(24,12,17778)

clan: 5-(24,12,17778)
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23

# 3099: 5-(24,12,17784)

clan: 15-(32,16,6), 2 times reduced t, 4 times derived, 4 times residual
$ PSL(2,23) $ % -group 3 PSL 2 23 PSL_2_23
Tran van Trung construction with complementary design for 5-(23,11,6552) (# 13163)
design 6-(24,12,6552) (# 13219) with respect to smaller t
supplementary design of 6-(24,12,12012) (# 13223) with respect to smaller t
Tran van Trung construction (left) for 5-(23,12,11232) (# 13227) : der= 5-(23,11,6552) and res= 5-(23,12,11232) - the given design is the residual.
residual design of 6-(25,12,9576) (# 13229)
residual design of supplementary of 6-(25,12,17556) (# 13233)
derived from 6-(25,13,17784) (# 13249)
derived from supplementary of 6-(25,13,32604) (# 13250)

created: Fri Oct 23 11:09:54 CEST 2009