extension | φ:Q→Out N | d | ρ | Label | ID |
(C2xC3:S3).1D6 = C12:S3:S3 | φ: D6/C1 → D6 ⊆ Out C2xC3:S3 | 72 | 12+ | (C2xC3:S3).1D6 | 432,295 |
(C2xC3:S3).2D6 = C12.84S32 | φ: D6/C1 → D6 ⊆ Out C2xC3:S3 | 72 | 6 | (C2xC3:S3).2D6 | 432,296 |
(C2xC3:S3).3D6 = C62.8D6 | φ: D6/C1 → D6 ⊆ Out C2xC3:S3 | 72 | 12- | (C2xC3:S3).3D6 | 432,318 |
(C2xC3:S3).4D6 = C62.9D6 | φ: D6/C1 → D6 ⊆ Out C2xC3:S3 | 72 | 6 | (C2xC3:S3).4D6 | 432,319 |
(C2xC3:S3).5D6 = C3:S3:Dic6 | φ: D6/C2 → S3 ⊆ Out C2xC3:S3 | 72 | 12- | (C2xC3:S3).5D6 | 432,294 |
(C2xC3:S3).6D6 = C12.91S32 | φ: D6/C2 → S3 ⊆ Out C2xC3:S3 | 72 | 6 | (C2xC3:S3).6D6 | 432,297 |
(C2xC3:S3).7D6 = C12.S32 | φ: D6/C2 → S3 ⊆ Out C2xC3:S3 | 72 | 12- | (C2xC3:S3).7D6 | 432,299 |
(C2xC3:S3).8D6 = C4xC32:D6 | φ: D6/C2 → S3 ⊆ Out C2xC3:S3 | 36 | 6 | (C2xC3:S3).8D6 | 432,300 |
(C2xC3:S3).9D6 = C2xC6.S32 | φ: D6/C2 → S3 ⊆ Out C2xC3:S3 | 72 | | (C2xC3:S3).9D6 | 432,317 |
(C2xC3:S3).10D6 = C3:S3.2D12 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 24 | 4 | (C2xC3:S3).10D6 | 432,579 |
(C2xC3:S3).11D6 = S32:Dic3 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 24 | 4 | (C2xC3:S3).11D6 | 432,580 |
(C2xC3:S3).12D6 = C33:C4:C4 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 48 | 4 | (C2xC3:S3).12D6 | 432,581 |
(C2xC3:S3).13D6 = (C3xC6).8D12 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 24 | 8+ | (C2xC3:S3).13D6 | 432,586 |
(C2xC3:S3).14D6 = (C3xC6).9D12 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).14D6 | 432,587 |
(C2xC3:S3).15D6 = C6.PSU3(F2) | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 48 | 8 | (C2xC3:S3).15D6 | 432,592 |
(C2xC3:S3).16D6 = C6.2PSU3(F2) | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 48 | 8 | (C2xC3:S3).16D6 | 432,593 |
(C2xC3:S3).17D6 = D6.4S32 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).17D6 | 432,608 |
(C2xC3:S3).18D6 = D6.3S32 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 24 | 8+ | (C2xC3:S3).18D6 | 432,609 |
(C2xC3:S3).19D6 = Dic3.S32 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 24 | 8+ | (C2xC3:S3).19D6 | 432,612 |
(C2xC3:S3).20D6 = C62.96D6 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 24 | 4 | (C2xC3:S3).20D6 | 432,693 |
(C2xC3:S3).21D6 = C2xC33:D4 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 24 | 4 | (C2xC3:S3).21D6 | 432,755 |
(C2xC3:S3).22D6 = C2xC32:2D12 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 24 | 8+ | (C2xC3:S3).22D6 | 432,756 |
(C2xC3:S3).23D6 = C2xC33:Q8 | φ: D6/C3 → C22 ⊆ Out C2xC3:S3 | 48 | 8 | (C2xC3:S3).23D6 | 432,758 |
(C2xC3:S3).24D6 = Dic3xC32:C4 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).24D6 | 432,567 |
(C2xC3:S3).25D6 = D6:(C32:C4) | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 24 | 8+ | (C2xC3:S3).25D6 | 432,568 |
(C2xC3:S3).26D6 = C33:(C4:C4) | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).26D6 | 432,569 |
(C2xC3:S3).27D6 = S32xDic3 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).27D6 | 432,594 |
(C2xC3:S3).28D6 = S3xC6.D6 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 24 | 8+ | (C2xC3:S3).28D6 | 432,595 |
(C2xC3:S3).29D6 = Dic3:6S32 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).29D6 | 432,596 |
(C2xC3:S3).30D6 = D6:4S32 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 24 | 8+ | (C2xC3:S3).30D6 | 432,599 |
(C2xC3:S3).31D6 = C33:5(C2xQ8) | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).31D6 | 432,604 |
(C2xC3:S3).32D6 = D6.S32 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).32D6 | 432,607 |
(C2xC3:S3).33D6 = D6.6S32 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 48 | 8- | (C2xC3:S3).33D6 | 432,611 |
(C2xC3:S3).34D6 = C12.39S32 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 72 | | (C2xC3:S3).34D6 | 432,664 |
(C2xC3:S3).35D6 = C12.57S32 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 144 | | (C2xC3:S3).35D6 | 432,668 |
(C2xC3:S3).36D6 = C62.91D6 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 72 | | (C2xC3:S3).36D6 | 432,676 |
(C2xC3:S3).37D6 = C62.93D6 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 72 | | (C2xC3:S3).37D6 | 432,678 |
(C2xC3:S3).38D6 = C2xS3xC32:C4 | φ: D6/S3 → C2 ⊆ Out C2xC3:S3 | 24 | 8+ | (C2xC3:S3).38D6 | 432,753 |
(C2xC3:S3).39D6 = C4xC33:C4 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 48 | 4 | (C2xC3:S3).39D6 | 432,637 |
(C2xC3:S3).40D6 = C33:9(C4:C4) | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 48 | 4 | (C2xC3:S3).40D6 | 432,638 |
(C2xC3:S3).41D6 = C62:11Dic3 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 24 | 4 | (C2xC3:S3).41D6 | 432,641 |
(C2xC3:S3).42D6 = (C3xD12):S3 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 144 | | (C2xC3:S3).42D6 | 432,661 |
(C2xC3:S3).43D6 = C12.40S32 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 72 | | (C2xC3:S3).43D6 | 432,665 |
(C2xC3:S3).44D6 = C12.73S32 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 72 | | (C2xC3:S3).44D6 | 432,667 |
(C2xC3:S3).45D6 = C3:S3:4Dic6 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 48 | 4 | (C2xC3:S3).45D6 | 432,687 |
(C2xC3:S3).46D6 = C12:S3:12S3 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 48 | 4 | (C2xC3:S3).46D6 | 432,688 |
(C2xC3:S3).47D6 = C12.95S32 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 48 | 4 | (C2xC3:S3).47D6 | 432,689 |
(C2xC3:S3).48D6 = C4xC32:4D6 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 48 | 4 | (C2xC3:S3).48D6 | 432,690 |
(C2xC3:S3).49D6 = C2xC33:9(C2xC4) | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 48 | | (C2xC3:S3).49D6 | 432,692 |
(C2xC3:S3).50D6 = C22xC33:C4 | φ: D6/C6 → C2 ⊆ Out C2xC3:S3 | 48 | | (C2xC3:S3).50D6 | 432,766 |
(C2xC3:S3).51D6 = C3:S3xDic6 | φ: trivial image | 144 | | (C2xC3:S3).51D6 | 432,663 |
(C2xC3:S3).52D6 = C4xS3xC3:S3 | φ: trivial image | 72 | | (C2xC3:S3).52D6 | 432,670 |
(C2xC3:S3).53D6 = C3:S3xD12 | φ: trivial image | 72 | | (C2xC3:S3).53D6 | 432,672 |
(C2xC3:S3).54D6 = C2xDic3xC3:S3 | φ: trivial image | 144 | | (C2xC3:S3).54D6 | 432,677 |