#NEXUS [!Lu, J.-C., Ji, Q., Gao, Y. and Li, Z.-X., 2007. A new species of the ankylosaurid dinosaur Crichtonsaurus (Ankylosauridae: Ankylosauria) from the Cretaceous of Liaoning Province, China. Acta Geologica Sinica, 81, 883-897.] BEGIN DATA; DIMENSIONS NTAX=24 NCHAR=63; FORMAT SYMBOLS= " 0 1 2 3 4" MISSING=? GAP=- ; MATRIX Lesothosaurus 000000000000000000000?0000000101000000000000001000010000001?000 Ankylosaurus 11012222101111121001210?110111111101111111111?11?111?1?10????11 Cedarpelta 0?01111?000?0??010????1???000??0?100?000?11?1????1??????0????11 Ed._longiceps 0010101411000001111?100001110??10111?010011111??11??????????111 Ed._rugosidens 00101014110000011111100001110??10111?0100111111111??1???????111 Euoplocephalus 1101222200111112110121111111111111011101111110?12111112101?0101 Gargoyleosaurus 00000221011010100000010000101???0?0??010?1111???11???????????01 Gastonia 0100022101101112100?10100??11010100111?0?11?????21?2?1111???101 Gobisaurus 000101110000011210112011?11011110?011110111??????????????????01 Minmi 0001122??0?0?012?01????????0??1?000001???11??????1???0??0?1???1 Panoplosaurus 0010001411100001111?1?00??010??101101010011111??110300?11?10111 Pawpawsaurus 0010122111100000011000000?01001001100010?11??????????????????11 Pin._grangeri 1001222??0?1111210112111111010111001010111111021211201210111101 Pin._mesphistoce 1011222??01111021?1??111?1?????????1???1?1111??1211??11???1?101 Saichania 10012223001111121011211111101011110111111111?1212112?1210111101 Sauropelta 0010101??100??????1??????????1?0011100?0??1110?0?10300111?1???? Shamosaurus 100121120010001210?12011??0010?1??01?11011111???21?211????1??01 Silvisaurus 011010110100000000110000??0101100?100011?111??1011?????????01?1 Talarurus ?0012222?011?????????????11?10110101??0?111?1?212112?12101111?? Tarchia 100122230011111210112111?110111111011?0111111??0?112?121011??01 Tianzhenosaurus 10012223101110?210????10???0100010011101?11??0?1?11???1?0???101 Tsagantegia 000112110011111210112?11?100110111011111111??????????????????01 Huayangosaurus 0000000010000000000??00000000?100000010000000??00000?010?00?000 Crichtonsaurus 1101122300111?????112?111110111111010011011???00???20021?1??10? ; END; BEGIN ASSUMPTIONS; OPTIONS DEFTYPE=unord PolyTcount=MAXSTEPS ; END; BEGIN TREES; Translate 1 Lesothosaurus, 2 Ankylosaurus, 3 Cedarpelta, 4 Ed._longiceps, 5 Ed._rugosidens, 6 Euoplocephalus, 7 Gargoyleosaurus, 8 Gastonia, 9 Gobisaurus, 10 Minmi, 11 Panoplosaurus, 12 Pawpawsaurus, 13 Pin._grangeri, 14 Pin._mesphistoce, 15 Saichania, 16 Sauropelta, 17 Shamosaurus, 18 Silvisaurus, 19 Talarurus, 20 Tarchia, 21 Tianzhenosaurus, 22 Tsagantegia, 23 Huayangosaurus, 24 Crichtonsaurus ; tree MPT_1 = [&R] (1,(((((((((((2,6),(((13,(14,21)),15),19)),20),24),22),(9,17)),8),10),7),(3,((((4,5),11),(12,16)),18))),23)); tree MPT_2 = [&R] (1,(((((((((((2,6),(((13,(14,21)),19),15)),20),24),22),(9,17)),8),10),7),(3,((((4,5),11),(12,16)),18))),23)); tree MPT_3 = [&R] (1,(((((((((((2,6),((13,(14,21)),(15,19))),20),24),22),(9,17)),8),10),7),(3,((((4,5),11),(12,16)),18))),23)); tree MPT_4 = [&R] (1,(((((((((((2,6),(((13,(14,21)),15),19)),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),16),12),18))),23)); tree MPT_5 = [&R] (1,(((((((((((2,6),(((13,(14,21)),15),19)),20),24),22),(9,17)),8),10),7),(3,((((4,5),11),12),(16,18)))),23)); tree MPT_6 = [&R] (1,(((((((((((2,6),(((13,(14,21)),15),19)),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),12),18),16))),23)); tree MPT_7 = [&R] (1,(((((((((((2,6),(((13,(14,21)),15),19)),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),12),16),18))),23)); tree MPT_8 = [&R] (1,(((((((((((2,6),(((13,(14,21)),19),15)),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),16),12),18))),23)); tree MPT_9 = [&R] (1,(((((((((((2,6),(((13,(14,21)),19),15)),20),24),22),(9,17)),8),10),7),(3,((((4,5),11),12),(16,18)))),23)); tree MPT_10 = [&R] (1,(((((((((((2,6),(((13,(14,21)),19),15)),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),12),18),16))),23)); tree MPT_11 = [&R] (1,(((((((((((2,6),(((13,(14,21)),19),15)),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),12),16),18))),23)); tree MPT_12 = [&R] (1,(((((((((((2,6),((13,(14,21)),(15,19))),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),16),12),18))),23)); tree MPT_13 = [&R] (1,(((((((((((2,6),((13,(14,21)),(15,19))),20),24),22),(9,17)),8),10),7),(3,((((4,5),11),12),(16,18)))),23)); tree MPT_14 = [&R] (1,(((((((((((2,6),((13,(14,21)),(15,19))),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),12),18),16))),23)); tree MPT_15 = [&R] (1,(((((((((((2,6),((13,(14,21)),(15,19))),20),24),22),(9,17)),8),10),7),(3,(((((4,5),11),12),16),18))),23)); END;