#NEXUS [!Mateus, O., Maidment, S. C. R. and Christiansen, N. A., 2009. A new long-necked ‘sauropod-mimic’ stegosaur and the evolution of the plated dinosaurs. Proceedings of the Royal Society of London B, 276, 1815-1821.] BEGIN DATA; DIMENSIONS NTAX=19 NCHAR=89; FORMAT SYMBOLS= " 0 1 2 3 4 5 6 7 8 9 A B C D E F G H J K L M N P Q R S" MISSING=? GAP=- ; MATRIX Lesothosaurus 0A00000??0000000000?0?0000RN??0???????00000P00000R00000?100?01???0000?R00?00E00??00000??? Scutellosaurus ??00100?????0001001000?000PL0?000??017000003003?????001010??010??0000???0??003???10000??0 Emausaurus 0F?R10???????00100??0??0???????0000???????????????0??????????????????????????????10000??? Scelidosaurus ?A0D1100001000010010030001KH0?1001000200000L0H????00001100110110000010H00000?800010100??0 Huayangosaurus 0R0H110110101001001013000??8101???00000011?L1H8?0?1E10110000001000??1?J110114?1??1100?000 D._armatus ???????????????????????11G3D??10111????????0183617?D011100?10?10?00105K111217????110??0?1 Miragaia ??14????????????1?10?R111?????1??????J10???31H?K1E1B011100?10?????0?0??111???????1100?10? Loricatosaurus ??????????????????????00095B111011??1??????51H?600????110????????0110??11021J????11??11?? Kentrosaurus ?????????????101????1?000300101011110E00110F1RB6001D011100900111101109E11021JJ12211001001 Paranthodon ????0???????????11??????????????????????????????????????????????????????????????????????? Chungkingosaurus ????????????????????????0N6R??10?10????????????????9101100700?110????????????????11?0?00? Tuojiangosaurus ????0?0??????11??1?????????????????????????????????P111100500?100????????????????11?????? Gigantspinosaurus ?????????????011?1?????00???1000010?0?00010?1H??0???011100?00?100??????0??21EL???11001000 S._homheni ????????????????????????014J??1???????????????????1B111101R110101????????????????11???1?? S._armatus 001811111110111011101A100R31111111111R101(01)(01)51HED001G111101E11010101105K01021RP12211000111 S._mjosi 0???111111101???1?100F1004BG111111111???1??A1RED001B111101811010101105G11021MR1??110001?0 Gastonia 1?1?1110?0?11???1011?30000QM111001001??1010F0RHR04?8011110?00?100111??????11R????10110??? Sauropelta 1???1100?01110011111130000DB111000001B?1110R08?K071?0?1110?0001000111???0?01BD00110110??0 Euoplocephalus 1?1?1100001110011111130000MJ11101??019?1011F08RD041R111110200010010?0R0010?1??10210110??? ; END; BEGIN ASSUMPTIONS; OPTIONS DEFTYPE=unord PolyTcount=MINSTEPS ; TYPESET * UNTITLED = unord: 1 3 5-21 23-25 29-37 39-43 45 49 51 53-69 72-76 79 82-89, ord: 2 4 22 26-28 38 44 46-48 50 52 70-71 77-78 80-81; WTSET * UNTITLED = 26: 1 3 5-21 23-25 29-37 39-43 45 49 51 53-69 72-76 79-89, 1: 2 4 22 26-28 38 44 46-48 50 52 70-71 77-78; END; BEGIN TREES; Translate 1 Lesothosaurus, 2 Scutellosaurus, 3 Emausaurus, 4 Scelidosaurus, 5 Huayangosaurus, 6 D._armatus, 7 Miragaia, 8 Loricatosaurus, 9 Kentrosaurus, 10 Paranthodon, 11 Chungkingosaurus, 12 Tuojiangosaurus, 13 Gigantspinosaurus, 14 S._homheni, 15 S._armatus, 16 S._mjosi, 17 Gastonia, 18 Sauropelta, 19 Euoplocephalus ; tree MPT_1 = [&R] (1,2,(3,(4,((((5,11),((((6,7),((14,16),15)),8),9)),((10,12),13)),((17,19),18))))); tree MPT_2 = [&R] (1,2,(3,(4,((((5,11),((((6,7),((14,16),15)),8),9)),((10,13),12)),((17,19),18))))); tree MPT_3 = [&R] (1,2,(3,(4,((((5,11),((((6,7),((14,16),15)),8),9)),(10,(12,13))),((17,19),18))))); tree MPT_4 = [&R] (1,2,(3,(4,(((((5,11),(10,12)),((((6,7),((14,16),15)),8),9)),13),((17,19),18))))); tree MPT_5 = [&R] (1,2,(3,(4,((((5,11),(((((6,7),((14,16),15)),8),9),(10,12))),13),((17,19),18))))); tree MPT_6 = [&R] (1,2,(3,(4,((((5,11),(((((6,7),((14,16),15)),(10,12)),8),9)),13),((17,19),18))))); tree MPT_7 = [&R] (1,2,(3,(4,((((5,11),((((6,7),((14,16),15)),((8,12),10)),9)),13),((17,19),18))))); tree MPT_8 = [&R] (1,2,(3,(4,((((5,11),((((6,7),((14,16),15)),((8,10),12)),9)),13),((17,19),18))))); tree MPT_9 = [&R] (1,2,(3,(4,((((5,11),((((6,7),((14,16),15)),(8,(10,12))),9)),13),((17,19),18))))); tree MPT_10 = [&R] (1,2,(3,(4,((((5,11),(((((6,7),((14,16),15)),8),(10,12)),9)),13),((17,19),18))))); tree MPT_11 = [&R] (1,2,(3,(4,((((5,11),((((6,7),((10,12),((14,16),15))),8),9)),13),((17,19),18))))); END;