#NEXUS [!Munter, R. C. and Clark, J. M., 2006. Theropod dinosaurs from the Early Jurassic of Huizachal Canyon, Mexico. In M. T. Carrano, T. J. Gaudin, R. W. Blob and J. R. Wible (eds.) Amniote Paleobiology: Perspectives on the Evolution of Mammals, Birds, and Reptiles. Chicago University Press, Chicago, p53-75.] BEGIN DATA; DIMENSIONS NTAX=24 NCHAR=159; FORMAT SYMBOLS= " 0 1 2" MISSING=? GAP=- ; MATRIX Eoraptor 000?000000?10000?00000000000000100?000?????0??0?000?00000000?00000?0??00000000000000000000?000000000000000000000000000001000000000?00000000?000000000000000000? Herrerasaurus 0000000000001000?00000000000000010?000000000000?00000000000000000000010000000000001000000000001?1?0000000000000000000000010000000000000000000000000000000000000 Coelophysis 0110100000010000?0000000000000000000000000?00?0?000?00000010000111001100000010110001001001000000000000011000110010011101100100001010001?10000000000011001000001 Syntarsus 01101000000100000000000000000000000000000000000?000?000000100001110011000000101100010010010000000000000110001100100111011001000010100021100000000000110010000?1 Liliensternus 0????0?00??10??????000??00???????00?0?0????0??????0???????10000111?????000001011000100?00000??000000000?10?00100100101010001000010?000001000000000001?00??00??? Dilophosaurus 011010010000000?0000000000000100110(01)0000000000??000000001101001111001100000010010001000000000?000000000?100001001001010(02)0000010000?01100000200010110110010000?? Elaphrosaurus ?????????????????????????????????????????????????????????????0011??????00000?0110002011001??????0001101?????01000101010(02)??000010?0?0(12)11?00121?0???0?1?10??1???0 Ceratosaurus 0001200101000101?0000000000001010001102110010?10000?00?101000011021100100001200110120110011000010000000?1??01100010101?(02)111001?000?011110111101111111?00??10??0 Genusaurus ???????????????????????????????????????????????????????????00?????????????????????0?????????????????????????1??0?1?111??(12)????????(01)?01121?1?11?????????????????? Ilokelesia ?????????????????????01200??????????0????????????????????????0110??????110012100110?????101100?????????????????????????????????????????????????????????????11?? Xenotarsosaurus ?????????????????????????????????????????????????????????????0110?????????????????1??????????????????????????????????????????????0?011200111111111111?????????? Abelisaurus 100?200100?01111?10010121????01????11121?001?????????????1??10110?????????????????????????????????????????????????????????????????????????????????????????????? Carnotaurus 100?200100?01111?11110121110001101011121?001????110?0111010010110211001110112101111211111011?0010111101?????11000101111011?0011000?01121?1?11???????1?????????? Majungatholus 1001200100001111?1111012111000110101?1211001001011000111010010110211001110012101111(12)1111001100010111101??????1000101111???1??????0??11??0111111111111?00??111?? Laevisuchus ?????????????????????????????????????????????????????????????0100??????10101?10???0??????0????????????????????????????????????????????????????????????????????? Masiakasaurus 00???00101110???????????????????????????????????110??111?101001001?????10101?10???0(12)0?1000????0?0??1????????0??????????01111?????0101121011??11111111?10???11?? Noasaurus 00???0010?110???????????????????????0?2??????????????????1?100100??????10111?10???0??????011??????????????????????????????????????????????????????????1???????? Afrovenator 00???20111000????????10000011100110??02?????????????????11?001110101001000000000001?0??00???0?????000102111??0110111010(02)(12)100110101?111100012001?111101011100?10 Eustreptospondylus 0000020111000???1??0?1000011100?????0?200?0?????00?????1?10001110101000000000000001100?00??????10?00011??????01101010100(12)100???101?1111000120?111111??01??00??? Torvosaurus 000?220111000????????1000011100?110?0?2????????????????0?1?0011101010010000020000011001000??00010000011?110?0011010101001100100101?111100012001111110?01??0???0 Allosaurus 000001111000001010000001000001001112001021101111001110011100011101110010000020000011000000101111100001021111000101110102210011010201211000110011111101011100010 Sinraptor 00000111100000101000001100000100111200102110111100111001110001110111001000002000001100000010??1110????????100001011101021100110102?121100011001111110101110001? Ornitholestes 000?0011?0?00000?00000000000?00011?2001????0????00??100?1101?1110??????0000000000001000000??11????00010?111100010111010?2?00100112?12110???200????????01??0???? IGM_6624 ???????????????????????????????????????????????????????????????????????????????????1010?????????????????????110?0???11?????1??????????????????????????????????1 ; END; BEGIN ASSUMPTIONS; OPTIONS DEFTYPE=unord PolyTcount=MINSTEPS ; END; BEGIN TREES; Translate 1 Eoraptor, 2 Herrerasaurus, 3 Coelophysis, 4 Syntarsus, 5 Liliensternus, 6 Dilophosaurus, 7 Elaphrosaurus, 8 Ceratosaurus, 9 Genusaurus, 10 Ilokelesia, 11 Xenotarsosaurus, 12 Abelisaurus, 13 Carnotaurus, 14 Majungatholus, 15 Laevisuchus, 16 Masiakasaurus, 17 Noasaurus, 18 Afrovenator, 19 Eustreptospondylus, 20 Torvosaurus, 21 Allosaurus, 22 Sinraptor, 23 Ornitholestes, 24 IGM_6624 ; tree MPT_1 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,((11,(13,14)),12)),((15,16),17))))),((18,(19,20)),((21,22),23))))))); tree MPT_2 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,((15,16),17)),(10,((11,(13,14)),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_3 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,((11,(13,14)),12))),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_4 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),((11,(13,14)),12)),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_5 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,((11,(13,14)),12)),10),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_6 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,((11,(13,14)),12)),(15,16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_7 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,16,17)),(10,((11,(13,14)),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_8 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,((11,(13,14)),12))),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_9 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),((11,(13,14)),12)),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_10 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,((11,(13,14)),12)),10),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_11 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,((11,(13,14)),12)),(15,(16,17)))))),((18,(19,20)),((21,22),23))))))); tree MPT_12 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,(16,17))),(10,((11,(13,14)),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_13 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,15,(16,17)),(10,((11,(13,14)),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_14 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(16,17)),15),(10,((11,(13,14)),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_15 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,((11,(13,14)),12))),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_16 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),((11,(13,14)),12)),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_17 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,((11,(13,14)),12)),10),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_18 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,((11,12),(13,14))),((15,16),17))))),((18,(19,20)),((21,22),23))))))); tree MPT_19 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,((15,16),17)),(10,((11,12),(13,14)))))),((18,(19,20)),((21,22),23))))))); tree MPT_20 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,((11,12),(13,14)))),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_21 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),((11,12),(13,14))),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_22 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,((11,12),(13,14))),10),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_23 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,((11,12),(13,14))),(15,16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_24 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,16,17)),(10,((11,12),(13,14)))))),((18,(19,20)),((21,22),23))))))); tree MPT_25 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,((11,12),(13,14)))),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_26 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),((11,12),(13,14))),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_27 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,((11,12),(13,14))),10),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_28 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,((11,12),(13,14))),(15,(16,17)))))),((18,(19,20)),((21,22),23))))))); tree MPT_29 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,(16,17))),(10,((11,12),(13,14)))))),((18,(19,20)),((21,22),23))))))); tree MPT_30 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,15,(16,17)),(10,((11,12),(13,14)))))),((18,(19,20)),((21,22),23))))))); tree MPT_31 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(16,17)),15),(10,((11,12),(13,14)))))),((18,(19,20)),((21,22),23))))))); tree MPT_32 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,((11,12),(13,14)))),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_33 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),((11,12),(13,14))),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_34 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,((11,12),(13,14))),10),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_35 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(11,(12,(13,14)))),((15,16),17))))),((18,(19,20)),((21,22),23))))))); tree MPT_36 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,((15,16),17)),(10,(11,(12,(13,14))))))),((18,(19,20)),((21,22),23))))))); tree MPT_37 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(11,(12,(13,14))))),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_38 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(11,(12,(13,14)))),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_39 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(11,(12,(13,14)))),10),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_40 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(11,(12,(13,14)))),(15,16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_41 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,16,17)),(10,(11,(12,(13,14))))))),((18,(19,20)),((21,22),23))))))); tree MPT_42 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(11,(12,(13,14))))),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_43 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(11,(12,(13,14)))),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_44 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(11,(12,(13,14)))),10),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_45 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(11,(12,(13,14)))),(15,(16,17)))))),((18,(19,20)),((21,22),23))))))); tree MPT_46 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,(16,17))),(10,(11,(12,(13,14))))))),((18,(19,20)),((21,22),23))))))); tree MPT_47 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,15,(16,17)),(10,(11,(12,(13,14))))))),((18,(19,20)),((21,22),23))))))); tree MPT_48 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(16,17)),15),(10,(11,(12,(13,14))))))),((18,(19,20)),((21,22),23))))))); tree MPT_49 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(11,(12,(13,14))))),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_50 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(11,(12,(13,14)))),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_51 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(11,(12,(13,14)))),10),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_52 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(((11,13),14),12)),((15,16),17))))),((18,(19,20)),((21,22),23))))))); tree MPT_53 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,((15,16),17)),(10,(((11,13),14),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_54 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(((11,13),14),12))),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_55 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(((11,13),14),12)),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_56 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(((11,13),14),12)),10),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_57 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(((11,13),14),12)),(15,16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_58 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,16,17)),(10,(((11,13),14),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_59 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(((11,13),14),12))),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_60 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(((11,13),14),12)),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_61 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(((11,13),14),12)),10),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_62 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(((11,13),14),12)),(15,(16,17)))))),((18,(19,20)),((21,22),23))))))); tree MPT_63 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,(16,17))),(10,(((11,13),14),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_64 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,15,(16,17)),(10,(((11,13),14),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_65 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(16,17)),15),(10,(((11,13),14),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_66 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(((11,13),14),12))),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_67 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(((11,13),14),12)),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_68 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(((11,13),14),12)),10),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_69 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(((11,14),13),12)),((15,16),17))))),((18,(19,20)),((21,22),23))))))); tree MPT_70 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,((15,16),17)),(10,(((11,14),13),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_71 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(((11,14),13),12))),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_72 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(((11,14),13),12)),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_73 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(((11,14),13),12)),10),((15,16),17)))),((18,(19,20)),((21,22),23))))))); tree MPT_74 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(((11,14),13),12)),(15,16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_75 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,16,17)),(10,(((11,14),13),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_76 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(((11,14),13),12))),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_77 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(((11,14),13),12)),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_78 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(((11,14),13),12)),10),(15,16,17)))),((18,(19,20)),((21,22),23))))))); tree MPT_79 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(9,((10,(((11,14),13),12)),(15,(16,17)))))),((18,(19,20)),((21,22),23))))))); tree MPT_80 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(15,(16,17))),(10,(((11,14),13),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_81 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,15,(16,17)),(10,(((11,14),13),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_82 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(16,17)),15),(10,(((11,14),13),12))))),((18,(19,20)),((21,22),23))))))); tree MPT_83 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,((9,(10,(((11,14),13),12))),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_84 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,10),(((11,14),13),12)),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); tree MPT_85 = [&R] (1,(2,((((3,4),24),5),(6,((7,(8,(((9,(((11,14),13),12)),10),(15,(16,17))))),((18,(19,20)),((21,22),23))))))); END;