#NEXUS [!Kutty, T. S., Chatterjee, S., Galton, P. M. and Upchurch, P., 2007. Basal sauropodomorphs (Dinosauria: Saurischia) from the Lower Jurassic of India: their anatomy and relationships. Journal of Paleontology, 81, 1218-1240.] BEGIN DATA; DIMENSIONS NTAX=24 NCHAR=212; FORMAT SYMBOLS= " 0 1 2 3 4 5" MISSING=? GAP=- ; MATRIX Herrerasaurus 0000000000000000?0000000010000000000000?00000000000000000000000000000000000000000000000000000000000000000000000?1001??00000000010000000001000000000000000000000???100000000?00000000010100000000000000001000000?1002 Neotheropoda 00{01}0020000{01}000000010000{01}1000000{01}0001{01}0100000000000000000000000000000000000000000101000000100000000001{12}000000010000{01}00000000000000010000000?0000{12}000110010110001000000010001000000000000000100000000100?0000000000002 Lamplusaura 110?0?1001?1???10101??0???0000?????0011?00000?010011101111111000110111101?00000011000000{01}0?00000100????0000?01?0?010??0031100010000000010100011101???????0?100?01?0000101010001?0101011111100110100010011?210000??03 Pradhania ???????0??0?0???1??????????????????????????????????????10?1???00110110001??00?1101???0?????????????????????????????????????????????????101???1??0??????????????????????????????????????????????????????????????????0 ISIR260specimen ??????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????0001?1?10????????????????????????????3 Saturnalia 10??????????000?????00????????1?????00????00?0000?????00010???00010010000??00??0?1???00010100000001000011???????10111000100100000?????????????????0?0?00?0110021101010000000100000000101000000000000000010?00?000000 Thecondontosaurus 10??0??00???{01}{01}0?1000000?100?00?????0{01}0100000100010?100{01}011000000110110000{01}?000001110000010100000000?00111100000?00001000?001000?011000010100010100001100000100111?{01}0{01}0??000??0000101010?0000000010??0011111000?00001 Efraasia 1010?1?00?11???0??00000?10??0?1?????000???00101010?1101010011?00110110000?10001011?1000010?00000001001111000101?00101010200100000111?001110011010100110001110011101000000000000001010101001000001?1000??111100001002 Riojasaurus 10?00?1001111101?00?001010?1001000000????1101?100?100000?01101001101100000100?0011?100101010000000110110000010??0010101021110000011111?1111011021?001100011110201010001000001001011101111010000010??0011121100??0003 Plateosaurus 10101110001111011110001011000010100001010110101101101011100111001101100001100010110{01}00201010000000111011000011100010101010010000011111111110120101001100010110200010010000000000010101011010000010100010111100001004 Coloradisaurus ?01012100?1111011????001110?0010100?01??0110111101101011100111001101100001000?11010000?01010000000110110010?????000110101101??????????????????????00110001?110?1111001101001?00001110111101???00100?00111221001010?2 Massospondylus 1010121001101100?1101010110100100100????0010110001101011100101101101100011?0001001010020101000000011011{01}0000011?000{01}101010010000011111112110121201001100010100011010011010011000011101011010000010100011122100101002 Lufengosaurus 10?01??0?111110??0001010110110101000??1101200?0100?01?1????110?0?1011000???0001001???0?01010000000?0011000?01110001110101101000001111111211012121100110001010021101000101001100001110101101000001?100011122100101002 Anchisaurus 10?0???0011111?01???11101112101?????1?0???2101020011101?000100?1010111?0110??0?001010??0101000??00??010?????????100{01}??00201000?00???1?2111101202010{01}1100110100?11?0110100010100001110{01}11111?0000??0100???11100000001 Melanorosaurus ???????????????????????????????????????????????????????????????????????????00??011???00100100000001?1100000?10??0100??10201010?0????????21????????0011000101001???1000100001?101011100111110??0010??00111???0??????3 Blikanasaurus ??????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????1?00011101111112111000?00? Antetonitrus ???????????????????????????????????????????????????????????????????????????00??01????00100110100101????0100010??0100??00301010100???1?2121??11????????????????????????100000?0110111111111100???????1111???200???003 Kotasaurus ?????????????????????????????????????????????????????????????????1??1111??0?0?00001??10101100210?1??11?00?101???0000??00?0101?11??????????????????01110011010101?1?0??1????1?2101111001111110?1111??11????21?01???15 Isanosaurus ???????????????????????????????????????????????????????????????????????????0????0????1?101?000??11?????????????1101??????????????????????????????????????????????????????????2101211001?1??????????????????????????3 Vulcanodon ????????????????????????????????????????????????????????????????????????????????1???????????????????1????010?01??101??01301011111????????????????????????10101?1111010100011?11011111112??110111110111101222011?1105 Barapasaurus ?????????????????????????????????????????????????????????????????1?11111????0?10?0???1010101121121??11000?1??0??010101?1????111?1?????????????????1111110101010??11010110111?210121111?????11?????????????????????15 Shunosaurus 1101021111000002?001110001020001011111??1221??020001010000110011111111111?1?11000001110?0111021?21?011?0001110?1?01?01013011?11011000?211?011013111111110101010111101011?1111210121100021?1?110?11012110022201111105 Omeisaurus 11010211111000120001110101?21101011111??1??1?00?00011100001??011011111111?011211000111010201122121??1200001110111011010130101?101???0?2001011?????1111110101010111?0??1101111210121110021??11?0011??2110022211111115 Neosauropoda 11010211{01}1{01}010120001110{01}011211010111110112210002{01}001110000110011011111{01}11{01}0101101001110102011221211012000010101010010101{23}01{01}11111110002000011013111111110101010111{01}1101101111210121110121111111111012100022211111115 ; END; BEGIN ASSUMPTIONS; OPTIONS DEFTYPE=unord PolyTcount=MINSTEPS ; END; BEGIN TREES; Translate 1 Herrerasaurus, 2 Neotheropoda, 3 Lamplusaura, 4 Pradhania, 5 ISIR260specimen, 6 Saturnalia, 7 Thecondontosaurus, 8 Efraasia, 9 Riojasaurus, 10 Plateosaurus, 11 Coloradisaurus, 12 Massospondylus, 13 Lufengosaurus, 14 Anchisaurus, 15 Melanorosaurus, 16 Blikanasaurus, 17 Antetonitrus, 18 Kotasaurus, 19 Isanosaurus, 20 Vulcanodon, 21 Barapasaurus, 22 Shunosaurus, 23 Omeisaurus, 24 Neosauropoda ; tree MPT_1 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),5),6))); tree MPT_2 = [&R] (1,(2,((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),(5,7)),6))); tree MPT_3 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),5),7),6))); tree MPT_4 = [&R] (1,(2,(((((3,4),5),((8,(9,(10,(11,(12,13))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_5 = [&R] (1,(2,((((3,(4,5)),((8,(9,(10,(11,(12,13))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_6 = [&R] (1,(2,(((((3,5),4),((8,(9,(10,(11,(12,13))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_7 = [&R] (1,(2,((((3,4),(5,((8,(9,(10,(11,(12,13))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19)))))))),7),6))); tree MPT_8 = [&R] (1,(2,((((3,4),((5,(8,(9,(10,(11,(12,13)))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_9 = [&R] (1,(2,((((3,4),(((5,8),(9,(10,(11,(12,13))))),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_10 = [&R] (1,(2,((((3,4),(((5,(9,(10,(11,(12,13))))),8),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_11 = [&R] (1,(2,((((3,4),((((5,9),(10,(11,(12,13)))),8),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_12 = [&R] (1,(2,((((3,4),((((5,(10,(11,(12,13)))),9),8),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_13 = [&R] (1,(2,((((3,4),(((((5,(11,(12,13))),10),9),8),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_14 = [&R] (1,(2,((((3,4),(((((5,10),(11,(12,13))),9),8),(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_15 = [&R] (1,(2,((((3,4),((5,(14,(15,(16,(17,((18,(20,((21,(23,24)),22))),19)))))),(8,(9,(10,(11,(12,13))))))),7),6))); tree MPT_16 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),5),6))); tree MPT_17 = [&R] (1,(2,((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),(5,7)),6))); tree MPT_18 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),5),7),6))); tree MPT_19 = [&R] (1,(2,(((((3,4),5),((8,(9,(10,(11,(12,13))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_20 = [&R] (1,(2,((((3,(4,5)),((8,(9,(10,(11,(12,13))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_21 = [&R] (1,(2,(((((3,5),4),((8,(9,(10,(11,(12,13))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_22 = [&R] (1,(2,((((3,4),(5,((8,(9,(10,(11,(12,13))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19))))))),7),6))); tree MPT_23 = [&R] (1,(2,((((3,4),((5,(8,(9,(10,(11,(12,13)))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_24 = [&R] (1,(2,((((3,4),(((5,8),(9,(10,(11,(12,13))))),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_25 = [&R] (1,(2,((((3,4),(((5,(9,(10,(11,(12,13))))),8),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_26 = [&R] (1,(2,((((3,4),((((5,9),(10,(11,(12,13)))),8),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_27 = [&R] (1,(2,((((3,4),((((5,(10,(11,(12,13)))),9),8),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_28 = [&R] (1,(2,((((3,4),(((((5,(11,(12,13))),10),9),8),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_29 = [&R] (1,(2,((((3,4),(((((5,10),(11,(12,13))),9),8),(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19)))))),7),6))); tree MPT_30 = [&R] (1,(2,((((3,4),((5,(14,(15,((16,17),((18,(20,((21,(23,24)),22))),19))))),(8,(9,(10,(11,(12,13))))))),7),6))); tree MPT_31 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),5),6))); tree MPT_32 = [&R] (1,(2,((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),(5,7)),6))); tree MPT_33 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),5),7),6))); tree MPT_34 = [&R] (1,(2,(((((3,4),5),((8,(9,(10,(11,(12,13))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_35 = [&R] (1,(2,((((3,(4,5)),((8,(9,(10,(11,(12,13))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_36 = [&R] (1,(2,(((((3,5),4),((8,(9,(10,(11,(12,13))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_37 = [&R] (1,(2,((((3,4),(5,((8,(9,(10,(11,(12,13))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17)))))),7),6))); tree MPT_38 = [&R] (1,(2,((((3,4),((5,(8,(9,(10,(11,(12,13)))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_39 = [&R] (1,(2,((((3,4),(((5,8),(9,(10,(11,(12,13))))),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_40 = [&R] (1,(2,((((3,4),(((5,(9,(10,(11,(12,13))))),8),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_41 = [&R] (1,(2,((((3,4),((((5,9),(10,(11,(12,13)))),8),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_42 = [&R] (1,(2,((((3,4),((((5,(10,(11,(12,13)))),9),8),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_43 = [&R] (1,(2,((((3,4),(((((5,(11,(12,13))),10),9),8),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_44 = [&R] (1,(2,((((3,4),(((((5,10),(11,(12,13))),9),8),(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17))))),7),6))); tree MPT_45 = [&R] (1,(2,((((3,4),((5,(14,(15,((16,((18,(20,((21,(23,24)),22))),19)),17)))),(8,(9,(10,(11,(12,13))))))),7),6))); tree MPT_46 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),5),6))); tree MPT_47 = [&R] (1,(2,((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),(5,7)),6))); tree MPT_48 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),5),7),6))); tree MPT_49 = [&R] (1,(2,(((((3,4),5),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_50 = [&R] (1,(2,((((3,(4,5)),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_51 = [&R] (1,(2,(((((3,5),4),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_52 = [&R] (1,(2,((((3,4),(5,((8,(9,(10,(11,(12,13))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17)))))),7),6))); tree MPT_53 = [&R] (1,(2,((((3,4),((5,(8,(9,(10,(11,(12,13)))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_54 = [&R] (1,(2,((((3,4),(((5,8),(9,(10,(11,(12,13))))),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_55 = [&R] (1,(2,((((3,4),(((5,(9,(10,(11,(12,13))))),8),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_56 = [&R] (1,(2,((((3,4),((((5,9),(10,(11,(12,13)))),8),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_57 = [&R] (1,(2,((((3,4),((((5,(10,(11,(12,13)))),9),8),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_58 = [&R] (1,(2,((((3,4),(((((5,(11,(12,13))),10),9),8),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_59 = [&R] (1,(2,((((3,4),(((((5,10),(11,(12,13))),9),8),(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17))))),7),6))); tree MPT_60 = [&R] (1,(2,((((3,4),((5,(14,(15,(((16,19),(18,(20,((21,(23,24)),22)))),17)))),(8,(9,(10,(11,(12,13))))))),7),6))); tree MPT_61 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),5),6))); tree MPT_62 = [&R] (1,(2,((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),(5,7)),6))); tree MPT_63 = [&R] (1,(2,(((((3,4),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),5),7),6))); tree MPT_64 = [&R] (1,(2,(((((3,4),5),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_65 = [&R] (1,(2,((((3,(4,5)),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_66 = [&R] (1,(2,(((((3,5),4),((8,(9,(10,(11,(12,13))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_67 = [&R] (1,(2,((((3,4),(5,((8,(9,(10,(11,(12,13))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17)))))),7),6))); tree MPT_68 = [&R] (1,(2,((((3,4),((5,(8,(9,(10,(11,(12,13)))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_69 = [&R] (1,(2,((((3,4),(((5,8),(9,(10,(11,(12,13))))),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_70 = [&R] (1,(2,((((3,4),(((5,(9,(10,(11,(12,13))))),8),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_71 = [&R] (1,(2,((((3,4),((((5,9),(10,(11,(12,13)))),8),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_72 = [&R] (1,(2,((((3,4),((((5,(10,(11,(12,13)))),9),8),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_73 = [&R] (1,(2,((((3,4),(((((5,(11,(12,13))),10),9),8),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_74 = [&R] (1,(2,((((3,4),(((((5,10),(11,(12,13))),9),8),(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17))))),7),6))); tree MPT_75 = [&R] (1,(2,((((3,4),((5,(14,(15,(((16,(18,(20,((21,(23,24)),22)))),19),17)))),(8,(9,(10,(11,(12,13))))))),7),6))); END;