#NEXUS [!Riga, B. J. G., Previtera, E. and Pirrone, C. A., 2009. Malarguesaurus florenciae gen. et sp. nov., a new titanosauriform (Dinosauria, Sauropoda) from the Upper Cretaceous of Mendoza, Argentina. Cretaceous Research, 30, 135-148.] BEGIN DATA; DIMENSIONS NTAX=23 NCHAR=102; FORMAT SYMBOLS= " 0 1 2 3" MISSING=? GAP=9 ; MATRIX Camarasaurus 000010000000000000000000000000000000000000000000000000000001001100000000000000000000000000000000000000 Brachiosaurus 000000000110000111110001000100?00101000201000000??0000001101001100000000100010001200000001011100?0??00 Euhelopus 111?0?????????????11001200?10?1??101?0032001?001?????????????????????????1001????2??0?00?100?101?0??00 Chubutisaurus ?????????????????????01????????????????3?1??000???000?001????????0????????00?????2???0??????11?1?????? Phuwiangosaurus ?????????????????????0??0100001010?00???0011?010???00000100010?000?000?0110010?0?110001???00010??????? Ligabuesaurus ??????????????????11001?0001010010?1101111?1101??????????????????????????1?010??????00??????11000????? Malarguesaurus ?????????????????????????????????????????????????1?1110010001000000001?0?????????????????????10??????? Andesaurus ?????????????????????01???????0????1?002?111101??1020000110010???00000001?0?1????????1110???01???????? Malawisaurus 001????1??1???00??21001?110?00000??1?01311?1111????3000010001011101100001???101?1?110??10??????1????10 Mendozasaurus ?????????????????????01?110?02?122?10??320???11??1?321001100101110110000110110110211?1??????01111?1?10 Futalognkosaurus ?????????????????????0121101020122210?03211??111?113??0?1??1?01110?1???0?????0????????112111??9??????? Epachthosaurus ?????????????????????01???????0????111132?1110111113320011001111?01?000011010011101??11??11101?1111000 Rapetosaurus 11?1111110111111?1212112010100000?1111132001111111?332001101001100?00001110110100010??110111011?10??10 Lirainosaurus ???????????????0??21?01???????0????1?103?111111??113320011010011100100????010?????101???????011?????10 Rinconsaurus ??????????????????21101?0101000011?1111321111111?1?3320011010011001?11?01101101???1011111111011??????? Muyellensaurus ?????11?10?11111??21101?110?000011?1111321111111?1?3320011020011001011?0110110111210?11111110111?????? Gondwanatitan ?????????????????????01???????0????111?3?1111111?11332?1220?00???02?10?0??0?1??????????0111????1?????? Aeolosaurus ??????????????????2120?????????????1???3??1??????133320122010010002010?01?0100?11210?1101????1?1?????? Opisthocoelicaudia ?????????????????????01???????0???101103010101111120000011020011000100101111111102101111111101111111?? Alamosaurus ??????????????????2?201?0101000001?1?113??100111?133320011020011000100101101111000111111211101?1?????? Neuquensaurus ?????????????????????11?0111000012?1110321111111?133321011120011100100?011110111111011?12111?111?1??11 Saltasaurus ?????1??00101011??21211?0011100012?1110321111111?113321011120011110000?0111201101110111121110111????11 Rocasaurus ?????????????????????11???????001??111?32111111??1?33210111?00?1?10?00?0??????????????112111?1??????11 ; END; BEGIN ASSUMPTIONS; OPTIONS DEFTYPE=unord PolyTcount=MINSTEPS ; END; BEGIN TREES; Translate 1 Camarasaurus, 2 Brachiosaurus, 3 Euhelopus, 4 Chubutisaurus, 5 Phuwiangosaurus, 6 Ligabuesaurus, 7 Malarguesaurus, 8 Andesaurus, 9 Malawisaurus, 10 Mendozasaurus, 11 Futalognkosaurus, 12 Epachthosaurus, 13 Rapetosaurus, 14 Lirainosaurus, 15 Rinconsaurus, 16 Muyellensaurus, 17 Gondwanatitan, 18 Aeolosaurus, 19 Opisthocoelicaudia, 20 Alamosaurus, 21 Neuquensaurus, 22 Saltasaurus, 23 Rocasaurus ; tree MPT_1 = [&R] (1,(2,(3,(4,(((5,7),(8,((9,(10,11)),(12,((((13,(19,20)),((15,16),(17,18))),(21,(22,23))),14))))),6))))); tree MPT_2 = [&R] (1,(2,((3,(((5,7),(8,((9,(10,11)),(12,((((13,(19,20)),((15,16),(17,18))),(21,(22,23))),14))))),6)),4))); tree MPT_3 = [&R] (1,(2,((3,4),(((5,7),(8,((9,(10,11)),(12,((((13,(19,20)),((15,16),(17,18))),(21,(22,23))),14))))),6)))); tree MPT_4 = [&R] (1,(2,((3,(((5,7),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),6)),4))); tree MPT_5 = [&R] (1,(2,((3,(((5,7),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14)))),6)),4))); tree MPT_6 = [&R] (1,(2,((3,(((5,7),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18))))))),6)),4))); tree MPT_7 = [&R] (1,(2,((3,(((5,7),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))),6)),4))); tree MPT_8 = [&R] (1,(2,((3,(((5,7),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20)))))),6)),4))); tree MPT_9 = [&R] (1,(2,((3,(((5,7),6),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))),4))); tree MPT_10 = [&R] (1,(2,((3,((5,(6,7)),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))),4))); tree MPT_11 = [&R] (1,(2,((3,(((5,6),7),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))),4))); tree MPT_12 = [&R] (1,(2,(3,(4,(((5,7),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),6))))); tree MPT_13 = [&R] (1,(2,(3,(4,(((5,7),6),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_14 = [&R] (1,(2,((3,4),(((5,7),6),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))))); tree MPT_15 = [&R] (1,(2,((3,4),(((5,7),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),6)))); tree MPT_16 = [&R] (1,(2,((3,(((5,7),6),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14))))),4))); tree MPT_17 = [&R] (1,(2,((3,((5,(6,7)),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14))))),4))); tree MPT_18 = [&R] (1,(2,((3,(((5,6),7),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14))))),4))); tree MPT_19 = [&R] (1,(2,(3,(4,(((5,7),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14)))),6))))); tree MPT_20 = [&R] (1,(2,(3,(4,(((5,7),6),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14)))))))); tree MPT_21 = [&R] (1,(2,((3,4),(((5,7),6),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14))))))); tree MPT_22 = [&R] (1,(2,((3,4),(((5,7),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14)))),6)))); tree MPT_23 = [&R] (1,(2,((3,(((5,7),6),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))))),4))); tree MPT_24 = [&R] (1,(2,((3,((5,(6,7)),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))))),4))); tree MPT_25 = [&R] (1,(2,((3,(((5,6),7),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))))),4))); tree MPT_26 = [&R] (1,(2,(3,(4,(((5,7),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18))))))),6))))); tree MPT_27 = [&R] (1,(2,(3,(4,(((5,7),6),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18))))))))))); tree MPT_28 = [&R] (1,(2,((3,4),(((5,7),6),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))))))); tree MPT_29 = [&R] (1,(2,((3,((((5,7),6),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8)),4))); tree MPT_30 = [&R] (1,(2,(3,(4,((((5,7),6),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8))))); tree MPT_31 = [&R] (1,(2,((3,4),((((5,7),6),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8)))); tree MPT_32 = [&R] (1,(2,((3,4),(((5,7),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18))))))),6)))); tree MPT_33 = [&R] (1,(2,((3,(((5,7),6),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))),4))); tree MPT_34 = [&R] (1,(2,((3,((5,(6,7)),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))),4))); tree MPT_35 = [&R] (1,(2,((3,(((5,6),7),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))),4))); tree MPT_36 = [&R] (1,(2,(3,(4,(((5,7),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))),6))))); tree MPT_37 = [&R] (1,(2,(3,(4,(((5,7),6),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))))))); tree MPT_38 = [&R] (1,(2,((3,4),(((5,7),6),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_39 = [&R] (1,(2,((3,((((5,7),6),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8)),4))); tree MPT_40 = [&R] (1,(2,(3,(4,((((5,7),6),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8))))); tree MPT_41 = [&R] (1,(2,((3,4),((((5,7),6),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8)))); tree MPT_42 = [&R] (1,(2,((3,4),(((5,7),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))),6)))); tree MPT_43 = [&R] (1,(2,((3,(((5,7),6),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20))))))),4))); tree MPT_44 = [&R] (1,(2,((3,((5,(6,7)),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20))))))),4))); tree MPT_45 = [&R] (1,(2,((3,(((5,6),7),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20))))))),4))); tree MPT_46 = [&R] (1,(2,(3,(4,(((5,7),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20)))))),6))))); tree MPT_47 = [&R] (1,(2,(3,(4,(((5,7),6),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_48 = [&R] (1,(2,((3,4),(((5,7),6),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20))))))))); tree MPT_49 = [&R] (1,(2,((3,4),(((5,7),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20)))))),6)))); tree MPT_50 = [&R] (1,(2,(3,(4,((5,(6,7)),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_51 = [&R] (1,(2,((3,4),((5,(6,7)),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))))); tree MPT_52 = [&R] (1,(2,(3,(4,(((5,6),7),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_53 = [&R] (1,(2,((3,4),(((5,6),7),(8,((9,(10,11)),(((12,13),((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))))); tree MPT_54 = [&R] (1,(2,(3,(4,((5,(6,7)),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14)))))))); tree MPT_55 = [&R] (1,(2,((3,4),((5,(6,7)),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14))))))); tree MPT_56 = [&R] (1,(2,(3,(4,(((5,6),7),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14)))))))); tree MPT_57 = [&R] (1,(2,((3,4),(((5,6),7),(8,((9,(10,11)),((((12,13),((15,16),(17,18))),((19,20),(21,(22,23)))),14))))))); tree MPT_58 = [&R] (1,(2,((3,((((5,6),7),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8)),4))); tree MPT_59 = [&R] (1,(2,((3,(((5,(6,7)),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8)),4))); tree MPT_60 = [&R] (1,(2,(3,(4,((5,(6,7)),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18))))))))))); tree MPT_61 = [&R] (1,(2,(3,(4,(((5,(6,7)),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8))))); tree MPT_62 = [&R] (1,(2,((3,4),(((5,(6,7)),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8)))); tree MPT_63 = [&R] (1,(2,((3,4),((5,(6,7)),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))))))); tree MPT_64 = [&R] (1,(2,(3,(4,(((5,6),7),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18))))))))))); tree MPT_65 = [&R] (1,(2,(3,(4,((((5,6),7),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8))))); tree MPT_66 = [&R] (1,(2,((3,4),((((5,6),7),((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))),8)))); tree MPT_67 = [&R] (1,(2,((3,4),(((5,6),7),(8,((9,(10,11)),((12,((14,(21,(22,23))),(19,20))),(13,((15,16),(17,18)))))))))); tree MPT_68 = [&R] (1,(2,((3,((((5,6),7),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8)),4))); tree MPT_69 = [&R] (1,(2,((3,(((5,(6,7)),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8)),4))); tree MPT_70 = [&R] (1,(2,(3,(4,((5,(6,7)),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))))))); tree MPT_71 = [&R] (1,(2,(3,(4,(((5,(6,7)),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8))))); tree MPT_72 = [&R] (1,(2,((3,4),(((5,(6,7)),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8)))); tree MPT_73 = [&R] (1,(2,((3,4),((5,(6,7)),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_74 = [&R] (1,(2,(3,(4,(((5,6),7),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20))))))))))); tree MPT_75 = [&R] (1,(2,(3,(4,((((5,6),7),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8))))); tree MPT_76 = [&R] (1,(2,((3,4),((((5,6),7),((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))),8)))); tree MPT_77 = [&R] (1,(2,((3,4),(((5,6),7),(8,((9,(10,11)),(12,((13,((15,16),(17,18))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_78 = [&R] (1,(2,(3,(4,((5,(6,7)),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_79 = [&R] (1,(2,((3,4),((5,(6,7)),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20))))))))); tree MPT_80 = [&R] (1,(2,(3,(4,(((5,6),7),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20)))))))))); tree MPT_81 = [&R] (1,(2,((3,4),(((5,6),7),(8,((9,(10,11)),((12,(13,((15,16),(17,18)))),((14,(21,(22,23))),(19,20))))))))); tree MPT_82 = [&R] (1,(2,((3,(((5,7),(8,((9,(10,11)),(((((12,((15,16),(17,18))),13),20),(14,(21,(22,23)))),19)))),6)),4))); tree MPT_83 = [&R] (1,(2,(3,(4,(((5,7),(8,((9,(10,11)),(((((12,((15,16),(17,18))),13),20),(14,(21,(22,23)))),19)))),6))))); tree MPT_84 = [&R] (1,(2,((3,4),(((5,7),(8,((9,(10,11)),(((((12,((15,16),(17,18))),13),20),(14,(21,(22,23)))),19)))),6)))); END;