#NEXUS

[!Prieto-Marquez, A., Gaete, R., Rivas, G., Galobart, A. and Boada, M., 2006. Hadrosauroid dinosaurs from the Late Cretaceous of Spain: Pararhabdodon isonensis revisited and Koutalisaurus kohlerorum, gen. et sp. nov. Journal of Vertebrate Paleontology 26(4): 929-943.]

BEGIN DATA;
	DIMENSIONS  NTAX=24 NCHAR=127;
	FORMAT SYMBOLS= " 0 1 2 3 4 5 6" MISSING=? GAP=- ;
MATRIX

I._bernissartensis      0000000000000000000100000000000010000000000000000000?1?0?????000?0?0?0000000000000000000000000000000000000000200000000000000000
I._atherfieldensis      0000000000000000000100000000000010000000000000000000?1?0?????000?0?0?0000000000000000000000000000000000000001000200000000000020
O._nigeriensis          110211012010?000110200200000000000001000000112000001?1?0?????000?0?0?00???00000000001000101000100010000000000100000020000124100
P._gobiensis            11000?1120101000?0??0000?000?00000?00100000100000001?1?0?????000?0?0?00???00??0?000????0?00100000010000010??110?200000000124000
B._johnsoni             100101111001101100020100100000000010?0121???????????10????????200?100?1????0???1?01011?00000?0001410011010?11111111020000120000
G._mongoliensis         ?1000121200111110002010010000000??001012100000000???100?0????0????????????000001001011100000?00?14??001010?11111?1002000112?000
P._byrdi                ?1000101311???0000120000100000?010?0?0101??????0000?100?0?????200?0?0?0??????????????????000????????00000?????????????????????0
T._transsylvanicus      ?????211201??2110001011020010??0?????01210000?00000?100?0????0100?0???1???000001?01011100000?00111??0100?0?11111????1?????????0
B._canadensis           111212223021221100001112111112100100101110111001101311100????131111111110000000110101110000011011211010101111211211111111001131
M._peeblesorum          111212223021221100011112111112100100101110111000100311120????131111111110000000110101110000011011210010100111211211111111001131
Gryposaurus_spp.        111102222021221100101111211213201000101110121000202311100????022101010101100002100101111100011211110010110111111111211221002130
Prosaurolophus_spp.     111112223031221100101120211211101000111210121001212212110????112101011101100000100101110000011211110010110111111111211221003130
Saurolophus_spp.        1111122230312211001011?0211211100111111210221102212212110????11210101010??0000010?10111000001121111?0101?0111111111211221003100
Edmontosaurus_spp.      1111122240412211000011202112143010001112101210002011130?0????133121210100000102100101111100011211110011110121111111111221011120
Lambeosaurus_spp.       11121222202121111100112011231531001111000120121322340?0?100100140?0?0?1?111121110111111001111101131?1211?2121111111111111124110
H._altispinus           11121222202121111100112021241631000012111120131323140?0?110110140?0?0?10111101110111111001111111131?121112111111111121221124110
H._stebingeri           11110222212121111100111021241631000010000120131322340?0?110110140?0?0?1???100111011111100111111?13111211?21?1?1??11121221124110
C._casuarius            11121222202121111100111021231531001112000120121322340?0?111110140?0?0?1?1111211101111110011111021311121112121111111011221124110
Parasaurolophus_spp.    111212222021211111011120?1231531001012100120131423140?0?1??0?0140?0?0?1???1021110111111001111101131?121112111111011021221124010
A._riabinini            1????2222121211111001110112315?100111202112012132??40?0?1????0????????????110011021111100111?10?1311??111211111??11?2???10241?0
O._arharensis           1112122220212111110111201123163100???2110120131?23140?0?100110140?0?0??001??????????????????110213101211121???1??11020221???000
T._sinensis             ??????????????????????????0203????000010100202000???????0????0??????????11000001?21011101000?01?1000011010???????10011110?????0
P._isonensis            ??????????2??????0101120200??????????????????????????????????????????????????????????????????1011???011?0????????????????????1?
K._kohlerorum           ?????2?2412????????????????????????????????????????????????????????????????????????????????????????????????????????????????????
;
END;

BEGIN ASSUMPTIONS;
	OPTIONS  DEFTYPE=unord PolyTcount=MINSTEPS ;
END;

BEGIN TREES;

	Translate
		1 I._bernissartensis,
		2 I._atherfieldensis,
		3 O._nigeriensis,
		4 P._gobiensis,
		5 B._johnsoni,
		6 G._mongoliensis,
		7 P._byrdi,
		8 T._transsylvanicus,
		9 B._canadensis,
		10 M._peeblesorum,
		11 Gryposaurus_spp.,
		12 Prosaurolophus_spp.,
		13 Saurolophus_spp.,
		14 Edmontosaurus_spp.,
		15 Lambeosaurus_spp.,
		16 H._altispinus,
		17 H._stebingeri,
		18 C._casuarius,
		19 Parasaurolophus_spp.,
		20 A._riabinini,
		21 O._arharensis,
		22 T._sinensis,
		23 P._isonensis,
		24 K._kohlerorum
		;
tree MPT_1 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),(((((15,18),(20,24)),17),(19,21)),16)),23)),22)),6),7)),4)));
tree MPT_2 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),(((((15,18),(20,24)),17),(19,21)),16)),23),22))),6),7)),4)));
tree MPT_3 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),(((((15,18),(20,24)),17),(19,21)),16)),23))),6),7)),4)));
tree MPT_4 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),(((((15,18),(20,24)),17),16),(19,21))),23)),22)),6),7)),4)));
tree MPT_5 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),(((((15,18),(20,24)),17),(19,21)),16)),23)),22)),7)),4)));
tree MPT_6 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),((((((15,18),24),20),17),(19,21)),16)),23)),22)),6),7)),4)));
tree MPT_7 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),(((((15,18),20),(17,24)),(19,21)),16)),23)),22)),6),7)),4)));
tree MPT_8 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),((((((15,18),20),17),24),(19,21)),16)),23)),22)),6),7)),4)));
tree MPT_9 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),((((((15,18),20),24),17),(19,21)),16)),23)),22)),6),7)),4)));
tree MPT_10 = [&R] (1,(2,((3,(((5,((8,((((((9,10),(11,(12,13))),14),24),(((((15,18),20),17),(19,21)),16)),23)),22)),6),7)),4)));
tree MPT_11 = [&R] (1,(2,((3,(((5,((8,((((((9,10),(11,(12,13))),24),14),(((((15,18),20),17),(19,21)),16)),23)),22)),6),7)),4)));
tree MPT_12 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),(14,24)),(((((15,18),20),17),(19,21)),16)),23)),22)),6),7)),4)));
tree MPT_13 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),(((((15,18),(20,24)),17),16),(19,21))),23),22))),6),7)),4)));
tree MPT_14 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),((((((15,18),24),20),17),(19,21)),16)),23),22))),6),7)),4)));
tree MPT_15 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),(((((15,18),20),(17,24)),(19,21)),16)),23),22))),6),7)),4)));
tree MPT_16 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),((((((15,18),20),17),24),(19,21)),16)),23),22))),6),7)),4)));
tree MPT_17 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),((((((15,18),20),24),17),(19,21)),16)),23),22))),6),7)),4)));
tree MPT_18 = [&R] (1,(2,((3,(((5,(8,(((((((9,10),(11,(12,13))),14),24),(((((15,18),20),17),(19,21)),16)),23),22))),6),7)),4)));
tree MPT_19 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),(14,24)),(((((15,18),20),17),(19,21)),16)),23),22))),6),7)),4)));
tree MPT_20 = [&R] (1,(2,((3,(((5,(8,(((((((9,10),(11,(12,13))),24),14),(((((15,18),20),17),(19,21)),16)),23),22))),6),7)),4)));
tree MPT_21 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),(((((15,18),(20,24)),17),16),(19,21))),23))),6),7)),4)));
tree MPT_22 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),((((((15,18),24),20),17),(19,21)),16)),23))),6),7)),4)));
tree MPT_23 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),(((((15,18),20),(17,24)),(19,21)),16)),23))),6),7)),4)));
tree MPT_24 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),((((((15,18),20),17),24),(19,21)),16)),23))),6),7)),4)));
tree MPT_25 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),((((((15,18),20),24),17),(19,21)),16)),23))),6),7)),4)));
tree MPT_26 = [&R] (1,(2,((3,(((5,((8,22),((((((9,10),(11,(12,13))),14),24),(((((15,18),20),17),(19,21)),16)),23))),6),7)),4)));
tree MPT_27 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),(14,24)),(((((15,18),20),17),(19,21)),16)),23))),6),7)),4)));
tree MPT_28 = [&R] (1,(2,((3,(((5,((8,22),((((((9,10),(11,(12,13))),24),14),(((((15,18),20),17),(19,21)),16)),23))),6),7)),4)));
tree MPT_29 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),((((((15,18),24),20),17),16),(19,21))),23)),22)),6),7)),4)));
tree MPT_30 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),(((((15,18),20),(17,24)),16),(19,21))),23)),22)),6),7)),4)));
tree MPT_31 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),((((((15,18),20),17),24),16),(19,21))),23)),22)),6),7)),4)));
tree MPT_32 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),14),((((((15,18),20),24),17),16),(19,21))),23)),22)),6),7)),4)));
tree MPT_33 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),(((((15,18),(20,24)),17),16),(19,21))),23)),22)),7)),4)));
tree MPT_34 = [&R] (1,(2,((3,(((5,((8,((((((9,10),(11,(12,13))),14),24),(((((15,18),20),17),16),(19,21))),23)),22)),6),7)),4)));
tree MPT_35 = [&R] (1,(2,((3,(((5,((8,(((((9,10),(11,(12,13))),(14,24)),(((((15,18),20),17),16),(19,21))),23)),22)),6),7)),4)));
tree MPT_36 = [&R] (1,(2,((3,(((5,((8,((((((9,10),(11,(12,13))),24),14),(((((15,18),20),17),16),(19,21))),23)),22)),6),7)),4)));
tree MPT_37 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),((((((15,18),24),20),17),(19,21)),16)),23)),22)),7)),4)));
tree MPT_38 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),(((((15,18),20),(17,24)),(19,21)),16)),23)),22)),7)),4)));
tree MPT_39 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),((((((15,18),20),17),24),(19,21)),16)),23)),22)),7)),4)));
tree MPT_40 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),((((((15,18),20),24),17),(19,21)),16)),23)),22)),7)),4)));
tree MPT_41 = [&R] (1,(2,((3,(((5,6),((8,((((((9,10),(11,(12,13))),14),24),(((((15,18),20),17),(19,21)),16)),23)),22)),7)),4)));
tree MPT_42 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),(14,24)),(((((15,18),20),17),(19,21)),16)),23)),22)),7)),4)));
tree MPT_43 = [&R] (1,(2,((3,(((5,6),((8,((((((9,10),(11,(12,13))),24),14),(((((15,18),20),17),(19,21)),16)),23)),22)),7)),4)));
tree MPT_44 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),((((((15,18),24),20),17),16),(19,21))),23),22))),6),7)),4)));
tree MPT_45 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),(((((15,18),20),(17,24)),16),(19,21))),23),22))),6),7)),4)));
tree MPT_46 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),((((((15,18),20),17),24),16),(19,21))),23),22))),6),7)),4)));
tree MPT_47 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),14),((((((15,18),20),24),17),16),(19,21))),23),22))),6),7)),4)));
tree MPT_48 = [&R] (1,(2,((3,(((5,(8,(((((((9,10),(11,(12,13))),14),24),(((((15,18),20),17),16),(19,21))),23),22))),6),7)),4)));
tree MPT_49 = [&R] (1,(2,((3,(((5,(8,((((((9,10),(11,(12,13))),(14,24)),(((((15,18),20),17),16),(19,21))),23),22))),6),7)),4)));
tree MPT_50 = [&R] (1,(2,((3,(((5,(8,(((((((9,10),(11,(12,13))),24),14),(((((15,18),20),17),16),(19,21))),23),22))),6),7)),4)));
tree MPT_51 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),((((((15,18),24),20),17),16),(19,21))),23))),6),7)),4)));
tree MPT_52 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),(((((15,18),20),(17,24)),16),(19,21))),23))),6),7)),4)));
tree MPT_53 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),((((((15,18),20),17),24),16),(19,21))),23))),6),7)),4)));
tree MPT_54 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),14),((((((15,18),20),24),17),16),(19,21))),23))),6),7)),4)));
tree MPT_55 = [&R] (1,(2,((3,(((5,((8,22),((((((9,10),(11,(12,13))),14),24),(((((15,18),20),17),16),(19,21))),23))),6),7)),4)));
tree MPT_56 = [&R] (1,(2,((3,(((5,((8,22),(((((9,10),(11,(12,13))),(14,24)),(((((15,18),20),17),16),(19,21))),23))),6),7)),4)));
tree MPT_57 = [&R] (1,(2,((3,(((5,((8,22),((((((9,10),(11,(12,13))),24),14),(((((15,18),20),17),16),(19,21))),23))),6),7)),4)));
tree MPT_58 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),((((((15,18),24),20),17),16),(19,21))),23)),22)),7)),4)));
tree MPT_59 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),(((((15,18),20),(17,24)),16),(19,21))),23)),22)),7)),4)));
tree MPT_60 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),((((((15,18),20),17),24),16),(19,21))),23)),22)),7)),4)));
tree MPT_61 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),14),((((((15,18),20),24),17),16),(19,21))),23)),22)),7)),4)));
tree MPT_62 = [&R] (1,(2,((3,(((5,6),((8,((((((9,10),(11,(12,13))),14),24),(((((15,18),20),17),16),(19,21))),23)),22)),7)),4)));
tree MPT_63 = [&R] (1,(2,((3,(((5,6),((8,(((((9,10),(11,(12,13))),(14,24)),(((((15,18),20),17),16),(19,21))),23)),22)),7)),4)));
tree MPT_64 = [&R] (1,(2,((3,(((5,6),((8,((((((9,10),(11,(12,13))),24),14),(((((15,18),20),17),16),(19,21))),23)),22)),7)),4)));
END;