#NEXUS

[!Butler, R. J., Smith, R. M. H. and Norman, D. B., 2007. A primitive ornithischian dinosaur from the Late Triassic of South Africa, and the early evolution and diversification of Ornithischia. Proceedings of the Royal Society B-Biological Sciences, 274, 2041-2046.]

BEGIN DATA;
	DIMENSIONS  NTAX=27 NCHAR=150;
	FORMAT SYMBOLS= " 0 1 2 3 4 5" MISSING=? GAP=- ;
MATRIX

Marasuchus_lilloensis              ???000????????0???????????????????????????????????????????????????????000-0?-0??0000010?0000???0?00?????00000-000010000000-0---0000000000000010?0?00-0
Herrerasaurus_ischigualastensis    000000110000100-0--00-000-00010000010000--000000010----000000000000200000-00-0000000000100000??011011111000000000010000000-0---010000000000000000000-0
Abrictosaurus_consors              00?111000?010?10100?0-??0-???????????????????????010101010011000?01300210-0?-00?11110??????0???0?00???1?100001?1001?????????????01?1?100??????1?1????0
Agilisaurus_louderbacki            000000000101001110100-000-000000?0010000--00010?001000?110011010001110210-00-121111101?111000?10010?????100000000110110110-1010101010100110?1011101000
Archaeoceratops_oshimai            01101010000100111000111011101010???201111?00001?00111101100111?1110310211111100111111?102210????????????10000111112??01111111101?2111????1011101111000
BMNH_A100                          ?0??110???010?11????0-0?0-0??????????0?????????????????0?0?????????301210-00-11011110?????????????????????????????????????????????????????????????????
Chaoyangsaurus_youngi              11?000110??1??11????100011???0???002????????????0?1?110110011010110410211010100?11110?????????????????????????????????????????????????????????????????
Emausaurus_ernsti                  000000000?01001110000-0010000100000?0?00--000???00??0??111010001001110110-00-10111110???????????????0????????????????????????????????????????????????1
Eocursor_parvus                    ?????????????????????????????????????000--??0??????????110010001001???110-?0-1??1?1?0?0?110???000001?11?100001100010100110-100-101010100110????1?????0
Goyocephale_lattimorei             ?0011100?0?1??11111?0-?0111100-1????00110011110?1??0???0?001101?01?311110?00-11?11110?1?22?101?1011?????11111111??2??????????????????????1???1????1110
Heterodontosaurus_tucki            001111000101011110000-010-010-0000020000--0000010110101010011000001301211011(01)010100110?021?00?001001111110000111001000?110-100-102011100011??01?101000
Hexinlusaurus_multidens            ??0??????111001110010-000-000000?00?0000--00010??0?????1100110?0?01???211000-101111101?111000?1000000000100001010110011110-1111102010100110?1111101000
Homalocephale_calathocercos        ??????????11--11111-0-10111100-1100000110011110?10????????????????1???11??0??1??11110?1?221101??????????111111111121001111111111??111?0??10111????1110
Hypsilophodon_foxii                000110001?111111100(01)0-000-00000011101000--00010100111001100110100011102110010101111101012210100000000000100001111120011110-111110211110011011101101100
Jeholosaurus_shangyuanensis        00?0000011111?11???10-000-00000011101000--00010?0011100110011010?010?011110?-1??111101???????????????????????????????????????????2111?001101111110????
Lesothosaurus_diagnosticus         000000000?01001010000-000-00??00000?0000--0000010010000110010001001010110-00-1011111000?110???0001000000100000000010100110-100-101010100110110111?1000
Liaoceratops_yanzigouensis         0110101000010011???011100-10101010020111110000110011110110111110110310211111100111110?????????????????????????????????????????????????????????????????
Orodromeus_makelai                 000000001111101110000-010-00000010001000--000101001????110011010001110110-00-101111101012210?0000?0?0000100001111120011110-1111102111?0011011101101000
Othnieliosaurus_celer              ??????????????????????????????????????????????????????????????????????????????????????0122?01000000?????100001110110011110-111110211110011011111101?00
Pisanosaurus_mertii                ??????????????11???????????????????????????????????????11001?0?0??1?????0-00-?0?1111????????????????????????????????????????????????????000?0????????0
Psittacosaurus                     1110-0110011--11100-10100-00010010020011010000110111-001?01111(01)00015--111111010111110100221000000000000010000111112000111111110102111101?101100?111000
Scelidosaurus_harrisonii           000000000011001111200-001010010000010000--00000100??0??111010011001010110-00-1011111000?11000?00000?????101000000000001110-100-11001011011011001101001
Scutellosaurus_lawleri             ?0?000000??10010????0-001000???????110??????0?????100?01110??0?100?0??110-00-10111110?0111?????0000?0?00101000000?10100110-10??1000101001101??1???1??1
Stenopelix_valdensis               ????????????????????????????????????????????????????????????????????????????????????????2???????????????101001110111001111?111?11?111????1????0?111000
Stormbergia_dangershoeki           ??????????????????????????????????????????????????????????????????????????????????????0?110?????????????100000000010(01)11110-100-10101010011011?111????0
Wannanosaurus_yansiensis           ????????????????11??0-00110100-0?????01100111?0????????0000?10100?1???1111?101??01110??????????1011?????????????????????????????12????11111??????????0
Yinlong_downsi                     11100010011110111000101011000000100?001001110???1110100?10011000110311210-0?-10?11110??????????0????????10000111??1??0?11111?1?1?????1???????????????0
;
END;

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

BEGIN TREES;

	Translate
		1 Marasuchus_lilloensis,
		2 Herrerasaurus_ischigualastensis,
		3 Abrictosaurus_consors,
		4 Agilisaurus_louderbacki,
		5 Archaeoceratops_oshimai,
		6 BMNH_A100,
		7 Chaoyangsaurus_youngi,
		8 Emausaurus_ernsti,
		9 Eocursor_parvus,
		10 Goyocephale_lattimorei,
		11 Heterodontosaurus_tucki,
		12 Hexinlusaurus_multidens,
		13 Homalocephale_calathocercos,
		14 Hypsilophodon_foxii,
		15 Jeholosaurus_shangyuanensis,
		16 Lesothosaurus_diagnosticus,
		17 Liaoceratops_yanzigouensis,
		18 Orodromeus_makelai,
		19 Othnieliosaurus_celer,
		20 Pisanosaurus_mertii,
		21 Psittacosaurus,
		22 Scelidosaurus_harrisonii,
		23 Scutellosaurus_lawleri,
		24 Stenopelix_valdensis,
		25 Stormbergia_dangershoeki,
		26 Wannanosaurus_yansiensis,
		27 Yinlong_downsi
		;
tree MPT_1 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),((8,22),23)),16),9)),20)));
tree MPT_2 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),((8,22),23)),16),9),20))));
tree MPT_3 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),((8,23),22)),16),9)),20)));
tree MPT_4 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),((8,23),22)),16),9),20))));
tree MPT_5 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),(8,(22,23))),16),9)),20)));
tree MPT_6 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),(8,(22,23))),16),9),20))));
tree MPT_7 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),((8,22),23)),16),9)),20)));
tree MPT_8 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),((8,22),23)),16),9),20))));
tree MPT_9 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),((8,23),22)),16),9)),20)));
tree MPT_10 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),((8,23),22)),16),9),20))));
tree MPT_11 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),(8,(22,23))),16),9)),20)));
tree MPT_12 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),(8,(22,23))),16),9),20))));
tree MPT_13 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),((8,22),23)),16),9)),20)));
tree MPT_14 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),((8,22),23)),16),9),20))));
tree MPT_15 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),((8,23),22)),16),9)),20)));
tree MPT_16 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),((8,23),22)),16),9),20))));
tree MPT_17 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),(8,(22,23))),16),9)),20)));
tree MPT_18 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),(8,(22,23))),16),9),20))));
tree MPT_19 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),((8,(22,23)),16)),9)),20)));
tree MPT_20 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),((8,(22,23)),16)),9),20))));
tree MPT_21 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),((8,22,23),16)),9)),20)));
tree MPT_22 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),((8,22,23),16)),9),20))));
tree MPT_23 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),(((8,22),23),16)),9)),20)));
tree MPT_24 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),(((8,22),23),16)),9),20))));
tree MPT_25 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),((8,(22,23)),16)),9)),20)));
tree MPT_26 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),((8,(22,23)),16)),9),20))));
tree MPT_27 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),((8,22,23),16)),9)),20)));
tree MPT_28 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),((8,22,23),16)),9),20))));
tree MPT_29 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),(((8,22),23),16)),9)),20)));
tree MPT_30 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),(((8,22),23),16)),9),20))));
tree MPT_31 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),((8,(22,23)),16)),9)),20)));
tree MPT_32 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),((8,(22,23)),16)),9),20))));
tree MPT_33 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),((8,22,23),16)),9)),20)));
tree MPT_34 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),((8,22,23),16)),9),20))));
tree MPT_35 = [&R] (1,(2,(((3,(6,11)),((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),(((8,22),23),16)),9)),20)));
tree MPT_36 = [&R] (1,(2,((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),(((8,22),23),16)),9),20))));
tree MPT_37 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),16),(8,(22,23))),9)),20)));
tree MPT_38 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),16),(8,(22,23))),9),20))));
tree MPT_39 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),16),(8,22,23)),9)),20)));
tree MPT_40 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),16),(8,22,23)),9),20))));
tree MPT_41 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),16),((8,22),23)),9)),20)));
tree MPT_42 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),24),26)),((14,15),18)),19),12)),25),16),((8,22),23)),9),20))));
tree MPT_43 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),16),(8,(22,23))),9)),20)));
tree MPT_44 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),16),(8,(22,23))),9),20))));
tree MPT_45 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),16),(8,22,23)),9)),20)));
tree MPT_46 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),16),(8,22,23)),9),20))));
tree MPT_47 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),16),((8,22),23)),9)),20)));
tree MPT_48 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),((10,13),(24,26))),((14,15),18)),19),12)),25),16),((8,22),23)),9),20))));
tree MPT_49 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),16),(8,(22,23))),9)),20)));
tree MPT_50 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),16),(8,(22,23))),9),20))));
tree MPT_51 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),16),(8,22,23)),9)),20)));
tree MPT_52 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),16),(8,22,23)),9),20))));
tree MPT_53 = [&R] (1,(2,(((3,(6,11)),(((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),16),((8,22),23)),9)),20)));
tree MPT_54 = [&R] (1,(2,((3,(6,11)),((((((4,((((((((5,17),7),27),21),(((10,13),26),24)),((14,15),18)),19),12)),25),16),((8,22),23)),9),20))));
END;