#NEXUS [!Butler, R. J., 2005. The 'fabrosaurid' ornithischian dinosaurs of the Upper Elliot Formation (Lower Jurassic) of South Africa and Lesotho. Zoological Journal of the Linnean Society, 145, 175-218.] BEGIN DATA; DIMENSIONS NTAX=23 NCHAR=73; FORMAT SYMBOLS= " 0 1 2" MISSING=? GAP=- ; MATRIX Marasuchus ???????????????????????????????????????11?00?0000-00100000--0000000000000 Saurischia 1010-00000(01)00000000000--00000000--0000000000000000000000(01)0--0000000000000 Pisanosaurus ???????000??????1??????????????????0111????????????0???0?0????????1????00 Lesothosaurus 0100-0000110010011000100000000?1001001101?1?00110000000011000010002110100 'SAM-PK-K8025' ?????000??????????????????????????10011???1?00110000000011000010002???100 Stormbergia ???????????????????????????????????????01?1?00110000001111000010002110100 Heterodontosaurus 211111111011100110010100000?0101010011101220010101011001010000?1102110100 Abrictosaurus 2111?11110101000100?0100???????11100111???1?0?010101100??1???010102????00 Agilisaurus 1100-0000?100?011?0001000?1001?100101121101010111000001011100010002110100 Jeholosaurus 010100?0??110?011?100???1???0??11010?12??????????????????????020?0211??00 Yandsaurus ?????0000?10??0?1?100101000001?1??1011?110101011110010110111001000211?100 Hypsilophodon 1101001101101101101001011101010110101121102100011121111101111020102101100 Gasparinisaura ?????0?10?????1110100100000?00?1???0112?1?2??0?111011111011110?11?21?1100 Thescelosaurus ?????01?0???????1?100101??010??1??10112??111000111011?1101111120112101100 Parksosaurus ?????0?00110??1110100?????0?0??1???0?????1210001110?1?1101111121102101100 Iguanodontia 210100100111101110(01)0010(01)(01)1000(01)011010112111200001110111110110112011211(01)100 Scelidosaurus 1?00-00201100?101000111?01100001??110120001000010010000101000010012100111 Scutellosaurus 0????00??1?0????1??01?????11???????001???01?0001??0??000?1??0010002???110 Emausaurus 1?00-002011000001000110101100??10011011????????????????????????????????10 Stegosauria 0100-002011000111000111?01100(01)01001101111?1000010?10000101100(01)?1?12120010 Ankylosauria ?100-002011?002-1???111???100001011111211?100001??10?001010?0(01)?1?12100111 Pachycephalosauria 210110?00110(01)02-1011011?010011110?00012???2?011111211101011010?0102??1101 Ceratopsia 21010(01)11011(01)00(01)11001010101001(01)111010112112200(01)011121110101(01)(01)1020102100100 ; END; BEGIN ASSUMPTIONS; OPTIONS DEFTYPE=unord PolyTcount=MINSTEPS ; TYPESET * UNTITLED = unord: 1-38 40-66 68-73, ord: 39 67; END; BEGIN TREES; Translate 1 Marasuchus, 2 Saurischia, 3 Pisanosaurus, 4 Lesothosaurus, 5 'SAM-PK-K8025', 6 Stormbergia, 7 Heterodontosaurus, 8 Abrictosaurus, 9 Agilisaurus, 10 Jeholosaurus, 11 Yandsaurus, 12 Hypsilophodon, 13 Gasparinisaura, 14 Thescelosaurus, 15 Parksosaurus, 16 Iguanodontia, 17 Scelidosaurus, 18 Scutellosaurus, 19 Emausaurus, 20 Stegosauria, 21 Ankylosauria, 22 Pachycephalosauria, 23 Ceratopsia ; tree MPT_1 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_2 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9))),(((17,(20,21)),19),18))))); tree MPT_3 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_4 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_5 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9))),(((17,(20,21)),19),18))))); tree MPT_6 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_7 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_8 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9))),(((17,(20,21)),19),18))))); tree MPT_9 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_10 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9)))),(((17,(20,21)),19),18))))); tree MPT_11 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9))),(((17,(20,21)),19),18))))); tree MPT_12 = [&R] (1,(2,(3,(((4,(6,((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_13 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9)))),(((17,(20,21)),19),18))))); tree MPT_14 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9))),(((17,(20,21)),19),18))))); tree MPT_15 = [&R] (1,(2,(3,(((4,(6,((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_16 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9)))),(((17,(20,21)),19),18))))); tree MPT_17 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9))),(((17,(20,21)),19),18))))); tree MPT_18 = [&R] (1,(2,(3,(((4,(6,((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_19 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9)))),(((17,(20,21)),19),18))))); tree MPT_20 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9))),(((17,(20,21)),19),18))))); tree MPT_21 = [&R] (1,(2,(3,(((4,(6,((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_22 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_23 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9))),(((17,(20,21)),19),18))))); tree MPT_24 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_25 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_26 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9))),(((17,(20,21)),19),18))))); tree MPT_27 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_28 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_29 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9))),(((17,(20,21)),19),18))))); tree MPT_30 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_31 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_32 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9))),(((17,(20,21)),19),18))))); tree MPT_33 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_34 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_35 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9))),(((17,(20,21)),19),18))))); tree MPT_36 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_37 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_38 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9))),(((17,(20,21)),19),18))))); tree MPT_39 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_40 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_41 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9))),(((17,(20,21)),19),18))))); tree MPT_42 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_43 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_44 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9))),(((17,(20,21)),19),18))))); tree MPT_45 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_46 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9)))),(((17,(20,21)),19),18))))); tree MPT_47 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9))),(((17,(20,21)),19),18))))); tree MPT_48 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9))),5),(((17,(20,21)),19),18))))); tree MPT_49 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9)))),((((17,21),20),19),18))))); tree MPT_50 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9))),((((17,21),20),19),18))))); tree MPT_51 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9))),5),((((17,21),20),19),18))))); tree MPT_52 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9))),((((17,21),20),19),18))))); tree MPT_53 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_54 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_55 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_56 = [&R] (1,(2,(3,((((4,6),((((7,8),(10,(((((12,14),15),16),(22,23)),13))),11),9)),5),((((17,21),20),19),18))))); tree MPT_57 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9)))),((((17,21),20),19),18))))); tree MPT_58 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9))),((((17,21),20),19),18))))); tree MPT_59 = [&R] (1,(2,(3,(((4,(6,((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9))),5),((((17,21),20),19),18))))); tree MPT_60 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9))),((((17,21),20),19),18))))); tree MPT_61 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_62 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_63 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_64 = [&R] (1,(2,(3,((((4,6),((((7,8),(((10,(((12,14),15),16)),(22,23)),13)),11),9)),5),((((17,21),20),19),18))))); tree MPT_65 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9)))),((((17,21),20),19),18))))); tree MPT_66 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9))),((((17,21),20),19),18))))); tree MPT_67 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9))),5),((((17,21),20),19),18))))); tree MPT_68 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9))),((((17,21),20),19),18))))); tree MPT_69 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_70 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_71 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_72 = [&R] (1,(2,(3,((((4,6),((((7,8),(10,((((12,(14,15)),16),(22,23)),13))),11),9)),5),((((17,21),20),19),18))))); tree MPT_73 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9)))),((((17,21),20),19),18))))); tree MPT_74 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9))),((((17,21),20),19),18))))); tree MPT_75 = [&R] (1,(2,(3,(((4,(6,((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9))),5),((((17,21),20),19),18))))); tree MPT_76 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9))),((((17,21),20),19),18))))); tree MPT_77 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_78 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_79 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_80 = [&R] (1,(2,(3,((((4,6),((((7,8),(((10,((12,(14,15)),16)),(22,23)),13)),11),9)),5),((((17,21),20),19),18))))); tree MPT_81 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9)))),((((17,21),20),19),18))))); tree MPT_82 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9))),((((17,21),20),19),18))))); tree MPT_83 = [&R] (1,(2,(3,(((4,(6,((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9))),5),((((17,21),20),19),18))))); tree MPT_84 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9))),((((17,21),20),19),18))))); tree MPT_85 = [&R] (1,(2,(3,((((4,6),5),((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_86 = [&R] (1,(2,(3,(((4,5,6),((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_87 = [&R] (1,(2,(3,((((4,5),6),((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_88 = [&R] (1,(2,(3,((((4,6),((((7,8),((((10,16),(12,(14,15))),(22,23)),13)),11),9)),5),((((17,21),20),19),18))))); tree MPT_89 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9)))),((((17,21),20),19),18))))); tree MPT_90 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9))),((((17,21),20),19),18))))); tree MPT_91 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9))),5),((((17,21),20),19),18))))); tree MPT_92 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9))),((((17,21),20),19),18))))); tree MPT_93 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_94 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_95 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9)),((((17,21),20),19),18))))); tree MPT_96 = [&R] (1,(2,(3,((((4,6),((((7,8),(10,(((((12,15),14),16),(22,23)),13))),11),9)),5),((((17,21),20),19),18))))); tree MPT_97 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9)))),((((17,21),20),19),18))))); tree MPT_98 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9))),((((17,21),20),19),18))))); tree MPT_99 = [&R] (1,(2,(3,(((4,(6,((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9))),5),((((17,21),20),19),18))))); tree MPT_100 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9))),((((17,21),20),19),18))))); tree MPT_101 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_102 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_103 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9)),((((17,21),20),19),18))))); tree MPT_104 = [&R] (1,(2,(3,((((4,6),((((7,8),(((10,(((12,15),14),16)),(22,23)),13)),11),9)),5),((((17,21),20),19),18))))); tree MPT_105 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9)))),((((17,21),20),19),18))))); tree MPT_106 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9))),((((17,21),20),19),18))))); tree MPT_107 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9))),5),((((17,21),20),19),18))))); tree MPT_108 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9)))),((((17,21),20),19),18))))); tree MPT_109 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9))),((((17,21),20),19),18))))); tree MPT_110 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9))),5),((((17,21),20),19),18))))); tree MPT_111 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9)))),((((17,21),20),19),18))))); tree MPT_112 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9))),((((17,21),20),19),18))))); tree MPT_113 = [&R] (1,(2,(3,(((4,(6,((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9))),5),((((17,21),20),19),18))))); tree MPT_114 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9))),((((17,21),20),19),18))))); tree MPT_115 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_116 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_117 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_118 = [&R] (1,(2,(3,((((4,6),((((7,8),(10,(((((12,13),14),15),16),(22,23)))),11),9)),5),((((17,21),20),19),18))))); tree MPT_119 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9))),((((17,21),20),19),18))))); tree MPT_120 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_121 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_122 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_123 = [&R] (1,(2,(3,((((4,6),((((7,8),(10,((((12,13),(14,15)),16),(22,23)))),11),9)),5),((((17,21),20),19),18))))); tree MPT_124 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9))),((((17,21),20),19),18))))); tree MPT_125 = [&R] (1,(2,(3,((((4,6),5),((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_126 = [&R] (1,(2,(3,(((4,5,6),((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_127 = [&R] (1,(2,(3,((((4,5),6),((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9)),((((17,21),20),19),18))))); tree MPT_128 = [&R] (1,(2,(3,((((4,6),((((7,8),(10,(((((12,13),15),14),16),(22,23)))),11),9)),5),((((17,21),20),19),18))))); tree MPT_129 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9)))),((((17,21),20),19),18))))); tree MPT_130 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9))),((((17,21),20),19),18))))); tree MPT_131 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9))),5),((((17,21),20),19),18))))); tree MPT_132 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9)))),((((17,21),20),19),18))))); tree MPT_133 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9))),((((17,21),20),19),18))))); tree MPT_134 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9))),5),((((17,21),20),19),18))))); tree MPT_135 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9)))),((((17,21),20),19),18))))); tree MPT_136 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9))),((((17,21),20),19),18))))); tree MPT_137 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9))),5),((((17,21),20),19),18))))); tree MPT_138 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9))),((((17,21),20),19),18))))); tree MPT_139 = [&R] (1,(2,(3,((((4,6),5),((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9)),((((17,21),20),19),18))))); tree MPT_140 = [&R] (1,(2,(3,(((4,5,6),((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9)),((((17,21),20),19),18))))); tree MPT_141 = [&R] (1,(2,(3,((((4,5),6),((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9)),((((17,21),20),19),18))))); tree MPT_142 = [&R] (1,(2,(3,((((4,6),((((7,8),((10,(22,23)),((((12,13),14),15),16))),11),9)),5),((((17,21),20),19),18))))); tree MPT_143 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9))),((((17,21),20),19),18))))); tree MPT_144 = [&R] (1,(2,(3,((((4,6),5),((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9)),((((17,21),20),19),18))))); tree MPT_145 = [&R] (1,(2,(3,(((4,5,6),((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9)),((((17,21),20),19),18))))); tree MPT_146 = [&R] (1,(2,(3,((((4,5),6),((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9)),((((17,21),20),19),18))))); tree MPT_147 = [&R] (1,(2,(3,((((4,6),((((7,8),((10,(22,23)),(((12,13),(14,15)),16))),11),9)),5),((((17,21),20),19),18))))); tree MPT_148 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9))),((((17,21),20),19),18))))); tree MPT_149 = [&R] (1,(2,(3,((((4,6),5),((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9)),((((17,21),20),19),18))))); tree MPT_150 = [&R] (1,(2,(3,(((4,5,6),((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9)),((((17,21),20),19),18))))); tree MPT_151 = [&R] (1,(2,(3,((((4,5),6),((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9)),((((17,21),20),19),18))))); tree MPT_152 = [&R] (1,(2,(3,((((4,6),((((7,8),((10,(22,23)),((((12,13),15),14),16))),11),9)),5),((((17,21),20),19),18))))); tree MPT_153 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9)))),((((17,21),20),19),18))))); tree MPT_154 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9))),((((17,21),20),19),18))))); tree MPT_155 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9))),5),((((17,21),20),19),18))))); tree MPT_156 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9)))),((((17,21),20),19),18))))); tree MPT_157 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9))),((((17,21),20),19),18))))); tree MPT_158 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9))),5),((((17,21),20),19),18))))); tree MPT_159 = [&R] (1,(2,(3,((4,(5,(6,((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9)))),((((17,21),20),19),18))))); tree MPT_160 = [&R] (1,(2,(3,(((4,5),(6,((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9))),((((17,21),20),19),18))))); tree MPT_161 = [&R] (1,(2,(3,(((4,(6,((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9))),5),((((17,21),20),19),18))))); tree MPT_162 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9))),((((17,21),20),19),18))))); tree MPT_163 = [&R] (1,(2,(3,((((4,6),5),((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_164 = [&R] (1,(2,(3,(((4,5,6),((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_165 = [&R] (1,(2,(3,((((4,5),6),((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_166 = [&R] (1,(2,(3,((((4,6),((((7,8),((10,((((12,13),14),15),16)),(22,23))),11),9)),5),((((17,21),20),19),18))))); tree MPT_167 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9))),((((17,21),20),19),18))))); tree MPT_168 = [&R] (1,(2,(3,((((4,6),5),((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_169 = [&R] (1,(2,(3,(((4,5,6),((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_170 = [&R] (1,(2,(3,((((4,5),6),((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_171 = [&R] (1,(2,(3,((((4,6),((((7,8),((10,(((12,13),(14,15)),16)),(22,23))),11),9)),5),((((17,21),20),19),18))))); tree MPT_172 = [&R] (1,(2,(3,(((4,6),(5,((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9))),((((17,21),20),19),18))))); tree MPT_173 = [&R] (1,(2,(3,((((4,6),5),((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_174 = [&R] (1,(2,(3,(((4,5,6),((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_175 = [&R] (1,(2,(3,((((4,5),6),((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9)),((((17,21),20),19),18))))); tree MPT_176 = [&R] (1,(2,(3,((((4,6),((((7,8),((10,((((12,13),15),14),16)),(22,23))),11),9)),5),((((17,21),20),19),18))))); END;