#NEXUS Begin trees; [Treefile saved Thursday, January 27, 2005 11:42 AM] [! >Data file = SM_Combo 12.nex >Heuristic search settings: > Optimality criterion = parsimony > Character-status summary: > 532 characters are excluded > Of the remaining 650 included characters: > All characters are of type 'unord' > All characters have equal weight > 318 characters are constant > 54 variable characters are parsimony-uninformative > Number of (included) parsimony-informative characters = 278 > Gaps are treated as "missing" > Multistate taxa interpreted as uncertainty > Branch-swapping algorithm: tree-bisection-reconnection (TBR) > Initial swapping on 70 trees already in memory > Steepest descent option not in effect > Initial 'MaxTrees' setting = 200 (will be auto-increased by 100) > Branches collapsed (creating polytomies) if maximum branch length is zero > 'MulTrees' option in effect > Topological constraints not enforced > Trees are unrooted > >Heuristic search completed > Total number of rearrangements tried = 1509282 > Score of best tree(s) found = 2307 > Number of trees retained = 69 > Time used = 1.28 sec ] Translate 1 Neotrigonia, 2 Mut_rostrata, 3 Mut_dubia, 4 Ano_trigonus, 5 Ano_guanarensis, 6 Mon_minuana, 7 Eth_elliptica, 8 Aco_rivoli, 9 Pse_dalyi, 10 Hyr_depressa, 11 Hyr_australis, 12 Hyr_menziesi_1, 13 Hyr_menziesi_2, 14 Vel_angasi, 15 Vel_ambiguus, 16 Lor_rugata, 17 Dipl_chilensis, 18 Dipl_deceptus, 19 Castalia, 20 Mar_margaritifera, 21 Cum_monodonta, 22 Coel_aegyptiaca, 23 Con_contradens, 24 Gon_angulata, 25 Trit_verrucosa, 26 Qua_quadrula, 27 Amb_plicata, 28 Ell_dilatata, 29 Ple_coccineum, 30 Fus_flava, 31 Obl_reflexa, 32 Tru_truncata, 33 Act_carinata, 34 Ptycho_fasciolaris, 35 Vill_iris, 36 Lig_recta, 37 Lamp_cardium, 38 Epi_triquetra, 39 Las_compressa, 40 Str_undulatus, 41 Pyg_grandis, 42 Ala_marginata, 43 Unio_pictorum, 44 Caf_caffra ; tree PAUP_1 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_2 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_3 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,((33,37),(35,38))),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_4 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,(((33,37),(35,38)),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_5 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_6 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_7 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_8 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_9 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_10 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,((33,37),(35,38))),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_11 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,((33,37),(35,38))),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_12 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,(((33,37),(35,38)),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_13 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,(((33,37),(35,38)),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_14 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_15 = [&U] (1,(((((((((2,3),7),(((4,5),6),8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_16 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_17 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),(12,13)),10),((14,16),15)),11),(17,18)),19)); tree PAUP_18 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_19 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_20 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_21 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),(12,13)),10),((14,16),15)),11),(17,18)),19)); tree PAUP_22 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_23 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_24 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,((33,37),(35,38))),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_25 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,((33,37),(35,38))),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_26 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,(((33,37),(35,38)),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_27 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,(((33,37),(35,38)),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_28 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_29 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),(12,13)),10),((14,16),15)),11),(17,18)),19)); tree PAUP_30 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),((39,42),(40,41)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_31 = [&U] (1,((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_32 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_33 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_34 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36))))))),((14,16),15)),(12,13)),10),11),(17,18)),19)); tree PAUP_35 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),((9,((((20,21),22),((39,42),(40,41))),(43,44))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_36 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_37 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_38 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),((14,16),15)),(12,13)),10),11),(17,18)),19)); tree PAUP_39 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,((33,37),(35,38))),(34,36)))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_40 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,((33,37),(35,38))),(34,36)))))),((14,16),15)),(12,13)),10),11),(17,18)),19)); tree PAUP_41 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,((33,37),(35,38))),(34,36)))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_42 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,(((33,37),(35,38)),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_43 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,(((33,37),(35,38)),(34,36))))))),((14,16),15)),(12,13)),10),11),(17,18)),19)); tree PAUP_44 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,(((33,37),(35,38)),(34,36))))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_45 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_46 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_47 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),(((9,(43,44)),(((20,21),22),(39,((40,41),42)))),((23,24),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36))))))),((14,16),15)),(12,13)),10),11),(17,18)),19)); tree PAUP_48 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,((22,((39,42),(40,41))),(43,44))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_49 = [&U] (1,(((((((((((2,3),((4,5),6)),7),8),((9,((((20,21),22),(39,((40,41),42))),(43,44))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_50 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,((22,(39,((40,41),42))),(43,44))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_51 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,((22,((39,42),(40,41))),(43,44))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),38),35)),(34,36))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_52 = [&U] (1,((((((((((2,3),7),(((4,5),6),8)),((9,((((20,21),22),(39,((40,41),42))),(43,44))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),35),38)),(34,36)))))),(12,13)),((14,16),15)),10),11),(17,18)),19)); tree PAUP_53 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,((22,(39,((40,41),42))),(43,44))),((23,24),(((((25,31),26),(28,(29,30))),27),((32,(((33,37),38),35)),(34,36))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_54 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),((22,(39,((40,41),42))),((23,24),((((((25,31),26),(28,(29,30))),27),((((33,37),35),38),(34,36))),32)))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_55 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((22,(39,((40,41),42))),(23,24)),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36)))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_56 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),((22,((39,42),(40,41))),((23,24),((((((25,31),26),(28,(29,30))),27),((((33,37),35),38),(34,36))),32)))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_57 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),((22,(39,((40,41),42))),((23,24),(((((((25,31),26),(28,(29,30))),27),((33,37),(35,38))),(34,36)),32)))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_58 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),((22,(39,((40,41),42))),((23,24),((((((25,31),26),(28,(29,30))),27),(((33,37),(35,38)),(34,36))),32)))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_59 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),((22,(39,((40,41),42))),((23,24),((((((25,31),26),(28,(29,30))),27),((((33,37),38),35),(34,36))),32)))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_60 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((22,((39,42),(40,41))),(23,24)),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36)))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_61 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((22,(39,((40,41),42))),(23,24)),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36)))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_62 = [&U] (1,(((((((((2,3),(((4,5),6),8)),7),(((9,(43,44)),(((22,(39,((40,41),42))),(23,24)),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36)))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_63 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),((22,((39,42),(40,41))),((23,24),(((((((25,31),26),(28,(29,30))),27),((33,37),(35,38))),(34,36)),32)))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_64 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),((22,((39,42),(40,41))),((23,24),((((((25,31),26),(28,(29,30))),27),(((33,37),(35,38)),(34,36))),32)))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_65 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),((22,((39,42),(40,41))),((23,24),((((((25,31),26),(28,(29,30))),27),((((33,37),38),35),(34,36))),32)))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_66 = [&U] (1,(((((((((2,3),(((4,5),6),8)),7),(((9,(43,44)),(((22,((39,42),(40,41))),(23,24)),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),35),38),(34,36)))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_67 = [&U] (1,(((((((((2,3),((4,5),6)),(7,8)),(((9,(43,44)),(((22,((39,42),(40,41))),(23,24)),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36)))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_68 = [&U] (1,(((((((((2,3),(((4,5),6),8)),7),(((9,(43,44)),(((22,(39,((40,41),42))),(23,24)),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36)))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); tree PAUP_69 = [&U] (1,(((((((((2,3),(((4,5),6),8)),7),(((9,(43,44)),(((22,((39,42),(40,41))),(23,24)),(((((25,31),26),(28,(29,30))),27),(32,((((33,37),38),35),(34,36)))))),(20,21))),((12,13),((14,16),15))),10),11),(17,18)),19)); End;