{ s_m_m2io_version ::: 2.0.0 } f_m_ct { s_m_title r_lp_tautomer_probability r_epik_Ionization_Penalty r_epik_Ionization_Penalty_Charging r_epik_Ionization_Penalty_Neutral r_epik_State_Penalty i_epik_Tot_Q ::: TEMP00000001 0.499997604887973 0.1147 0.0665 0.0482 0.1262 1 m_depend[6] { # First column is dependency index # i_m_depend_dependency s_m_depend_property ::: 1 10 r_lp_tautomer_probability 2 10 r_epik_Ionization_Penalty 3 10 r_epik_Ionization_Penalty_Charging 4 10 r_epik_Ionization_Penalty_Neutral 5 10 r_epik_State_Penalty 6 10 i_epik_Tot_Q ::: } m_atom[31] { # First column is atom index # i_m_mmod_type r_m_x_coord r_m_y_coord r_m_z_coord i_m_residue_number s_m_insertion_code s_m_mmod_res s_m_chain_name i_m_color r_m_charge1 r_m_charge2 s_m_pdb_residue_name s_m_pdb_atom_name s_m_grow_name i_m_atomic_number i_m_formal_charge i_m_representation i_m_visibility s_m_atom_name i_m_template_index r_epik_H2O_pKa r_epik_H2O_pKa_uncertainty ::: 1 2 6.327600 2.272900 -3.580100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 2 2 5.154800 2.440900 -2.946500 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 3 2 5.428300 2.330200 -1.514500 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 4 2 6.811300 2.098500 -1.394900 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 5 25 7.327900 2.075900 -2.661000 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 <> <> 6 43 8.364528 1.930414 -2.998988 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 13.790 2.000 7 25 7.329000 1.950700 -0.176500 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 3.788 1.050 8 2 6.564800 2.024700 0.891700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 9 25 5.264300 2.245900 0.825100 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 2.375 1.050 10 2 4.655300 2.406600 -0.346200 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 11 25 3.293000 2.637600 -0.411200 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 <> <> 12 3 2.935800 3.880900 0.286100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 13 3 1.520600 4.313700 -0.121800 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 14 2 0.612800 3.116000 0.015400 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 15 2 1.074700 1.849500 0.125800 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 16 25 -0.009800 1.037700 0.235900 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 <> <> 17 43 0.125061 -0.048643 0.343930 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 8.125 0.900 18 2 -1.105400 1.831200 0.181700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 19 31 -0.719000 3.074900 0.055100 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 1 0 1 "" 0 <> <> 20 3 2.536900 1.488600 0.116500 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 21 57 3.611500 2.732800 -3.685900 900 " " X " " 9 0.00000 0.00000 "UNK " " " " " 17 0 0 1 "" 0 <> <> 22 41 6.464400 2.298400 -4.651100 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 23 41 7.019500 1.899800 1.863300 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 24 41 2.967287 3.713800 1.372878 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 25 41 3.651305 4.671470 0.015821 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 26 41 1.181487 5.126466 0.537301 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 27 41 1.531062 4.666664 -1.163581 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 28 41 -2.129700 1.493500 0.236900 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 29 41 2.705268 0.612292 -0.526724 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 30 41 2.876738 1.264101 1.138317 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 31 44 -1.300366 4.005988 -0.016235 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 7.976 0.900 ::: } m_bond[68] { # First column is bond index # i_m_from i_m_to i_m_order i_m_from_rep i_m_to_rep ::: 1 1 5 1 1 1 2 1 2 2 1 1 3 1 22 1 1 1 4 2 1 2 1 1 5 2 3 1 1 1 6 2 21 1 1 1 7 3 2 1 1 1 8 3 10 2 1 1 9 3 4 1 1 1 10 4 3 1 1 1 11 4 5 1 1 1 12 4 7 2 1 1 13 5 1 1 1 1 14 5 4 1 1 1 15 5 6 1 1 1 16 6 5 1 1 1 17 7 4 2 1 1 18 7 8 1 1 1 19 8 7 1 1 1 20 8 9 2 1 1 21 8 23 1 1 1 22 9 8 2 1 1 23 9 10 1 1 1 24 10 3 2 1 1 25 10 9 1 1 1 26 10 11 1 1 1 27 11 10 1 1 1 28 11 20 1 1 1 29 11 12 1 1 1 30 12 11 1 1 1 31 12 13 1 1 1 32 12 24 1 1 1 33 12 25 1 1 1 34 13 12 1 1 1 35 13 14 1 1 1 36 13 26 1 1 1 37 13 27 1 1 1 38 14 13 1 1 1 39 14 19 1 1 1 40 14 15 2 1 1 41 15 14 2 1 1 42 15 16 1 1 1 43 15 20 1 1 1 44 16 15 1 1 1 45 16 17 1 1 1 46 16 18 1 1 1 47 17 16 1 1 1 48 18 16 1 1 1 49 18 19 2 1 1 50 18 28 1 1 1 51 19 14 1 1 1 52 19 18 2 1 1 53 19 31 1 1 1 54 20 11 1 1 1 55 20 15 1 1 1 56 20 29 1 1 1 57 20 30 1 1 1 58 21 2 1 1 1 59 22 1 1 1 1 60 23 8 1 1 1 61 24 12 1 1 1 62 25 12 1 1 1 63 26 13 1 1 1 64 27 13 1 1 1 65 28 18 1 1 1 66 29 20 1 1 1 67 30 20 1 1 1 68 31 19 1 1 1 ::: } } f_m_ct { s_m_title r_lp_tautomer_probability r_epik_Ionization_Penalty r_epik_Ionization_Penalty_Charging r_epik_Ionization_Penalty_Neutral r_epik_State_Penalty i_epik_Tot_Q ::: TEMP00000002 0.499997604887973 0.1147 0.0665 0.0482 0.1262 1 m_depend[6] { # First column is dependency index # i_m_depend_dependency s_m_depend_property ::: 1 10 r_lp_tautomer_probability 2 10 r_epik_Ionization_Penalty 3 10 r_epik_Ionization_Penalty_Charging 4 10 r_epik_Ionization_Penalty_Neutral 5 10 r_epik_State_Penalty 6 10 i_epik_Tot_Q ::: } m_atom[31] { # First column is atom index # i_m_mmod_type r_m_x_coord r_m_y_coord r_m_z_coord i_m_residue_number s_m_insertion_code s_m_mmod_res s_m_chain_name i_m_color r_m_charge1 r_m_charge2 s_m_pdb_residue_name s_m_pdb_atom_name s_m_grow_name i_m_atomic_number i_m_formal_charge i_m_representation i_m_visibility s_m_atom_name i_m_template_index r_epik_H2O_pKa r_epik_H2O_pKa_uncertainty ::: 1 2 6.911400 3.304400 3.417700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 2 2 5.749100 2.991400 2.820700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 3 2 6.052900 2.731400 1.414300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 4 2 7.440500 2.917700 1.270700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 5 25 7.930800 3.263500 2.499700 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 <> <> 6 43 8.960611 3.493124 2.810767 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 13.790 2.000 7 25 7.985500 2.740500 0.068200 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 3.788 1.050 8 2 7.242800 2.399000 -0.962300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 9 25 5.939000 2.208400 -0.870700 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 2.375 1.050 10 2 5.302500 2.367000 0.286300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 11 25 3.936200 2.171900 0.376400 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 <> <> 12 3 3.212000 3.107400 -0.495300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 13 3 1.729800 3.142400 -0.097400 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 14 2 1.243800 1.717100 0.003300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 15 2 2.080000 0.656600 0.077700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 16 25 1.305300 -0.457700 0.151000 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 0 0 1 "" 0 <> <> 17 43 1.774517 -1.450336 0.218145 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 8.125 0.900 18 2 0.015900 -0.045900 0.121400 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 19 31 -0.007700 1.259300 0.033000 900 " " X " " 43 0.00000 0.00000 "UNK " " " " " 7 1 0 1 "" 0 <> <> 20 3 3.581600 0.773700 0.077100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 0 1 "" 0 <> <> 21 57 4.187200 2.910700 3.574200 900 " " X " " 9 0.00000 0.00000 "UNK " " " " " 17 0 0 1 "" 0 <> <> 22 41 7.026100 3.551300 4.462900 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 23 41 7.719400 2.264500 -1.922100 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 24 41 3.641967 4.114387 -0.389916 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 25 41 3.301386 2.778165 -1.541060 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 26 41 1.622316 3.651099 0.871967 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 27 41 1.157433 3.687056 -0.862740 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 28 41 -0.850700 -0.689000 0.164100 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 29 41 3.981275 0.497273 -0.909737 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 30 41 4.011876 0.113870 0.844881 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 <> <> 31 44 -0.851967 1.962763 -0.015507 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 0 1 "" 0 7.976 0.900 ::: } m_bond[68] { # First column is bond index # i_m_from i_m_to i_m_order i_m_from_rep i_m_to_rep ::: 1 1 5 1 1 1 2 1 2 2 1 1 3 1 22 1 1 1 4 2 1 2 1 1 5 2 3 1 1 1 6 2 21 1 1 1 7 3 2 1 1 1 8 3 10 2 1 1 9 3 4 1 1 1 10 4 3 1 1 1 11 4 5 1 1 1 12 4 7 2 1 1 13 5 1 1 1 1 14 5 4 1 1 1 15 5 6 1 1 1 16 6 5 1 1 1 17 7 4 2 1 1 18 7 8 1 1 1 19 8 7 1 1 1 20 8 9 2 1 1 21 8 23 1 1 1 22 9 8 2 1 1 23 9 10 1 1 1 24 10 3 2 1 1 25 10 9 1 1 1 26 10 11 1 1 1 27 11 10 1 1 1 28 11 20 1 1 1 29 11 12 1 1 1 30 12 11 1 1 1 31 12 13 1 1 1 32 12 24 1 1 1 33 12 25 1 1 1 34 13 12 1 1 1 35 13 14 1 1 1 36 13 26 1 1 1 37 13 27 1 1 1 38 14 13 1 1 1 39 14 19 1 1 1 40 14 15 2 1 1 41 15 14 2 1 1 42 15 16 1 1 1 43 15 20 1 1 1 44 16 15 1 1 1 45 16 17 1 1 1 46 16 18 1 1 1 47 17 16 1 1 1 48 18 16 1 1 1 49 18 19 2 1 1 50 18 28 1 1 1 51 19 14 1 1 1 52 19 18 2 1 1 53 19 31 1 1 1 54 20 11 1 1 1 55 20 15 1 1 1 56 20 29 1 1 1 57 20 30 1 1 1 58 21 2 1 1 1 59 22 1 1 1 1 60 23 8 1 1 1 61 24 12 1 1 1 62 25 12 1 1 1 63 26 13 1 1 1 64 27 13 1 1 1 65 28 18 1 1 1 66 29 20 1 1 1 67 30 20 1 1 1 68 31 19 1 1 1 ::: } }