{ s_m_m2io_version ::: 2.0.0 } f_m_ct { s_m_title r_lp_tautomer_probability s_st_Chirality_1 s_st_Chirality_2 s_st_Chirality_3 s_st_Chirality_4 s_st_Chirality_5 s_st_Chirality_6 s_st_Chirality_7 r_epik_Ionization_Penalty r_epik_Ionization_Penalty_Charging r_epik_Ionization_Penalty_Neutral r_epik_State_Penalty i_epik_Tot_Q ::: TEMP00000001 1 2_S_13_9_3_1 5_S_23_7_4_6 7_R_9_5_16_8 9_S_2_7_11_10 13_S_15_2_12_14 20_S_25_19_21_43 23_R_18_5_22_24 0.0000 0.0000 0.0000 -0.0000 0 m_depend[13] { # First column is dependency index # i_m_depend_dependency s_m_depend_property ::: 1 10 r_lp_tautomer_probability 2 10 s_st_Chirality_1 3 10 s_st_Chirality_2 4 10 s_st_Chirality_3 5 10 s_st_Chirality_4 6 10 s_st_Chirality_5 7 10 s_st_Chirality_6 8 10 s_st_Chirality_7 9 10 r_epik_Ionization_Penalty 10 10 r_epik_Ionization_Penalty_Charging 11 10 r_epik_Ionization_Penalty_Neutral 12 10 r_epik_State_Penalty 13 10 i_epik_Tot_Q ::: } m_atom[51] { # 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 s_m_atom_name r_epik_H2O_pKa r_epik_H2O_pKa_uncertainty ::: 1 3 3.340100 1.569000 -3.725300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 2 3 4.256600 1.364500 -2.517400 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 3 3 4.461300 -0.118200 -2.272800 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 4 3 3.067600 -0.753900 -2.147700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 5 3 2.250600 -0.107500 -1.033200 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 6 41 2.755147 -0.328267 -0.080995 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 7 3 2.168200 1.417900 -1.198100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 8 41 1.634516 1.693042 -2.119771 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 9 3 3.588500 1.950400 -1.244600 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 10 41 3.999730 1.689258 -0.258347 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 11 3 3.728600 3.457500 -1.486300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 12 3 5.167000 3.585900 -2.057900 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 13 3 5.517900 2.208200 -2.672100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 14 41 6.412834 1.733807 -2.243097 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 15 16 5.850500 2.352500 -4.054400 900 " " X " " 70 0.00000 0.00000 "UNK " " " " " 8 0 "" -0.292 1.000 16 3 1.427400 2.018000 -0.000700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 17 3 -0.018500 1.515200 0.010400 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 18 2 0.002100 -0.004100 0.002000 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 19 2 -0.702000 -0.634800 0.896100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 20 3 -0.734700 -2.132400 1.008500 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 21 3 -0.442700 -2.736900 -0.368500 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 22 3 0.899000 -2.193200 -0.859300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 23 3 0.832200 -0.687300 -1.044300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 24 3 0.209700 -0.400000 -2.412100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 25 16 -2.030900 -2.544700 1.446600 900 " " X " " 70 0.00000 0.00000 "UNK " " " " " 8 0 "" -0.790 1.000 26 41 3.818846 1.151956 -4.623563 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 27 41 3.160400 2.644357 -3.871298 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 28 41 2.382160 1.057707 -3.549428 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 29 41 5.012447 -0.556546 -3.117838 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 30 41 5.036660 -0.260984 -1.346207 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 31 41 2.521403 -0.629151 -3.094329 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 32 41 3.172229 -1.825665 -1.923262 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 33 41 2.958772 3.787604 -2.199320 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 34 41 3.601692 3.994815 -0.534887 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 35 41 5.188173 4.375476 -2.823486 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 36 41 5.862630 3.843898 -1.245782 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 37 42 6.736356 2.934216 -4.349128 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 38 41 1.928163 1.713754 0.930252 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 39 41 1.433064 3.115239 -0.078378 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 40 41 -0.526496 1.879704 0.915429 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 41 41 -0.543704 1.889402 -0.880742 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 42 41 -1.311231 -0.068679 1.616062 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 43 41 -0.027002 -2.482643 1.774329 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 44 41 -0.397065 -3.832823 -0.285612 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 45 41 -1.242117 -2.455208 -1.069629 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 46 41 1.681069 -2.426560 -0.121796 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 47 41 1.153023 -2.658964 -1.822906 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 48 41 -0.811305 -0.808138 -2.443283 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 49 41 0.817498 -0.872147 -3.198013 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 50 41 0.175387 0.686826 -2.578326 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 51 42 -2.249344 -3.613409 1.588525 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" 16.476 0.300 ::: } m_bond[108] { # First column is bond index # i_m_from i_m_to i_m_order ::: 1 1 2 1 2 1 26 1 3 1 27 1 4 1 28 1 5 2 1 1 6 2 9 1 7 2 13 1 8 2 3 1 9 3 2 1 10 3 4 1 11 3 29 1 12 3 30 1 13 4 3 1 14 4 5 1 15 4 31 1 16 4 32 1 17 5 4 1 18 5 6 1 19 5 23 1 20 5 7 1 21 6 5 1 22 7 5 1 23 7 8 1 24 7 9 1 25 7 16 1 26 8 7 1 27 9 2 1 28 9 7 1 29 9 10 1 30 9 11 1 31 10 9 1 32 11 9 1 33 11 12 1 34 11 33 1 35 11 34 1 36 12 11 1 37 12 13 1 38 12 35 1 39 12 36 1 40 13 2 1 41 13 12 1 42 13 14 1 43 13 15 1 44 14 13 1 45 15 13 1 46 15 37 1 47 16 7 1 48 16 17 1 49 16 38 1 50 16 39 1 51 17 16 1 52 17 18 1 53 17 40 1 54 17 41 1 55 18 17 1 56 18 23 1 57 18 19 2 58 19 18 2 59 19 20 1 60 19 42 1 61 20 19 1 62 20 21 1 63 20 25 1 64 20 43 1 65 21 20 1 66 21 22 1 67 21 44 1 68 21 45 1 69 22 21 1 70 22 23 1 71 22 46 1 72 22 47 1 73 23 5 1 74 23 18 1 75 23 22 1 76 23 24 1 77 24 23 1 78 24 48 1 79 24 49 1 80 24 50 1 81 25 20 1 82 25 51 1 83 26 1 1 84 27 1 1 85 28 1 1 86 29 3 1 87 30 3 1 88 31 4 1 89 32 4 1 90 33 11 1 91 34 11 1 92 35 12 1 93 36 12 1 94 37 15 1 95 38 16 1 96 39 16 1 97 40 17 1 98 41 17 1 99 42 19 1 100 43 20 1 101 44 21 1 102 45 21 1 103 46 22 1 104 47 22 1 105 48 24 1 106 49 24 1 107 50 24 1 108 51 25 1 ::: } } f_m_ct { s_m_title r_lp_tautomer_probability s_st_Chirality_1 s_st_Chirality_2 s_st_Chirality_3 s_st_Chirality_4 s_st_Chirality_5 s_st_Chirality_6 s_st_Chirality_7 r_epik_Ionization_Penalty r_epik_Ionization_Penalty_Charging r_epik_Ionization_Penalty_Neutral r_epik_State_Penalty i_epik_Tot_Q ::: TEMP00000002 1 2_S_13_9_3_1 5_S_23_7_4_6 7_R_9_5_16_8 9_S_2_7_11_10 13_S_15_2_12_14 20_R_25_19_21_43 23_R_18_5_22_24 0.0000 0.0000 0.0000 -0.0000 0 m_depend[13] { # First column is dependency index # i_m_depend_dependency s_m_depend_property ::: 1 10 r_lp_tautomer_probability 2 10 s_st_Chirality_1 3 10 s_st_Chirality_2 4 10 s_st_Chirality_3 5 10 s_st_Chirality_4 6 10 s_st_Chirality_5 7 10 s_st_Chirality_6 8 10 s_st_Chirality_7 9 10 r_epik_Ionization_Penalty 10 10 r_epik_Ionization_Penalty_Charging 11 10 r_epik_Ionization_Penalty_Neutral 12 10 r_epik_State_Penalty 13 10 i_epik_Tot_Q ::: } m_atom[51] { # 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 s_m_atom_name r_epik_H2O_pKa r_epik_H2O_pKa_uncertainty ::: 1 3 5.799100 5.933400 -3.604100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 2 3 4.405500 6.256600 -4.146700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 3 3 3.520800 6.761300 -3.023000 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 4 3 3.551200 5.702300 -1.909300 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 5 3 3.099900 4.331400 -2.404700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 6 41 2.035984 4.414786 -2.671402 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 7 3 3.895800 3.892000 -3.644400 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 8 41 4.960161 3.759551 -3.400284 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 9 3 3.746200 4.966900 -4.705400 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 10 41 2.668586 4.971332 -4.926148 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 11 3 4.541900 4.745500 -5.996400 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 12 3 4.670600 6.180700 -6.575900 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 13 3 4.524200 7.150500 -5.376900 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 14 41 3.697248 7.869598 -5.472024 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 15 16 5.678800 7.986100 -5.272100 900 " " X " " 70 0.00000 0.00000 "UNK " " " " " 8 0 "" -0.292 1.000 16 3 3.345800 2.563800 -4.166100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 17 3 3.546900 1.469500 -3.112900 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 18 2 2.894500 1.937200 -1.822100 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 19 2 2.021200 1.160100 -1.251200 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 20 3 1.286400 1.561800 -0.001800 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 21 3 1.150500 3.089300 0.007700 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 22 3 2.552100 3.695600 -0.040600 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 23 3 3.286800 3.287500 -1.300900 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 24 3 4.781500 3.245600 -0.976900 900 " " X " " 2 0.00000 0.00000 "UNK " " " " " 6 0 "" <> <> 25 16 -0.011000 0.962800 0.007300 900 " " X " " 70 0.00000 0.00000 "UNK " " " " " 8 0 "" -0.790 1.000 26 41 6.260870 6.850651 -3.209869 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 27 41 6.422969 5.527752 -4.414185 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 28 41 5.715315 5.189449 -2.798174 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 29 41 3.909143 7.722006 -2.653901 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 30 41 2.495729 6.899654 -3.397283 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 31 41 4.576713 5.605417 -1.523378 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 32 41 2.879882 6.008682 -1.093541 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 33 41 5.516999 4.297870 -5.753894 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 34 41 3.983043 4.069467 -6.660221 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 35 41 5.652923 6.294896 -7.057564 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 36 41 3.876482 6.348993 -7.318230 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 37 42 5.917988 8.697142 -6.076593 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 38 41 2.271989 2.670187 -4.379670 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 39 41 3.876936 2.283656 -5.087736 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 40 41 3.078733 0.536443 -3.459634 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 41 41 4.623138 1.303844 -2.957113 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 42 41 1.799236 0.172490 -1.681733 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 43 41 1.795220 1.178054 0.894772 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 44 41 0.569723 3.411183 -0.869277 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 45 41 0.633923 3.405775 0.925846 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 46 41 2.477851 4.792885 -0.019310 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 47 41 3.131122 3.350363 0.828621 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 48 41 4.964245 2.504995 -0.184367 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 49 41 5.110383 4.237850 -0.634446 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 50 41 5.344437 2.963832 -1.878958 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" <> <> 51 42 -0.695176 1.145342 0.849073 900 " " X " " 21 0.00000 0.00000 "UNK " " " " " 1 0 "" 16.476 0.300 ::: } m_bond[108] { # First column is bond index # i_m_from i_m_to i_m_order ::: 1 1 2 1 2 1 26 1 3 1 27 1 4 1 28 1 5 2 1 1 6 2 9 1 7 2 13 1 8 2 3 1 9 3 2 1 10 3 4 1 11 3 29 1 12 3 30 1 13 4 3 1 14 4 5 1 15 4 31 1 16 4 32 1 17 5 4 1 18 5 6 1 19 5 23 1 20 5 7 1 21 6 5 1 22 7 5 1 23 7 8 1 24 7 9 1 25 7 16 1 26 8 7 1 27 9 2 1 28 9 7 1 29 9 10 1 30 9 11 1 31 10 9 1 32 11 9 1 33 11 12 1 34 11 33 1 35 11 34 1 36 12 11 1 37 12 13 1 38 12 35 1 39 12 36 1 40 13 2 1 41 13 12 1 42 13 14 1 43 13 15 1 44 14 13 1 45 15 13 1 46 15 37 1 47 16 7 1 48 16 17 1 49 16 38 1 50 16 39 1 51 17 16 1 52 17 18 1 53 17 40 1 54 17 41 1 55 18 17 1 56 18 23 1 57 18 19 2 58 19 18 2 59 19 20 1 60 19 42 1 61 20 19 1 62 20 21 1 63 20 25 1 64 20 43 1 65 21 20 1 66 21 22 1 67 21 44 1 68 21 45 1 69 22 21 1 70 22 23 1 71 22 46 1 72 22 47 1 73 23 5 1 74 23 18 1 75 23 22 1 76 23 24 1 77 24 23 1 78 24 48 1 79 24 49 1 80 24 50 1 81 25 20 1 82 25 51 1 83 26 1 1 84 27 1 1 85 28 1 1 86 29 3 1 87 30 3 1 88 31 4 1 89 32 4 1 90 33 11 1 91 34 11 1 92 35 12 1 93 36 12 1 94 37 15 1 95 38 16 1 96 39 16 1 97 40 17 1 98 41 17 1 99 42 19 1 100 43 20 1 101 44 21 1 102 45 21 1 103 46 22 1 104 47 22 1 105 48 24 1 106 49 24 1 107 50 24 1 108 51 25 1 ::: } }