#projection.x projection.y projection.z knotoid_type polynomial PD_code 0.208258406 0.0672289621 0.975760577 k0.1 + 1 PD[]; 0.245506199 -0.336059944 -0.909280166 k0.1 + 1 PD[]; 0.800895891 -0.243885801 -0.546887089 k0.1 + 1 PD[]; 0.246687464 0.145411647 -0.958123556 k0.1 + 1 PD[]; 0.501058687 -0.526723016 -0.686660802 k0.1 + 1 PD[]; 0.0466328736 0.482666185 0.874562021 k0.1 + 1 PD[]; 0.727119368 0.459134246 0.510385314 k0.1 + 1 PD[]; -0.855890296 0.229973653 -0.463210449 k2.1m + A^(4) + A^(6) - A^(10) PD[X[4,0,5,1],X[1,3,2,4],X[5,2,6,3]]; -0.245502667 0.888506045 0.387666672 k0.1 + 1 PD[]; 0.286500934 0.865334347 0.41123434 k0.1 + 1 PD[]; -0.940457502 -0.148087729 0.305957042 k2.1m + A^(4) + A^(6) - A^(10) PD[X[2,0,3,1],X[1,3,2,4]]; -0.196728612 0.809222258 -0.553585757 k0.1 + 1 PD[]; 0.264909532 -0.0277125351 0.963874969 k0.1 + 1 PD[]; 0.241352024 -0.940114966 0.240692859 k0.1 + 1 PD[]; -0.719536938 0.307843038 -0.622494384 k0.1 + 1 PD[]; 0.722595435 -0.353276097 0.594181652 k0.1 + 1 PD[]; 0.285687279 0.900875431 -0.326812234 k0.1 + 1 PD[]; -0.78899402 0.29725397 -0.537706717 k0.1 + 1 PD[]; -0.31921035 -0.937320747 -0.139766127 k0.1 + 1 PD[]; -0.603873369 -0.265366255 -0.751610075 k0.1 + 1 PD[]; -0.729183308 -0.43314932 -0.529786155 k0.1 + 1 PD[]; -0.573458684 -0.640778846 0.510438644 k0.1 + 1 PD[]; -0.640550678 -0.328708213 -0.694007017 k0.1 + 1 PD[]; -0.621949865 -0.365984949 0.692266843 k0.1 + 1 PD[]; 0.0510183599 -0.154782213 -0.986630424 k0.1 + 1 PD[]; 0.469071427 0.258621912 0.844444612 k0.1 + 1 PD[]; 0.294749758 0.204694161 -0.933393208 k0.1 + 1 PD[X[0,2,1,3],X[1,4,2,3]]; 0.85136762 0.319434031 -0.416095032 k0.1 + 1 PD[]; 0.216128322 0.884314421 0.413855716 k0.1 + 1 PD[]; -0.992981017 -0.0333902872 0.113462722 k0.1 + 1 PD[]; 0.166397568 -0.548113468 0.819684986 k0.1 + 1 PD[]; -0.17221163 -0.904309486 -0.390598909 k0.1 + 1 PD[]; -0.655433134 0.2443052 0.714648428 k0.1 + 1 PD[]; 0.281278415 0.0306862692 -0.959135447 k0.1 + 1 PD[]; -0.774113302 0.263088691 -0.575788968 k0.1 + 1 PD[]; 0.690917299 0.00950404315 0.722871329 k0.1 + 1 PD[]; 0.843087863 -0.0422687923 -0.536112119 k0.1 + 1 PD[X[0,2,1,3],X[1,4,2,3]]; -0.360496556 -0.559453404 0.746360585 k0.1 + 1 PD[]; 0.787882668 0.323525087 0.523996584 k0.1 + 1 PD[]; -0.154332509 0.655853674 0.738943459 k0.1 + 1 PD[]; -0.932504255 0.13539162 -0.334820733 k0.1 + 1 PD[]; -0.400590638 -0.424987654 0.811734337 k0.1 + 1 PD[]; -0.653198767 0.592609367 0.471323148 k0.1 + 1 PD[]; 0.271934978 0.392586195 -0.878594017 k0.1 + 1 PD[]; 0.410678399 0.794989704 -0.446469062 k0.1 + 1 PD[]; -0.310462039 -0.818188667 -0.483922129 k0.1 + 1 PD[]; 0.139026516 -0.172931276 0.975072511 k0.1 + 1 PD[]; -0.199049342 -0.960185388 0.196018823 k0.1 + 1 PD[]; 0.632246792 -0.167010862 -0.756552289 k0.1 + 1 PD[]; 0.0245926288 0.81822537 0.574371349 k0.1 + 1 PD[]; -0.660996772 0.504492708 -0.555491112 k0.1 + 1 PD[]; 0.939992252 0.167355155 0.29733284 k0.1 + 1 PD[]; 0.318330449 -0.926826774 -0.199142803 k0.1 + 1 PD[]; -0.124176841 0.20443317 0.970972292 k0.1 + 1 PD[]; -0.10460872 0.827551547 -0.551557297 k0.1 + 1 PD[]; -0.49789926 0.856644368 -0.135117555 k0.1 + 1 PD[]; -0.851981524 -0.51728944 -0.080864809 k0.1 + 1 PD[]; 0.304510168 -0.565495231 -0.766478115 k0.1 + 1 PD[]; 0.597009323 -0.714540541 0.36470767 k0.1 + 1 PD[]; -0.935645935 0.340791969 0.0918015181 k0.1 + 1 PD[]; 0.761006939 0.182440477 -0.622562375 k0.1 + 1 PD[]; 0.784768477 -0.130279129 0.605942065 k0.1 + 1 PD[]; 0.662624437 0.0498910691 0.747288255 k0.1 + 1 PD[]; -0.642999033 0.747400397 0.167167252 k0.1 + 1 PD[]; -0.338489168 0.935564542 0.100717779 k0.1 + 1 PD[]; 0.353652153 -0.925587703 0.134972437 k0.1 + 1 PD[]; -0.669204694 0.742435583 0.0308946879 k0.1 + 1 PD[]; -0.0312669358 -0.441286515 -0.896821382 k0.1 + 1 PD[]; 0.689171879 0.704352749 0.170086231 k2.1 - A^(-10) + A^(-6) + A^(-4) PD[X[0,4,1,3],X[1,6,2,5],X[4,3,5,2],X[6,9,7,8],X[7,9,8,10]]; -0.895712205 0.250616579 0.36727507 k0.1 + 1 PD[]; -0.875692336 -0.375457751 -0.303635323 k0.1 + 1 PD[]; 0.548271689 -0.785631285 0.286673402 k0.1 + 1 PD[]; 0.701198846 0.475299528 0.531423124 k0.1 + 1 PD[]; -0.544036422 0.155977953 -0.824436322 k0.1 + 1 PD[]; -0.038134924 0.292332327 -0.955556141 k0.1 + 1 PD[]; 0.867428983 0.470753885 -0.161114058 k0.1 + 1 PD[]; -0.124260488 0.580335946 -0.804841302 k0.1 + 1 PD[]; -0.29081571 0.112771752 0.950109865 k0.1 + 1 PD[]; 0.56422398 0.419575408 0.711061023 k0.1 + 1 PD[]; -0.115379347 0.761305389 -0.638045227 k0.1 + 1 PD[]; -0.775550663 0.560477711 -0.290492522 k0.1 + 1 PD[]; 0.80193527 -0.372961894 -0.46668967 k0.1 + 1 PD[]; -0.682493828 -0.268753804 0.679686374 k0.1 + 1 PD[]; 0.573196042 -0.582310581 0.576507316 k0.1 + 1 PD[]; 0.235673115 -0.0415880274 0.970942129 k0.1 + 1 PD[]; -0.918175898 0.199836735 0.342079376 k0.1 + 1 PD[]; -0.966580909 0.25369893 0.036853753 k0.1 + 1 PD[]; -0.702452354 0.631469719 0.328339283 k0.1 + 1 PD[]; -0.184712306 -0.635593636 -0.74960129 k0.1 + 1 PD[]; -0.678395779 0.725130974 -0.118170377 k0.1 + 1 PD[]; 0.494942916 0.338400018 0.800323021 k0.1 + 1 PD[]; 0.658753217 -0.0474572797 -0.750860843 k0.1 + 1 PD[]; 0.86055465 0.247365296 -0.445259593 k0.1 + 1 PD[]; -0.933715843 0.343387249 0.101291277 k0.1 + 1 PD[]; 0.318737139 -0.941024272 -0.113489894 k0.1 + 1 PD[]; -0.648202698 0.757515024 -0.077487099 k0.1 + 1 PD[]; 0.550029195 0.532556432 0.643312934 k0.1 + 1 PD[]; 0.131105183 -0.0853525374 0.987687388 k0.1 + 1 PD[]; -0.513806322 0.523784288 0.679450574 k0.1 + 1 PD[]; 0.291554659 -0.706963459 0.644359021 k0.1 + 1 PD[];