#projection.x projection.y projection.z knotoid_type polynomial PD_code -0.608107521 0.758835177 -0.233183226 k0.1 + 1 PD[]; -0.77980418 0.499877953 0.376865324 k0.1 + 1 PD[]; 0.496066648 -0.423037432 -0.75825933 k0.1 + 1 PD[]; -0.425853202 -0.653433784 -0.62583811 k0.1 + 1 PD[]; 0.747386583 -0.443099367 -0.495051761 k0.1 + 1 PD[]; -0.816481865 -0.428245949 -0.387250269 k0.1 + 1 PD[X[0,r[2],r[1],3],X[r[1],r[4],r[2],3]]; -0.22353688 -0.651697166 0.724791051 k0.1 + 1 PD[]; -0.963899539 0.256719135 0.070660911 k0.1 + 1 PD[X[0,3,r[1],r[2]],X[r[1],3,r[2],r[4]]]; 0.90476667 -0.42446706 -0.0349998223 k0.1 + 1 PD[X[r[2],r[1],3,0],X[3,r[1],r[4],r[2]]]; 0.796742321 -0.603368172 0.0338898716 k0.1 + 1 PD[]; 0.825713234 0.468418806 -0.314295209 k2.1 - A^(-10) + A^(-6) + A^(-4) PD[X[r[0],r[3],1,r[2]],X[r[3],r[2],4,1]]; -0.66839095 0.743808079 0.00175480777 k0.1 + 1 PD[]; 0.806420131 0.59023717 0.0361476871 k0.1 + 1 PD[]; -0.34723712 0.140585232 0.927179689 k0.1 + 1 PD[]; 0.0366097267 -0.220834656 -0.974623919 k0.1 + 1 PD[]; -0.260511682 0.921895733 0.286778524 k2.1m + A^(4) + A^(6) - A^(10) PD[X[5,0,6,1],X[r[3],1,4,r[2]],X[7,r[3],r[8],r[2]],X[4,6,5,7]]; -0.637015195 0.191858456 0.746593581 k0.1 + 1 PD[]; 0.620770879 0.701062428 -0.350934449 k0.1 + 1 PD[]; -0.438486254 0.840042937 -0.319464662 k0.1 + 1 PD[]; 0.263437429 0.93007061 -0.256065189 k0.1 + 1 PD[]; 0.721352178 0.688984848 0.0703627365 k0.1 + 1 PD[]; 0.761610344 -0.50619756 0.404615514 k0.1 + 1 PD[]; -0.980493112 -0.129740259 -0.147650678 k0.1 + 1 PD[X[0,3,r[1],r[2]],X[r[1],3,r[2],r[4]]]; -0.51391723 0.857266872 -0.0313462964 k0.1 + 1 PD[]; -0.395874403 -0.652663214 -0.645998596 k0.1 + 1 PD[]; 0.374336385 -0.193385188 -0.906903766 k0.1 + 1 PD[]; -0.206122123 0.503633173 -0.838967996 k0.1 + 1 PD[]; -0.906766479 -0.266391269 0.326818367 k0.1 + 1 PD[]; 0.783471397 0.599833492 -0.162395665 k2.2 + A^(-2) + 1 + v + A^(2) PD[X[2,0,r[3],r[1]],X[r[3],2,4,r[1]]]; 0.0550067859 -0.258037429 0.964567747 k0.1 + 1 PD[]; 0.99006985 -0.139901885 0.0137533839 k0.1 + 1 PD[X[r[2],r[1],3,0],X[3,r[1],r[4],r[2]]]; 0.880919825 -0.217964009 -0.42008565 k0.1 + 1 PD[]; -0.751545536 0.507875958 0.421000378 k0.1 + 1 PD[]; -0.341734241 -0.762943589 -0.548757495 k0.1 + 1 PD[]; -0.554446467 0.593599386 -0.583291423 k0.1 + 1 PD[]; 0.291241981 0.949874229 0.113653234 k0.1 + 1 PD[]; 0.43876945 -0.153626644 -0.885370106 k0.1 + 1 PD[]; 0.485637603 0.713536505 -0.504996806 k0.1 + 1 PD[]; -0.799518105 0.350293429 -0.487919373 k0.1 + 1 PD[]; 0.95609767 0.192941917 -0.220568951 k0.1 + 1 PD[X[r[2],r[1],3,0],X[3,r[1],r[4],r[2]]]; -0.898844891 0.182898727 -0.398278693 k0.1 + 1 PD[]; -0.552079502 -0.42337097 0.718307208 k0.1 + 1 PD[]; -0.933070486 0.292239444 -0.209703544 k0.1 + 1 PD[]; -0.642031381 -0.488360693 -0.591015684 k0.1 + 1 PD[]; -0.682110516 -0.234382832 0.692668703 k0.1 + 1 PD[]; 0.679266188 0.733000269 0.0361669911 k0.1 + 1 PD[]; 0.945118115 0.32202661 -0.0552323391 k0.1 + 1 PD[]; -0.196365462 -0.955428404 -0.220447658 k0.1 + 1 PD[]; -0.670674624 0.684129397 0.286640048 k0.1 + 1 PD[]; -0.328869616 -0.760873256 0.559389545 k0.1 + 1 PD[X[r[0],r[3],1,r[2]],X[1,r[3],r[2],4]]; 0.309279107 0.882144325 -0.355201103 k0.1 + 1 PD[X[r[2],0,3,r[1]],X[3,r[2],r[4],r[1]]]; -0.926762004 0.256461766 0.27448051 k0.1 + 1 PD[]; -0.432258774 -0.518215952 -0.737973291 k0.1 + 1 PD[]; -0.0369936597 -0.717759248 0.695307939 k0.1 + 1 PD[]; 0.79423172 0.606469451 -0.037293165 k0.1 + 1 PD[]; -0.680912744 0.640032672 -0.355971929 k0.1 + 1 PD[]; -0.769818557 0.4306122 -0.471118373 k0.1 + 1 PD[]; -0.811839122 0.583835946 -0.00726831006 k0.1 + 1 PD[]; -0.843363417 0.157063518 0.513876637 k0.1 + 1 PD[]; 0.674453347 -0.0359763941 0.737440426 k0.1 + 1 PD[]; 0.398872209 -0.38763149 -0.83104921 k0.1 + 1 PD[]; -0.968593264 0.246844624 -0.0299135651 k0.1 + 1 PD[]; 0.114738392 -0.898205763 -0.42433655 k0.1 + 1 PD[]; 0.579353507 0.593011998 -0.559183587 k0.1 + 1 PD[]; -0.83601276 0.192649609 0.513778934 k0.1 + 1 PD[]; -0.381778601 0.230241891 -0.895116624 k2.1m + A^(4) + A^(6) - A^(10) PD[X[0,r[2],r[1],3],X[3,r[1],r[4],r[2]]]; 0.392266676 -0.321062571 -0.862000975 k0.1 + 1 PD[]; -0.61636451 0.786910372 0.0294424416 k0.1 + 1 PD[]; 0.132844318 -0.0370791774 0.990443094 k0.1 + 1 PD[]; -0.710572144 0.703620708 -0.00226420024 k0.1 + 1 PD[]; -0.0336743746 -0.694663879 -0.718545846 k0.1 + 1 PD[]; -0.0778032192 0.753849297 -0.652424629 k0.1 + 1 PD[]; 0.943108424 0.225624801 -0.24421292 k0.1 + 1 PD[X[r[2],r[1],3,0],X[3,r[1],r[4],r[2]]]; 0.0235580617 0.999362542 0.0268240236 k0.1 + 1 PD[]; 0.330081295 -0.559680929 -0.760133933 k0.1 + 1 PD[]; 0.522119528 0.35297613 0.776401346 k0.1 + 1 PD[]; 0.320353387 0.644499561 0.694257894 k0.1 + 1 PD[]; 0.275671279 -0.0626307476 0.959209432 k0.1 + 1 PD[]; 0.22780118 0.90623406 0.356155094 k0.1 + 1 PD[]; -0.565622579 -0.45619722 -0.686989952 k0.1 + 1 PD[]; -0.377648845 0.917785035 -0.122686511 k0.1 + 1 PD[]; -0.599253632 0.780448645 -0.178311517 k0.1 + 1 PD[]; -0.223421002 -0.866175813 0.447015119 k0.1 + 1 PD[]; 0.561082586 -0.097560448 0.821990444 k0.1 + 1 PD[]; 0.700444609 0.648277819 -0.298518374 k0.1 + 1 PD[]; -0.949367906 -0.220276853 0.224006 k0.1 + 1 PD[X[0,3,r[1],r[2]],X[r[1],3,r[2],r[4]]]; 0.816384151 0.143928923 0.559286495 k3.2m + A^(-2) + 1 - A^(2) - A^(4) + A^(8) PD[X[5,r[1],r[6],0],X[2,r[6],r[3],7],X[r[1],5,2,r[4]],X[7,r[3],r[8],r[4]]]; -0.130045102 0.388163812 0.912368964 k0.1 + 1 PD[]; -0.17365439 -0.371914146 0.91187939 k0.1 + 1 PD[]; -0.815263102 -0.568606851 -0.109691945 k0.1 + 1 PD[]; 0.389277043 0.264653064 0.882282347 k0.1 + 1 PD[]; 0.132854354 0.0585363583 -0.989405486 k0.1 + 1 PD[]; -0.506760236 0.0155938278 -0.861945993 k0.1 + 1 PD[]; -0.655258641 -0.73671462 0.166996052 k0.1 + 1 PD[]; 0.890394364 -0.130406989 -0.436109955 k0.1 + 1 PD[]; -0.201947709 -0.923095557 0.327279261 k0.1 + 1 PD[X[0,r[2],r[1],3],X[r[1],r[4],r[2],3]]; 0.884497576 0.434566207 0.169753496 k0.1 + 1 PD[]; -0.454349392 -0.698554136 -0.552800822 k0.1 + 1 PD[]; -0.888451373 -0.00645156503 -0.458925413 k0.1 + 1 PD[X[0,3,r[1],r[2]],X[r[1],3,r[2],r[4]]]; 0.733315173 0.662633823 -0.152201424 k0.1 + 1 PD[];