#projection.x projection.y projection.z knotoid_type polynomial PD_code 0.0347859005 -0.593034615 -0.80442519 k0.1 + 1 PD[]; 0.921116321 -0.318339748 -0.224063669 k0.1 + 1 PD[]; -0.619173479 0.223811004 0.752683756 k0.1 + 1 PD[]; -0.353914967 0.156063789 -0.922165001 k2.1 - A^(-10) + A^(-6) + A^(-4) PD[X[2,1,3,0],X[1,4,2,3]]; -0.544911659 -0.0981127434 -0.832733555 k0.1 + 1 PD[X[0,2,1,3],X[1,4,2,3]]; -0.738068399 0.669709276 -0.0821250486 k0.1 + 1 PD[]; 0.409096852 0.426601156 -0.806629543 k0.1 + 1 PD[]; 0.785775153 0.516301155 0.340573819 k0.1 + 1 PD[]; -0.207555277 0.704341938 0.678839629 k0.1 + 1 PD[]; -0.5402555 -0.261131154 0.799959071 k0.1 + 1 PD[X[0,3,1,2],X[1,3,2,4]]; -0.314708012 0.575924864 0.754499448 k0.1 + 1 PD[]; -0.578195703 -0.205666338 -0.789551193 k0.1 + 1 PD[X[0,2,1,3],X[1,4,2,3]]; -0.404164416 0.695131063 0.594511506 k0.1 + 1 PD[]; -0.983173778 -0.126351479 0.131926595 k0.1 + 1 PD[]; 0.0205675792 -0.979177339 -0.201962158 k0.1 + 1 PD[]; -0.715509588 0.690616932 -0.1053294 k0.1 + 1 PD[]; -0.805930252 -0.540375717 0.24180677 k0.1 + 1 PD[]; -0.37430461 0.303245099 0.876320985 k0.1 + 1 PD[]; 0.639523616 -0.106290792 0.761388082 k0.1 + 1 PD[]; -0.140008038 -0.178845135 -0.973864553 k0.1 + 1 PD[]; 0.735256517 0.159652617 0.658717615 k0.1 + 1 PD[]; 0.64704222 -0.221267644 0.729641689 k0.1 + 1 PD[]; -0.0551524655 0.587885957 -0.807061526 k0.1 + 1 PD[X[0,3,1,2],X[1,3,2,4]]; 0.280685363 -0.165532722 -0.945417709 k3.2m + A^(-2) + 1 - A^(2) - A^(4) + A^(8) PD[X[0,6,1,7],X[5,1,6,2],X[2,4,3,5],X[3,8,4,7]]; 0.501769659 0.81026445 -0.302817984 k0.1 + 1 PD[]; 0.200079248 -0.674037213 0.711085177 k0.1 + 1 PD[]; -0.584929299 -0.110115335 -0.803574719 k0.1 + 1 PD[X[0,2,1,3],X[1,4,2,3]]; -0.195134138 0.251814927 -0.947898682 k0.1 + 1 PD[]; -0.460427929 0.0829754634 0.88381061 k0.1 + 1 PD[X[2,0,3,1],X[3,2,4,1]]; -0.156854689 0.701770296 0.694920901 k0.1 + 1 PD[]; -0.129901183 0.988960316 0.0712964009 k0.1 + 1 PD[]; 0.120335804 -0.0447503073 -0.991724107 UNKNOWN - A^(-4) + 2 + 2*A^(2) - 2*A^(6) - A^(8) + A^(12) PD[X[10,2,11,3],X[11,18,12,17],X[15,7,16,8],X[3,15,4,14],X[0,6,1,5],X[9,13,10,14],X[4,8,5,9],X[12,2,13,1],X[6,16,7,17]]; 0.245932537 0.763072444 0.597693595 k0.1 + 1 PD[]; 0.885107171 0.093944841 0.455806606 k0.1 + 1 PD[]; -0.0309435818 -0.997376905 0.0654355013 k0.1 + 1 PD[]; 0.379635941 0.918025962 -0.114476576 k2.1m + A^(4) + A^(6) - A^(10) PD[X[2,0,3,1],X[1,3,2,4]]; 0.955082643 0.275650315 0.108784413 k0.1 + 1 PD[]; 0.00509735309 0.960794877 -0.277213313 k0.1 + 1 PD[]; 0.341692297 0.699354902 0.627812946 k0.1 + 1 PD[X[2,1,3,0],X[3,1,4,2]]; 0.321928903 -0.555699649 0.766524417 k0.1 + 1 PD[]; -0.560487292 -0.827714123 0.0272640171 k0.1 + 1 PD[]; 0.471417816 -0.605568947 -0.641132977 k0.1 + 1 PD[]; 0.310582579 0.0031980516 -0.950541022 k3.2m + A^(-2) + 1 - A^(2) - A^(4) + A^(8) PD[X[0,6,1,7],X[5,1,6,2],X[2,4,3,5],X[3,8,4,7]]; 0.188909187 -0.432328512 -0.881705947 k0.1 + 1 PD[]; 0.469633311 -0.69458426 0.544974549 k0.1 + 1 PD[]; 0.376555448 -0.580218437 -0.722185959 k0.1 + 1 PD[]; 0.157445882 0.986136513 -0.0523982062 k0.1 + 1 PD[]; -0.928408228 -0.189731249 0.319468645 k0.1 + 1 PD[]; 0.254898667 -0.939153707 0.230254171 k0.1 + 1 PD[]; -0.441284366 -0.715571255 -0.541503359 k0.1 + 1 PD[]; 0.593182847 -0.12750975 -0.79490589 k0.1 + 1 PD[]; 0.95523795 0.0750811132 -0.286152557 k0.1 + 1 PD[]; 0.855207331 -0.51395239 -0.066883198 k0.1 + 1 PD[]; 0.589492424 0.629356284 0.506368788 k0.1 + 1 PD[]; -0.443348322 -0.893570188 -0.0705307396 k0.1 + 1 PD[]; 0.249320813 0.262997553 -0.932025439 k3.2m + A^(-2) + 1 - A^(2) - A^(4) + A^(8) PD[X[3,1,4,0],X[1,5,2,6],X[4,2,5,3]]; -0.73085958 -0.535807992 -0.422793177 k0.1 + 1 PD[]; 0.279495975 -0.956402727 0.0847102362 k0.1 + 1 PD[]; -0.814081633 -0.479110793 0.328213259 k0.1 + 1 PD[]; -0.216538639 0.0873961313 -0.972354325 k0.1 + 1 PD[]; 0.275397812 0.472082358 -0.837433157 k3.2m + A^(-2) + 1 - A^(2) - A^(4) + A^(8) PD[X[3,1,4,0],X[1,5,2,6],X[4,2,5,3]]; -0.598096494 0.727510265 0.336168704 k0.1 + 1 PD[]; 0.110628717 0.540331356 0.834148256 k0.1 + 1 PD[]; -0.0624530999 -0.839895801 0.539142518 k0.1 + 1 PD[]; -0.52099554 0.341194079 -0.782400311 k0.1 + 1 PD[]; -0.326944828 -0.674601369 0.661830849 k0.1 + 1 PD[]; 0.873149303 -0.0777578859 -0.481210979 k0.1 + 1 PD[]; 0.327963976 -0.710190958 -0.622951389 k0.1 + 1 PD[]; -0.555824813 -0.719204579 0.41689753 k0.1 + 1 PD[]; 0.62820364 0.555099573 0.545183136 k0.1 + 1 PD[]; -0.107477613 -0.209765698 -0.971826587 k0.1 + 1 PD[]; -0.395952806 0.279833602 0.874593923 k0.1 + 1 PD[]; 0.856343671 0.133420653 0.498873177 k0.1 + 1 PD[]; -0.0296295888 -0.113617885 0.993082607 UNKNOWN - A^(-4) + 2 + 2*A^(2) - 2*A^(6) - A^(8) + A^(12) PD[X[5,1,6,0],X[16,6,17,7],X[7,13,8,14],X[17,12,18,11],X[1,9,2,10],X[12,10,13,11],X[8,2,9,3],X[3,15,4,14],X[15,5,16,4]]; 0.962698796 -0.214023305 -0.165544715 k0.1 + 1 PD[]; -0.34713863 0.730306468 -0.588342787 k0.1 + 1 PD[]; -0.220798883 -0.827465464 -0.516283603 k0.1 + 1 PD[]; 0.5824885 0.656957431 0.478658627 k0.1 + 1 PD[]; 0.0299882891 0.887749288 0.459349436 k0.1 + 1 PD[]; -0.226935881 0.972107202 0.0592257865 k0.1 + 1 PD[]; 0.22213542 0.920027899 -0.32280725 k0.1 + 1 PD[]; -0.50025345 0.227715059 -0.835399508 k0.1 + 1 PD[]; -0.987449997 -0.0148023247 0.157236746 k0.1 + 1 PD[]; -0.156583733 -0.51041782 0.845550226 k3.2m + A^(-2) + 1 - A^(2) - A^(4) + A^(8) PD[X[0,4,1,3],X[1,5,2,6],X[6,2,7,3],X[7,5,8,4]]; -0.523869809 -0.309818163 -0.793456444 k0.1 + 1 PD[X[0,2,1,3],X[1,4,2,3]]; -0.986204316 0.154963306 0.0582015528 k0.1 + 1 PD[]; -0.210635141 0.768550026 -0.604122252 k0.1 + 1 PD[]; -0.466783012 0.479923692 0.742823579 k0.1 + 1 PD[]; 0.920195354 0.390956031 -0.0198467448 k0.1 + 1 PD[]; 0.710960073 -0.417834849 -0.565641064 k0.1 + 1 PD[]; -0.303651629 0.288131473 -0.908171759 k0.1 + 1 PD[]; -0.547287582 0.831932467 -0.0914585828 k0.1 + 1 PD[]; 0.440911234 -0.320449352 0.83839698 k0.1 + 1 PD[]; 0.705613685 -0.674919399 0.215854425 k0.1 + 1 PD[]; -0.787923175 -0.59811945 0.146390554 k0.1 + 1 PD[]; -0.514134826 -0.463045359 -0.721979484 k0.1 + 1 PD[]; 0.809061614 0.530957737 0.251998388 k0.1 + 1 PD[X[2,0,3,1],X[3,2,4,1]]; -0.769015849 -0.122819252 0.62731974 k0.1 + 1 PD[]; 0.0533980927 0.995917527 0.0727799656 k0.1 + 1 PD[]; 0.121690374 -0.829976674 0.544362171 k0.1 + 1 PD[];