#projection.x projection.y projection.z knotoid_type polynomial PD_code 0.383285597 -0.922794461 0.0392751144 k0.1 + 1 PD[]; 0.485802683 0.533243823 0.69256536 k0.1 + 1 PD[]; 0.434604836 0.441782986 -0.784822546 k3.2 + A^(-8) - A^(-4) - A^(-2) + 1 + A^(2) PD[X[1,6,2,5],X[r[4],r[3],5,2],X[r[3],r[0],r[4],1]]; 0.141122569 0.963790738 0.226256126 k0.1 + 1 PD[]; 0.429419041 -0.745606389 -0.509578649 k0.1 + 1 PD[]; 0.49997413 -0.170593052 0.849072364 k0.1 + 1 PD[]; 0.894609588 0.279612243 -0.348555131 k2.1 - A^(-10) + A^(-6) + A^(-4) PD[X[r[2],r[1],3,0],X[r[1],r[4],r[2],3]]; -0.38854673 -0.00970289127 0.921377931 k0.1 + 1 PD[]; -0.345686699 -0.0067341926 0.938325827 k0.1 + 1 PD[]; -0.231414706 -0.0307514447 0.972369057 k0.1 + 1 PD[]; 0.0931737525 0.124409442 0.987846619 k0.1 + 1 PD[]; -0.722821337 0.669535594 -0.171030418 k0.1 + 1 PD[]; -0.95378798 0.272306049 -0.127035053 k0.1 + 1 PD[]; 0.109616961 -0.18528682 0.976551543 k0.1 + 1 PD[]; -0.852287822 -0.103580079 0.512714965 k0.1 + 1 PD[]; 0.413656889 -0.888994135 -0.196411321 k0.1 + 1 PD[]; -0.924502266 -0.37491314 -0.0688164053 k0.1 + 1 PD[]; -0.385269673 -0.470948861 0.793583297 k0.1 + 1 PD[]; -0.52129742 0.623389378 0.582781849 k0.1 + 1 PD[]; 0.743628275 -0.229634344 0.627921219 k0.1 + 1 PD[]; 0.569863747 -0.525179493 -0.63201409 k0.1 + 1 PD[]; -0.656626676 0.595738147 -0.462533748 k0.1 + 1 PD[]; 0.631383436 -0.674852286 0.382007 k0.1 + 1 PD[]; -0.641575482 0.765338297 -0.0513633257 k0.1 + 1 PD[]; 0.769541714 -0.17804014 0.613275843 k0.1 + 1 PD[]; 0.171336463 0.605282357 -0.777352613 k0.1 + 1 PD[]; 0.20988465 -0.962289818 0.173051265 k0.1 + 1 PD[]; 0.789988265 0.50247619 0.351334911 k0.1 + 1 PD[]; -0.0515606663 0.784591898 -0.617864913 k0.1 + 1 PD[]; -0.532336889 -0.803688623 -0.265898542 k0.1 + 1 PD[]; -0.749161956 -0.510947704 0.421531504 k0.1 + 1 PD[]; 0.604739624 -0.681039715 0.412886054 k0.1 + 1 PD[]; -0.211620153 0.671632386 0.710018907 k0.1 + 1 PD[]; 0.64568203 0.206107317 -0.735264912 k0.1 + 1 PD[]; -0.996197611 -0.0173286069 0.0853817211 k0.1 + 1 PD[]; 0.907930894 -0.190662995 0.373241362 k0.1 + 1 PD[]; -0.763410181 0.281802431 -0.581199007 k0.1 + 1 PD[]; -0.0524752008 -0.97854628 0.199232352 k0.1 + 1 PD[]; 0.408769747 -0.571854013 -0.711259644 k0.1 + 1 PD[]; -0.422374507 0.642741261 -0.639127098 k0.1 + 1 PD[]; 0.942112554 -0.292351932 0.164177597 k0.1 + 1 PD[]; 0.114960352 -0.426679787 0.897066595 k0.1 + 1 PD[]; 0.568945623 0.516802552 -0.63969993 k0.1 + 1 PD[]; -0.153015018 0.0243095764 0.987924819 k0.1 + 1 PD[]; 0.442959274 0.248598812 0.861385925 k0.1 + 1 PD[]; -0.195218142 -0.873897477 -0.445188811 k0.1 + 1 PD[]; 0.947708329 0.28955416 0.134191326 k0.1 + 1 PD[]; 0.732257388 0.250684723 -0.633211092 k0.1 + 1 PD[]; 0.139447576 0.980762914 0.136596046 k0.1 + 1 PD[]; -0.981266933 -0.191463851 -0.0213728743 k0.1 + 1 PD[]; -0.173111715 -0.0650303185 0.982752966 k0.1 + 1 PD[]; 0.255821889 0.205142156 0.944707287 k0.1 + 1 PD[]; -0.0875095644 -0.22596831 -0.970196062 k0.1 + 1 PD[]; -0.302963139 -0.853473495 -0.424023973 k0.1 + 1 PD[]; -0.743293489 -0.607088891 0.280994426 k0.1 + 1 PD[]; -0.217846232 0.620967917 0.75295542 k0.1 + 1 PD[]; -0.270300241 -0.898174173 0.346728908 k0.1 + 1 PD[]; -0.0597295125 0.92397042 0.37777116 k0.1 + 1 PD[]; 0.783708814 0.617785302 -0.0643569366 k0.1 + 1 PD[]; 0.815713412 -0.123087487 0.5652089 k0.1 + 1 PD[]; -0.826099904 0.0862328043 0.55688675 k0.1 + 1 PD[]; 0.587400731 0.601489629 -0.541452314 k0.1 + 1 PD[]; -0.278273047 0.79866617 -0.533569546 k0.1 + 1 PD[]; 0.920724531 0.373028382 0.114525826 k0.1 + 1 PD[]; -0.21066322 0.632996627 0.744940453 k0.1 + 1 PD[]; 0.368975686 0.546004114 0.752154539 k0.1 + 1 PD[]; -0.702653486 0.414077516 -0.578634503 k0.1 + 1 PD[]; -0.629640783 -0.767875886 0.117979271 k0.1 + 1 PD[]; -0.699267792 0.469931338 -0.538692019 k0.1 + 1 PD[]; 0.601658106 0.369604937 -0.708095837 k0.1 + 1 PD[]; -0.073508436 -0.90326031 -0.422749715 k0.1 + 1 PD[]; -0.433312784 0.61728184 -0.656660614 k0.1 + 1 PD[]; 0.391841499 -0.918700711 -0.0494898367 k0.1 + 1 PD[]; 0.974441047 0.175844423 0.139797657 k0.1 + 1 PD[]; -0.461802705 -0.848158211 -0.259549438 k0.1 + 1 PD[]; 0.910981089 -0.174944855 0.373507367 k0.1 + 1 PD[]; -0.15463011 0.187616741 -0.969994581 k0.1 + 1 PD[]; 0.778821587 0.0266463782 0.626679269 k0.1 + 1 PD[]; 0.723017436 -0.570844478 0.389078872 k0.1 + 1 PD[]; 0.143690108 0.791709856 -0.593758079 k0.1 + 1 PD[]; 0.868301433 -0.00267057998 -0.496029726 k0.1 + 1 PD[]; -0.639456696 -0.0504330273 0.767171196 k2.1 - A^(-10) + A^(-6) + A^(-4) PD[X[4,1,5,0],X[1,4,r[2],r[3]],X[5,r[3],r[6],r[2]]]; -0.105459079 -0.792198632 0.601082116 k0.1 + 1 PD[]; -0.929636112 -0.306463402 -0.204589545 k0.1 + 1 PD[]; 0.571196538 0.696925401 -0.433623685 k0.1 + 1 PD[]; 0.496704568 -0.630288168 -0.596675287 k0.1 + 1 PD[]; -0.314134609 0.874357754 -0.369889126 k0.1 + 1 PD[]; -0.292938594 -0.268891598 -0.917542527 k0.1 + 1 PD[]; -0.361301304 0.0414203461 -0.931528702 k0.1 + 1 PD[]; -0.320102579 -0.569847396 0.75684099 k0.1 + 1 PD[X[r[2],0,3,r[1]],X[3,r[2],r[4],r[1]]]; -0.0963815162 0.564963839 -0.819467183 k0.1 + 1 PD[]; 0.174277517 -0.631554642 -0.755490623 k0.1 + 1 PD[]; -0.157896673 0.658162102 -0.736132656 k1.1m - A^(2)*v - A^(4) PD[X[0,r[1],r[1],2]]; -0.328622576 0.302324844 0.894766389 k0.1 + 1 PD[]; 0.506737229 0.346426468 -0.789434027 k0.1 + 1 PD[]; -0.589337277 0.423328634 -0.688094791 k0.1 + 1 PD[]; -0.824880286 0.228533365 -0.51705417 k0.1 + 1 PD[]; -0.578430591 -0.709852938 -0.401904041 k0.1 + 1 PD[]; -0.80866345 -0.267903258 0.52372824 k0.1 + 1 PD[]; -0.903598559 -0.106616292 0.414900723 k2.1 - A^(-10) + A^(-6) + A^(-4) PD[X[0,3,r[1],r[2]],X[3,r[2],r[4],r[1]]];