  
  [1X32 [33X[0;0YKnots and Quandles[133X[101X
  
      │                       Knots                       
      │        [10XPresentationKnotQuandle(gaussCode) [110X        
      │                     [10XPD2GC(PD) [110X                    
      │              [10XPlanarDiagramKnot(n,k) [110X              
      │                [10XGaussCodeKnot(n,k) [110X                
      │         [10XPresentationKnotQuandleKnot(n,k) [110X         
      │      [10XNumberOfHomomorphisms(genRelQ,finiteQ) [110X      
      │ [10XPartitionedNumberOfHomomorphisms(genRelQ,finiteQ) [110X
      │                      Quandles                     
      │              [10XConjugationQuandle(G,n) [110X             
      │          [10XFirstQuandleAxiomIsSatisfied(M) [110X         
      │                   [10X IsQuandle(M) [110X                  
      │                    [10XQuandles(n) [110X                   
      │                   [10X Quandle(n,k) [110X                  
      │                   [10XIdQuandle(Q) [110X                   
      │                    [10XIsLatin(Q) [110X                    
      │               [10XIsConnectedQuandle(Q) [110X              
      │               [10XConnectedQuandles(n) [110X               
      │               [10XConnectedQuandle(n,k) [110X              
      │               [10XIdConnectedQuandle(Q) [110X              
      │          [10XIsQuandleEnvelope(Q,G,e,stigma) [110X         
      │      [10X QuandleQuandleEnveloppe(Q,G,e,stigma) [110X      
      │         [10X KnotInvariantCedric(genRelQ,n,m) [110X        
      │         [10XRightMultiplicationGroupAsPerm(Q) [110X        
      │            [10XRightMultiplicationGroup(Q) [110X           
      │         [10XAutomorphismGroupQuandleAsPerm(Q) [110X        
      │            [10XAutomorphismGroupQuandle(Q)[110X            
  
