Site Map Polytopes Dynkin Diagrams Vertex Figures, etc. Incidence Matrices Index

---- 5D ----

This page is available sorted by point-group symmetry (below)
or by complexity (older version).


Terse Overview of Irreduzible Dynkin Graph Types

(For obvious reasons only the existing 4D graph types, which exist as subgroups in 5D as well, have to be extended here.)

Linear Tridental Loop & Tail
                             
                             
                             
  o--P--o--Q--o--R--o--S--o  
                             
                             
                             
 o-P-o-Q-o *b-R-o-S-o  = 
                         
  o_                     
     -P_                 
         >o--R--o--S--o  
     _Q-                 
  o-                     
 o-P-o-Q-o-R-o-S-o-T-*c  = 
                           
                     _o    
                 _R-  |    
  o--P--o--Q--o<      | S  
                 -T_  |    
                     -o    
 o-P-o-Q-o-R-o-S-o-T-*b  = 
                           
    o---P---o---Q---o      
            |       |      
            T       R      
            |       |      
            o---S---o      
Two Armed Two Legged Prolate Crossed Rhomb & Tail Oblate Crossed Rhomb & Tail
 o-P-o-Q-o-R-o *b-S-o-T-*c  = 
                              
     o--P--o--Q--o--R--o      
            \   /             
           S \ / T            
              o               
                              
  o-P-o-Q-o-R-o-S-*b-T-o  = 
                            
    o_             _o       
       -P_     _Q-  |       
           >o<      | R     
       _T-     -S_  |       
    o-             -o       
 o-P-o-Q-o-R-o-S-o-T-*b *c-U-*e  = 
                                   
      o---P---o---Q---o            
               \     / \           
                T   U   R          
                 \ /     \         
                  o---S---o        
 o-P-o-Q-o-R-o-S-o-T-*b-U-*d  = 
                                
      o---Q---o---P---o         
       \     / \                
        R   U   T               
         \ /     \              
          o---S---o             
Bowtie Loop House Three Looped
 o-P-o-Q-o-R-*a-S-o-T-o-U-*a  =
                               
       o_             _o       
       |  -P_     _U-  |       
     Q |      >o<      | T     
       |  _R-     -S_  |       
       o-             -o       
 o-P-o-Q-o-R-o-S-o-T-*a  =  
            _o_             
        _T-     -P_         
     o-             -o      
      \             /       
       S           Q        
        \         /         
         o---R---o          
 o-P-o-Q-o-R-o-S-o-T-*a-U-*c  = 
                                
      o---T---o_                
      |       |  -P_            
      S       U      >o         
      |       |  _Q-            
      o---R---o                 
 o-P-o-Q-o-R-*a-S-o-T-o-U-*a *c-V-*e =
                                      
          o---P---o---U---o           
           \     / \     /            
            Q   R   S   T             
             \ /     \ /              
              o---V---o               
Tetrahedron & Tail Others
 o-P-o-Q-o-R-o-S-o-T-*b-U-*d *c-V-*e =
                           _o         
                        _- /|         
                    _Q-   R |         
                 _-     /   |         
      o---P---o<---U---o    V         
                 -_     \   |         
                    -T_   S |         
                        -_ \|         
                           -o         

In the following symmetry listings "etc." means replacments according to 33/2, to 44/3, to 55/4, or to 5/25/3.

Polytera with Grünbaumian elements so far are not investigated any further. Those are Grünbaumian a priori, usually because of some subgraph -x-n/d-x-, where d is even. Others, which come out as being Grünbaumian a posteriori will be given none the less.




linear ones
o-P-o-Q-o-R-o-S-o

Within spherical symmetry this type of Dynkin diagrams only allows for Q and R being 3 or 3/2 only. Furthermore at most one out of P and S could be 4 or 4/3, elsewise the remaining other or both ought be from 3 or 3/2.


Hexateral Symmetries   (up)

o3o3o3o3o (convex) o3o3o3o3/2o o3o3o3/2o3o o3o3o3/2o3/2o
x3o3o3o3o - hix
o3x3o3o3o - rix
o3o3x3o3o - dot



x3x3o3o3o - tix
x3o3x3o3o - sarx
x3o3o3x3o - spix
x3o3o3o3x - scad
o3x3x3o3o - bittix
o3x3o3x3o - sibrid





x3x3x3o3o - garx
x3x3o3x3o - pattix
x3x3o3o3x - cappix
x3o3x3x3o - pirx
x3o3x3o3x - card

o3x3x3x3o - gibrid




x3x3x3x3o - gippix
x3x3x3o3x - cograx
x3x3o3x3x - captid



x3x3x3x3x - gocad
x3o3o3o3/2o - hix
o3x3o3o3/2o - rix
o3o3x3o3/2o - dot
o3o3o3x3/2o - rix
o3o3o3o3/2x - hix

x3x3o3o3/2o - tix
x3o3x3o3/2o - sarx
x3o3o3x3/2o - spix
x3o3o3o3/2x - "2firx"
o3x3x3o3/2o - bittix
o3x3o3x3/2o - sibrid
o3x3o3o3/2x - (contains "2firp")
o3o3x3x3/2o - bittix
o3o3x3o3/2x - (contains "2thah")
o3o3o3x3/2x - [Grünbaumian]

x3x3x3o3/2o - garx
x3x3o3x3/2o - pattix
x3x3o3o3/2x - (contains "2firp")
x3o3x3x3/2o - pirx
x3o3x3o3/2x - (contains "2thah")
x3o3o3x3/2x - [Grünbaumian]
o3x3x3x3/2o - gibrid
o3x3x3o3/2x - (contains "2thah")
o3x3o3x3/2x - [Grünbaumian]
o3o3x3x3/2x - [Grünbaumian]

x3x3x3x3/2o - gippix
x3x3x3o3/2x - (contains "2thah")
x3x3o3x3/2x - [Grünbaumian]
x3o3x3x3/2x - [Grünbaumian]
o3x3x3x3/2x - [Grünbaumian]

x3x3x3x3/2x - [Grünbaumian]
x3o3o3/2o3o - hix
o3x3o3/2o3o - rix
o3o3x3/2o3o - dot
o3o3o3/2x3o - rix
o3o3o3/2o3x - hix

x3x3o3/2o3o - tix
x3o3x3/2o3o - sarx
x3o3o3/2x3o - (contains "2firp")
x3o3o3/2o3x - "2firx"
o3x3x3/2o3o - bittix
o3x3o3/2x3o - (contains "2thah")
o3x3o3/2o3x - (contains "2firp")
o3o3x3/2x3o - [Grünbaumian]
o3o3x3/2o3x - (contains "2thah")
o3o3o3/2x3x - tix

x3x3x3/2o3o - garx
x3x3o3/2x3o - (contains "2thah")
x3x3o3/2o3x - (contains "2firp")
x3o3x3/2x3o - [Grünbaumian]
x3o3x3/2o3x - (contains "2thah")
x3o3o3/2x3x - (contains "2firp")
o3x3x3/2x3o - [Grünbaumian]
o3x3x3/2o3x - (contains "2thah")
o3x3o3/2x3x - (contains "2thah")
o3o3x3/2x3x - [Grünbaumian]

x3x3x3/2x3o - [Grünbaumian]
x3x3x3/2o3x - (contains "2thah")
x3x3o3/2x3x - (contains "2thah")
x3o3x3/2x3x - [Grünbaumian]
o3x3x3/2x3x - [Grünbaumian]

x3x3x3/2x3x - [Grünbaumian]
x3o3o3/2o3/2o - hix
o3x3o3/2o3/2o - rix
o3o3x3/2o3/2o - dot
o3o3o3/2x3/2o - rix
o3o3o3/2o3/2x - hix

x3x3o3/2o3/2o - tix
x3o3x3/2o3/2o - sarx
x3o3o3/2x3/2o - (contains "2firp")
x3o3o3/2o3/2x - scad
o3x3x3/2o3/2o - bittix
o3x3o3/2x3/2o - (contains "2thah")
o3x3o3/2o3/2x - spix
o3o3x3/2x3/2o - [Grünbaumian]
o3o3x3/2o3/2x - sarx
o3o3o3/2x3/2x - [Grünbaumian]

x3x3x3/2o3/2o - garx
x3x3o3/2x3/2o - (contains "2thah")
x3x3o3/2o3/2x - cappix
x3o3x3/2x3/2o - [Grünbaumian]
x3o3x3/2o3/2x - card
x3o3o3/2x3/2x - [Grünbaumian]
o3x3x3/2x3/2o - [Grünbaumian]
o3x3x3/2o3/2x - pirx
o3x3o3/2x3/2x - [Grünbaumian]
o3o3x3/2x3/2x - [Grünbaumian]

x3x3x3/2x3/2o - [Grünbaumian]
x3x3x3/2o3/2x - cograx
x3x3o3/2x3/2x - [Grünbaumian]
x3o3x3/2x3/2x - [Grünbaumian]
o3x3x3/2x3/2x - [Grünbaumian]

x3x3x3/2x3/2x - [Grünbaumian]
o3o3/2o3o3/2o o3o3/2o3/2o3o o3o3/2o3/2o3/2o o3/2o3o3o3/2o
x3o3/2o3o3/2o - hix
o3x3/2o3o3/2o - rix
o3o3/2x3o3/2o - dot
o3o3/2o3x3/2o - rix
o3o3/2o3o3/2x - hix

x3x3/2o3o3/2o - tix
x3o3/2x3o3/2o - (contains "2thah")
x3o3/2o3x3/2o - (contains "2firp")
x3o3/2o3o3/2x - scad
o3x3/2x3o3/2o - [Grünbaumian]
o3x3/2o3x3/2o - (contains "2thah")
o3x3/2o3o3/2x - spix
o3o3/2x3x3/2o - bittix
o3o3/2x3o3/2x - (contains "2thah")
o3o3/2o3x3/2x - [Grünbaumian]

x3x3/2x3o3/2o - [Grünbaumian]
x3x3/2o3x3/2o - (contains "2thah")
x3x3/2o3o3/2x - cappix
x3o3/2x3x3/2o - (contains "2thah")
x3o3/2x3o3/2x - (contains "2thah")
x3o3/2o3x3/2x - [Grünbaumian]
o3x3/2x3x3/2o - [Grünbaumian]
o3x3/2x3o3/2x - [Grünbaumian]
o3x3/2o3x3/2x - [Grünbaumian]
o3o3/2x3x3/2x - [Grünbaumian]

x3x3/2x3x3/2o - [Grünbaumian]
x3x3/2x3o3/2x - [Grünbaumian]
x3x3/2o3x3/2x - [Grünbaumian]
x3o3/2x3x3/2x - [Grünbaumian]
o3x3/2x3x3/2x - [Grünbaumian]

x3x3/2x3x3/2x - [Grünbaumian]
x3o3/2o3/2o3o - hix
o3x3/2o3/2o3o - rix
o3o3/2x3/2o3o - dot



x3x3/2o3/2o3o - tix
x3o3/2x3/2o3o - (contains "2thah")
x3o3/2o3/2x3o - spix
x3o3/2o3/2o3x - scad
o3x3/2x3/2o3o - [Grünbaumian]
o3x3/2o3/2x3o - sibrid
o3o3/2x3/2x3o - [Grünbaumian]




x3x3/2x3/2o3o - [Grünbaumian]
x3x3/2o3/2x3o - pattix
x3x3/2o3/2o3x - cappix)
x3o3/2x3/2x3o - [Grünbaumian]
x3o3/2x3/2o3x - (contains "2thah")

o3x3/2x3/2x3o - [Grünbaumian]




x3x3/2x3/2x3o - [Grünbaumian]
x3x3/2x3/2o3x - [Grünbaumian]
x3x3/2o3/2x3x - captid



x3x3/2x3/2x3x - [Grünbaumian]
x3o3/2o3/2o3/2o - hix
o3x3/2o3/2o3/2o - rix
o3o3/2x3/2o3/2o - dot
o3o3/2o3/2x3/2o - rix
o3o3/2o3/2o3/2x - hix

x3x3/2o3/2o3/2o - tix
x3o3/2x3/2o3/2o - (contains "2thah")
x3o3/2o3/2x3/2o - spix
x3o3/2o3/2o3/2x - "2firx"
o3x3/2x3/2o3/2o - [Grünbaumian]
o3x3/2o3/2x3/2o - sibrid
o3x3/2o3/2o3/2x - (contains "2firp")
o3o3/2x3/2x3/2o - [Grünbaumian]
o3o3/2x3/2o3/2x - sarx
o3o3/2o3/2x3/2x - [Grünbaumian]

x3x3/2x3/2o3/2o - [Grünbaumian]
x3x3/2o3/2x3/2o - pattix)
x3x3/2o3/2o3/2x - (contains "2firp")
x3o3/2x3/2x3/2o - [Grünbaumian]
x3o3/2x3/2o3/2x - (contains "2thah")
x3o3/2o3/2x3/2x - [Grünbaumian]
o3x3/2x3/2x3/2o - [Grünbaumian]
o3x3/2x3/2o3/2x - [Grünbaumian]
o3x3/2o3/2x3/2x - [Grünbaumian]
o3o3/2x3/2x3/2x - [Grünbaumian]

x3x3/2x3/2x3/2o - [Grünbaumian]
x3x3/2x3/2o3/2x - [Grünbaumian]
x3x3/2o3/2x3/2x - [Grünbaumian]
x3o3/2x3/2x3/2x - [Grünbaumian]
o3x3/2x3/2x3/2x - [Grünbaumian]

x3x3/2x3/2x3/2x - [Grünbaumian]
x3/2o3o3o3/2o - hix
o3/2x3o3o3/2o - rix
o3/2o3x3o3/2o - dot



x3/2x3o3o3/2o - [Grünbaumian]
x3/2o3x3o3/2o - (contains "2thah")
x3/2o3o3x3/2o - (contains "2firp")
x3/2o3o3o3/2x - "2firx"
o3/2x3x3o3/2o - bittix
o3/2x3o3x3/2o - sibrid





x3/2x3x3o3/2o - [Grünbaumian]
x3/2x3o3x3/2o - [Grünbaumian]
x3/2x3o3o3/2x - [Grünbaumian]
x3/2o3x3x3/2o - (contains "2thah")
x3/2o3x3o3/2x - (contains "2thah")

o3/2x3x3x3/2o - gibrid




x3/2x3x3x3/2o - [Grünbaumian]
x3/2x3x3o3/2x - [Grünbaumian]
x3/2x3o3x3/2x - [Grünbaumian]



x3/2x3x3x3/2x - [Grünbaumian]
o3/2o3o3/2o3o o3/2o3o3/2o3/2o o3/2o3/2o3/2o3o o3/2o3/2o3/2o3/2o
x3/2o3o3/2o3o - hix
o3/2x3o3/2o3o - rix
o3/2o3x3/2o3o - dot
o3/2o3o3/2x3o - rix
o3/2o3o3/2o3x - hix

x3/2x3o3/2o3o - [Grünbaumian]
x3/2o3x3/2o3o - (contains "2thah")
x3/2o3o3/2x3o - spix
x3/2o3o3/2o3x - scad
o3/2x3x3/2o3o - bittix
o3/2x3o3/2x3o - (contains "2thah")
o3/2x3o3/2o3x - (contains "2firp")
o3/2o3x3/2x3o - [Grünbaumian]
o3/2o3x3/2o3x - (contains "2thah")
o3/2o3o3/2x3x - tix

x3/2x3x3/2o3o - [Grünbaumian]
x3/2x3o3/2x3o - [Grünbaumian]
x3/2x3o3/2o3x - [Grünbaumian]
x3/2o3x3/2x3o - [Grünbaumian]
x3/2o3x3/2o3x - (contains "2thah")
x3/2o3o3/2x3x - cappix
o3/2x3x3/2x3o - [Grünbaumian]
o3/2x3x3/2o3x - (contains "2thah")
o3/2x3o3/2x3x - (contains "2thah")
o3/2o3x3/2x3x - [Grünbaumian]

x3/2x3x3/2x3o - [Grünbaumian]
x3/2x3x3/2o3x - [Grünbaumian]
x3/2x3o3/2x3x - [Grünbaumian]
x3/2o3x3/2x3x - [Grünbaumian]
o3/2x3x3/2x3x - [Grünbaumian]

x3/2x3x3/2x3x - [Grünbaumian]
x3/2o3o3/2o3/2o - hix
o3/2x3o3/2o3/2o - rix
o3/2o3x3/2o3/2o - dot
o3/2o3o3/2x3/2o - rix
o3/2o3o3/2o3/2x - hix

x3/2x3o3/2o3/2o - [Grünbaumian]
x3/2o3x3/2o3/2o - (contains "2thah")
x3/2o3o3/2x3/2o - spix
x3/2o3o3/2o3/2x - "2firx"
o3/2x3x3/2o3/2o - bittix
o3/2x3o3/2x3/2o - (contains "2thah")
o3/2x3o3/2o3/2x - spix
o3/2o3x3/2x3/2o - [Grünbaumian]
o3/2o3x3/2o3/2x - sarx
o3/2o3o3/2x3/2x - [Grünbaumian]

x3/2x3x3/2o3/2o - [Grünbaumian]
x3/2x3o3/2x3/2o - [Grünbaumian]
x3/2x3o3/2o3/2x - [Grünbaumian]
x3/2o3x3/2x3/2o - [Grünbaumian]
x3/2o3x3/2o3/2x - (contains "2thah")
x3/2o3o3/2x3/2x - [Grünbaumian]
o3/2x3x3/2x3/2o - [Grünbaumian]
o3/2x3x3/2o3/2x - pirx
o3/2x3o3/2x3/2x - [Grünbaumian]
o3/2o3x3/2x3/2x - [Grünbaumian]

x3/2x3x3/2x3/2o - [Grünbaumian]
x3/2x3x3/2o3/2x - [Grünbaumian]
x3/2x3o3/2x3/2x - [Grünbaumian]
x3/2o3x3/2x3/2x - [Grünbaumian]
o3/2x3x3/2x3/2x - [Grünbaumian]

x3/2x3x3/2x3/2x - [Grünbaumian]
x3/2o3/2o3/2o3o - hix
o3/2x3/2o3/2o3o - rix
o3/2o3/2x3/2o3o - dot
o3/2o3/2o3/2x3o - rix
o3/2o3/2o3/2o3x - hix

x3/2x3/2o3/2o3o - [Grünbaumian]
x3/2o3/2x3/2o3o - sarx
x3/2o3/2o3/2x3o - (contains "2firp")
x3/2o3/2o3/2o3x - "2firx"
o3/2x3/2x3/2o3o - [Grünbaumian]
o3/2x3/2o3/2x3o - sibrid
o3/2x3/2o3/2o3x - spix
o3/2o3/2x3/2x3o - [Grünbaumian]
o3/2o3/2x3/2o3x - (contains "2thah")
o3/2o3/2o3/2x3x - tix

x3/2x3/2x3/2o3o - [Grünbaumian]
x3/2x3/2o3/2x3o - [Grünbaumian]
x3/2x3/2o3/2o3x - [Grünbaumian]
x3/2o3/2x3/2x3o - [Grünbaumian]
x3/2o3/2x3/2o3x - (contains "2thah")
x3/2o3/2o3/2x3x - (contains "2firp")
o3/2x3/2x3/2x3o - [Grünbaumian]
o3/2x3/2x3/2o3x - [Grünbaumian]
o3/2x3/2o3/2x3x - pattix
o3/2o3/2x3/2x3x - [Grünbaumian]

x3/2x3/2x3/2x3o - [Grünbaumian]
x3/2x3/2x3/2o3x - [Grünbaumian]
x3/2x3/2o3/2x3x - [Grünbaumian]
x3/2o3/2x3/2x3x - [Grünbaumian]
o3/2x3/2x3/2x3x - [Grünbaumian]

x3/2x3/2x3/2x3x - [Grünbaumian]
x3/2o3/2o3/2o3/2o - hix
o3/2x3/2o3/2o3/2o - rix
o3/2o3/2x3/2o3/2o - dot



x3/2x3/2o3/2o3/2o - [Grünbaumian]
x3/2o3/2x3/2o3/2o - sarx
x3/2o3/2o3/2x3/2o - (contains "2firp")
x3/2o3/2o3/2o3/2x - scad
o3/2x3/2x3/2o3/2o - [Grünbaumian]
o3/2x3/2o3/2x3/2o - sibrid





x3/2x3/2x3/2o3/2o - [Grünbaumian]
x3/2x3/2o3/2x3/2o - [Grünbaumian]
x3/2x3/2o3/2o3/2x - [Grünbaumian]
x3/2o3/2x3/2x3/2o - [Grünbaumian]
x3/2o3/2x3/2o3/2x - card

o3/2x3/2x3/2x3/2o - [Grünbaumian]




x3/2x3/2x3/2x3/2o - [Grünbaumian]
x3/2x3/2x3/2o3/2x - [Grünbaumian]
x3/2x3/2o3/2x3/2x - [Grünbaumian]



x3/2x3/2x3/2x3/2x - [Grünbaumian]

Penteractic Symmetries   (up)

o3o3o3o4o (convex) o3o3o3o4/3o o3o3o3/2o4o o3o3o3/2o4/3o
x3o3o3o4o - tac
o3x3o3o4o - rat
o3o3x3o4o - nit
o3o3o3x4o - rin
o3o3o3o4x - pent

x3x3o3o4o - tot
x3o3x3o4o - sart
x3o3o3x4o - spat
x3o3o3o4x - scant
o3x3x3o4o - bittit
o3x3o3x4o - sibrant
o3x3o3o4x - span
o3o3x3x4o - bittin
o3o3x3o4x - sirn
o3o3o3x4x - tan

x3x3x3o4o - gart
x3x3o3x4o - pattit
x3x3o3o4x - cappin
x3o3x3x4o - pirt
x3o3x3o4x - carnit
x3o3o3x4x - capt
o3x3x3x4o - gibrant
o3x3x3o4x - prin
o3x3o3x4x - pattin
o3o3x3x4x - girn

x3x3x3x4o - gippit
x3x3x3o4x - cogart
x3x3o3x4x - captint
x3o3x3x4x - cogrin
o3x3x3x4x - gippin

x3x3x3x4x - gacnet
x3o3o3o4/3o - tac
o3x3o3o4/3o - rat
o3o3x3o4/3o - nit
o3o3o3x4/3o - rin
o3o3o3o4/3x - pent

x3x3o3o4/3o - tot
x3o3x3o4/3o - sart
x3o3o3x4/3o - spat
x3o3o3o4/3x - quacant
o3x3x3o4/3o - bittit
o3x3o3x4/3o - sibrant
o3x3o3o4/3x - quappin
o3o3x3x4/3o - bittin
o3o3x3o4/3x - quarn
o3o3o3x4/3x - quittin

x3x3x3o4/3o - gart
x3x3o3x4/3o - pattit
x3x3o3o4/3x - caquapin
x3o3x3x4/3o - pirt
x3o3x3o4/3x - quacrant
x3o3o3x4/3x - quacpot
o3x3x3x4/3o - gibrant
o3x3x3o4/3x - quiprin
o3x3o3x4/3x - quiptin
o3o3x3x4/3x - gaqrin

x3x3x3x4/3o - gippit
x3x3x3o4/3x - quicgrat
x3x3o3x4/3x - quicpatint
x3o3x3x4/3x - quacgarn
o3x3x3x4/3x - gaquapan

x3x3x3x4/3x - gaquacint
x3o3o3/2o4o - tac
o3x3o3/2o4o - rat
o3o3x3/2o4o - nit
o3o3o3/2x4o - rin
o3o3o3/2o4x - pent

x3x3o3/2o4o - tot
x3o3x3/2o4o - sart
x3o3o3/2x4o - (contains "2firp")
x3o3o3/2o4x - quacant
o3x3x3/2o4o - bittit
o3x3o3/2x4o - (contains "2thah")
o3x3o3/2o4x - quappin
o3o3x3/2x4o - [Grünbaumian]
o3o3x3/2o4x - quarn
o3o3o3/2x4x - tan

x3x3x3/2o4o - gart
x3x3o3/2x4o - (contains "2thah")
x3x3o3/2o4x - caquapin
x3o3x3/2x4o - [Grünbaumian]
x3o3x3/2o4x - quacrant
x3o3o3/2x4x - (contains "2firp")
o3x3x3/2x4o - [Grünbaumian]
o3x3x3/2o4x - quiprin
o3x3o3/2x4x - (contains "2thah")
o3o3x3/2x4x - [Grünbaumian]

x3x3x3/2x4o - [Grünbaumian]
x3x3x3/2o4x - quicgrat
x3x3o3/2x4x - (contains "2thah")
x3o3x3/2x4x - [Grünbaumian]
o3x3x3/2x4x - [Grünbaumian]

x3x3x3/2x4x - [Grünbaumian]
x3o3o3/2o4/3o - tac
o3x3o3/2o4/3o - rat
o3o3x3/2o4/3o - nit
o3o3o3/2x4/3o - rin
o3o3o3/2o4/3x - pent

x3x3o3/2o4/3o - tot
x3o3x3/2o4/3o - sart
x3o3o3/2x4/3o - (contains "2firp")
x3o3o3/2o4/3x - scant
o3x3x3/2o4/3o - bittit
o3x3o3/2x4/3o - (contains "2thah")
o3x3o3/2o4/3x - span
o3o3x3/2x4/3o - [Grünbaumian]
o3o3x3/2o4/3x - sirn
o3o3o3/2x4/3x - quittin

x3x3x3/2o4/3o - gart
x3x3o3/2x4/3o - (contains "2thah")
x3x3o3/2o4/3x - cappin
x3o3x3/2x4/3o - [Grünbaumian]
x3o3x3/2o4/3x - carnit
x3o3o3/2x4/3x - (contains "2firp")
o3x3x3/2x4/3o - [Grünbaumian]
o3x3x3/2o4/3x - prin
o3x3o3/2x4/3x - (contains "2thah")
o3o3x3/2x4/3x - [Grünbaumian]

x3x3x3/2x4/3o - [Grünbaumian]
x3x3x3/2o4/3x - cogart
x3x3o3/2x4/3x - (contains "2thah")
x3o3x3/2x4/3x - [Grünbaumian]
o3x3x3/2x4/3x - [Grünbaumian]

x3x3x3/2x4/3x - [Grünbaumian]
o3o3/2o3o4o o3o3/2o3o4/3o o3o3/2o3/2o4o o3o3/2o3/2o4/3o
x3o3/2o3o4o - tac
o3x3/2o3o4o - rat
o3o3/2x3o4o - nit
o3o3/2o3x4o - rin
o3o3/2o3o4x - pent

x3x3/2o3o4o - tot
x3o3/2x3o4o - (contains "2thah")
x3o3/2o3x4o - (contains "2firp")
x3o3/2o3o4x - quacant
o3x3/2x3o4o - [Grünbaumian]
o3x3/2o3x4o - (contains "2thah")
o3x3/2o3o4x - quappin
o3o3/2x3x4o - bittin
o3o3/2x3o4x - sirn
o3o3/2o3x4x - tan

x3x3/2x3o4o - [Grünbaumian]
x3x3/2o3x4o - (contains "2thah")
x3x3/2o3o4x - caquapin
x3o3/2x3x4o - (contains "2thah")
x3o3/2x3o4x - (contains "2thah")
x3o3/2o3x4x - (contains "2firp")
o3x3/2x3x4o - [Grünbaumian]
o3x3/2x3o4x - [Grünbaumian]
o3x3/2o3x4x - (contains "2thah")
o3o3/2x3x4x - girn

x3x3/2x3x4o - [Grünbaumian]
x3x3/2x3o4x - [Grünbaumian]
x3x3/2o3x4x - (contains "2thah")
x3o3/2x3x4x - (contains "2thah")
o3x3/2x3x4x - [Grünbaumian]

x3x3/2x3x4x - [Grünbaumian]
x3o3/2o3o4/3o - tac
o3x3/2o3o4/3o - rat
o3o3/2x3o4/3o - nit
o3o3/2o3x4/3o - rin
o3o3/2o3o4/3x - pent

x3x3/2o3o4/3o - tot
x3o3/2x3o4/3o - (contains "2thah")
x3o3/2o3x4/3o - (contains "2firp")
x3o3/2o3o4/3x - scant
o3x3/2x3o4/3o - [Grünbaumian]
o3x3/2o3x4/3o - (contains "2thah")
o3x3/2o3o4/3x - span
o3o3/2x3x4/3o - bittin
o3o3/2x3o4/3x - quarn
o3o3/2o3x4/3x - quittin

x3x3/2x3o4/3o - [Grünbaumian]
x3x3/2o3x4/3o - (contains "2thah")
x3x3/2o3o4/3x - cappin
x3o3/2x3x4/3o - (contains "2thah")
x3o3/2x3o4/3x - (contains "2thah")
x3o3/2o3x4/3x - (contains "2firp")
o3x3/2x3x4/3o - [Grünbaumian]
o3x3/2x3o4/3x - [Grünbaumian]
o3x3/2o3x4/3x - (contains "2thah")
o3o3/2x3x4/3x - gaqrin

x3x3/2x3x4/3o - [Grünbaumian]
x3x3/2x3o4/3x - [Grünbaumian]
x3x3/2o3x4/3x - (contains "2thah")
x3o3/2x3x4/3x - (contains "2thah")
o3x3/2x3x4/3x - [Grünbaumian]

x3x3/2x3x4/3x - [Grünbaumian]
x3o3/2o3/2o4o - tac
o3x3/2o3/2o4o - rat
o3o3/2x3/2o4o - nit
o3o3/2o3/2x4o - rin
o3o3/2o3/2o4x - pent

x3x3/2o3/2o4o - tot
x3o3/2x3/2o4o - (contains "2thah")
x3o3/2o3/2x4o - spat
x3o3/2o3/2o4x - scant
o3x3/2x3/2o4o - [Grünbaumian]
o3x3/2o3/2x4o - sibrant
o3x3/2o3/2o4x - span
o3o3/2x3/2x4o - [Grünbaumian]
o3o3/2x3/2o4x - quarn
o3o3/2o3/2x4x - tan

x3x3/2x3/2o4o - [Grünbaumian]
x3x3/2o3/2x4o - pattit
x3x3/2o3/2o4x - cappin
x3o3/2x3/2x4o - [Grünbaumian]
x3o3/2x3/2o4x - (contains "2thah")
x3o3/2o3/2x4x - capt
o3x3/2x3/2x4o - [Grünbaumian]
o3x3/2x3/2o4x - [Grünbaumian]
o3x3/2o3/2x4x - pattin
o3o3/2x3/2x4x - [Grünbaumian]

x3x3/2x3/2x4o - [Grünbaumian]
x3x3/2x3/2o4x - [Grünbaumian]
x3x3/2o3/2x4x - captint
x3o3/2x3/2x4x - [Grünbaumian]
o3x3/2x3/2x4x - [Grünbaumian]

x3x3/2x3/2x4x - [Grünbaumian]
x3o3/2o3/2o4/3o - tac
o3x3/2o3/2o4/3o - rat
o3o3/2x3/2o4/3o - nit
o3o3/2o3/2x4/3o - rin
o3o3/2o3/2o4/3x - pent

x3x3/2o3/2o4/3o - tot
x3o3/2x3/2o4/3o - (contains "2thah")
x3o3/2o3/2x4/3o - spat
x3o3/2o3/2o4/3x - quacant
o3x3/2x3/2o4/3o - [Grünbaumian]
o3x3/2o3/2x4/3o - sibrant
o3x3/2o3/2o4/3x - quappin
o3o3/2x3/2x4/3o - [Grünbaumian]
o3o3/2x3/2o4/3x - sirn
o3o3/2o3/2x4/3x - quittin

x3x3/2x3/2o4/3o - [Grünbaumian]
x3x3/2o3/2x4/3o - pattit
x3x3/2o3/2o4/3x - caquapin
x3o3/2x3/2x4/3o - [Grünbaumian]
x3o3/2x3/2o4/3x - (contains "2thah")
x3o3/2o3/2x4/3x - quacpot
o3x3/2x3/2x4/3o - [Grünbaumian]
o3x3/2x3/2o4/3x - [Grünbaumian]
o3x3/2o3/2x4/3x - quiptin
o3o3/2x3/2x4/3x - [Grünbaumian]

x3x3/2x3/2x4/3o - [Grünbaumian]
x3x3/2x3/2o4/3x - [Grünbaumian]
x3x3/2o3/2x4/3x - quicpatint
x3o3/2x3/2x4/3x - [Grünbaumian]
o3x3/2x3/2x4/3x - [Grünbaumian]

x3x3/2x3/2x4/3x - [Grünbaumian]
o3/2o3o3o4o o3/2o3o3o4/3o o3/2o3o3/2o4o o3/2o3o3/2o4/3o
x3/2o3o3o4o - tac
o3/2x3o3o4o - rat
o3/2o3x3o4o - nit
o3/2o3o3x4o - rin
o3/2o3o3o4x - pent

x3/2x3o3o4o - [Grünbaumian]
x3/2o3x3o4o - (contains "2thah")
x3/2o3o3x4o - (contains "2firp")
x3/2o3o3o4x - quacant
o3/2x3x3o4o - bittit
o3/2x3o3x4o - sibrant
o3/2x3o3o4x - span
o3/2o3x3x4o - bittin
o3/2o3x3o4x - sirn
o3/2o3o3x4x - tan

x3/2x3x3o4o - [Grünbaumian]
x3/2x3o3x4o - [Grünbaumian]
x3/2x3o3o4x - [Grünbaumian]
x3/2o3x3x4o - (contains "2thah")
x3/2o3x3o4x - (contains "2thah")
x3/2o3o3x4x - (contains "2firp")
o3/2x3x3x4o - gibrant
o3/2x3x3o4x - prin
o3/2x3o3x4x - pattin
o3/2o3x3x4x - girn

x3/2x3x3x4o - [Grünbaumian]
x3/2x3x3o4x - [Grünbaumian]
x3/2x3o3x4x - [Grünbaumian]
x3/2o3x3x4x - (contains "2thah")
o3/2x3x3x4x - gippin

x3/2x3x3x4x - [Grünbaumian]
x3/2o3o3o4/3o - tac
o3/2x3o3o4/3o - rat
o3/2o3x3o4/3o - nit
o3/2o3o3x4/3o - rin
o3/2o3o3o4/3x - pent

x3/2x3o3o4/3o - [Grünbaumian]
x3/2o3x3o4/3o - (contains "2thah")
x3/2o3o3x4/3o - (contains "2firp")
x3/2o3o3o4/3x - scant
o3/2x3x3o4/3o - bittit
o3/2x3o3x4/3o - sibrant
o3/2x3o3o4/3x - quappin
o3/2o3x3x4/3o - bittin
o3/2o3x3o4/3x - quarn
o3/2o3o3x4/3x - quittin

x3/2x3x3o4/3o - [Grünbaumian]
x3/2x3o3x4/3o - [Grünbaumian]
x3/2x3o3o4/3x - [Grünbaumian]
x3/2o3x3x4/3o - (contains "2thah")
x3/2o3x3o4/3x - (contains "2thah")
x3/2o3o3x4/3x - (contains "2firp")
o3/2x3x3x4/3o - gibrant
o3/2x3x3o4/3x - quiprin
o3/2x3o3x4/3x - quiptin
o3/2o3x3x4/3x - gaqrin

x3/2x3x3x4/3o - [Grünbaumian]
x3/2x3x3o4/3x - [Grünbaumian]
x3/2x3o3x4/3x - [Grünbaumian]
x3/2o3x3x4/3x - (contains "2thah")
o3/2x3x3x4/3x - gaquapan

x3/2x3x3x4/3x - [Grünbaumian]
x3/2o3o3/2o4o - tac
o3/2x3o3/2o4o - rat
o3/2o3x3/2o4o - nit
o3/2o3o3/2x4o - rin
o3/2o3o3/2o4x - pent

x3/2x3o3/2o4o - [Grünbaumian]
x3/2o3x3/2o4o - (contains "2thah")
x3/2o3o3/2x4o - spat
x3/2o3o3/2o4x - scant
o3/2x3x3/2o4o - bittit
o3/2x3o3/2x4o - (contains "2thah")
o3/2x3o3/2o4x - quappin
o3/2o3x3/2x4o - [Grünbaumian]
o3/2o3x3/2o4x - quarn
o3/2o3o3/2x4x - tan

x3/2x3x3/2o4o - [Grünbaumian]
x3/2x3o3/2x4o - [Grünbaumian]
x3/2x3o3/2o4x - [Grünbaumian]
x3/2o3x3/2x4o - [Grünbaumian]
x3/2o3x3/2o4x - (contains "2thah")
x3/2o3o3/2x4x - capt
o3/2x3x3/2x4o - [Grünbaumian]
o3/2x3x3/2o4x - quiprin
o3/2x3o3/2x4x - (contains "2thah")
o3/2o3x3/2x4x - [Grünbaumian]

x3/2x3x3/2x4o - [Grünbaumian]
x3/2x3x3/2o4x - [Grünbaumian]
x3/2x3o3/2x4x - [Grünbaumian]
x3/2o3x3/2x4x - [Grünbaumian]
o3/2x3x3/2x4x - [Grünbaumian]

x3/2x3x3/2x4x - [Grünbaumian]
x3/2o3o3/2o4/3o - tac
o3/2x3o3/2o4/3o - rat
o3/2o3x3/2o4/3o - nit
o3/2o3o3/2x4/3o - rin
o3/2o3o3/2o4/3x - pent

x3/2x3o3/2o4/3o - [Grünbaumian]
x3/2o3x3/2o4/3o - (contains "2thah")
x3/2o3o3/2x4/3o - spat
x3/2o3o3/2o4/3x - quacant
o3/2x3x3/2o4/3o - bittit
o3/2x3o3/2x4/3o - (contains "2thah")
o3/2x3o3/2o4/3x - span
o3/2o3x3/2x4/3o - [Grünbaumian]
o3/2o3x3/2o4/3x - sirn
o3/2o3o3/2x4/3x - quittin

x3/2x3x3/2o4/3o - [Grünbaumian]
x3/2x3o3/2x4/3o - [Grünbaumian]
x3/2x3o3/2o4/3x - [Grünbaumian]
x3/2o3x3/2x4/3o - [Grünbaumian]
x3/2o3x3/2o4/3x - (contains "2thah")
x3/2o3o3/2x4/3x - quacpot
o3/2x3x3/2x4/3o - [Grünbaumian]
o3/2x3x3/2o4/3x - prin
o3/2x3o3/2x4/3x - (contains "2thah")
o3/2o3x3/2x4/3x - [Grünbaumian]

x3/2x3x3/2x4/3o - [Grünbaumian]
x3/2x3x3/2o4/3x - [Grünbaumian]
x3/2x3o3/2x4/3x - [Grünbaumian]
x3/2o3x3/2x4/3x - [Grünbaumian]
o3/2x3x3/2x4/3x - [Grünbaumian]

x3/2x3x3/2x4/3x - [Grünbaumian]
o3/2o3/2o3o4o o3/2o3/2o3o4/3o o3/2o3/2o3/2o4o o3/2o3/2o3/2o4/3o
x3/2o3/2o3o4o - tac
o3/2x3/2o3o4o - rat
o3/2o3/2x3o4o - nit
o3/2o3/2o3x4o - rin
o3/2o3/2o3o4x - pent

x3/2x3/2o3o4o - [Grünbaumian]
x3/2o3/2x3o4o - sart
x3/2o3/2o3x4o - spat
x3/2o3/2o3o4x - scant
o3/2x3/2x3o4o - [Grünbaumian]
o3/2x3/2o3x4o - (contains "2thah")
o3/2x3/2o3o4x - quappin
o3/2o3/2x3x4o - bittin
o3/2o3/2x3o4x - sirn
o3/2o3/2o3x4x - tan

x3/2x3/2x3o4o - [Grünbaumian]
x3/2x3/2o3x4o - [Grünbaumian]
x3/2x3/2o3o4x - [Grünbaumian]
x3/2o3/2x3x4o - pirt
x3/2o3/2x3o4x - carnit
x3/2o3/2o3x4x - capt
o3/2x3/2x3x4o - [Grünbaumian]
o3/2x3/2x3o4x - [Grünbaumian]
o3/2x3/2o3x4x - (contains "2thah")
o3/2o3/2x3x4x - girn

x3/2x3/2x3x4o - [Grünbaumian]
x3/2x3/2x3o4x - [Grünbaumian]
x3/2x3/2o3x4x - [Grünbaumian]
x3/2o3/2x3x4x - cogrin
o3/2x3/2x3x4x - [Grünbaumian]

x3/2x3/2x3x4x - [Grünbaumian]
x3/2o3/2o3o4/3o - tac
o3/2x3/2o3o4/3o - rat
o3/2o3/2x3o4/3o - nit
o3/2o3/2o3x4/3o - rin
o3/2o3/2o3o4/3x - pent

x3/2x3/2o3o4/3o - [Grünbaumian]
x3/2o3/2x3o4/3o - sart
x3/2o3/2o3x4/3o - spat
x3/2o3/2o3o4/3x - quacant
o3/2x3/2x3o4/3o - [Grünbaumian]
o3/2x3/2o3x4/3o - (contains "2thah")
o3/2x3/2o3o4/3x - span
o3/2o3/2x3x4/3o - bittin
o3/2o3/2x3o4/3x - quarn
o3/2o3/2o3x4/3x - quittin

x3/2x3/2x3o4/3o - [Grünbaumian]
x3/2x3/2o3x4/3o - [Grünbaumian]
x3/2x3/2o3o4/3x - [Grünbaumian]
x3/2o3/2x3x4/3o - pirt
x3/2o3/2x3o4/3x - quacrant
x3/2o3/2o3x4/3x - quacpot
o3/2x3/2x3x4/3o - [Grünbaumian]
o3/2x3/2x3o4/3x - [Grünbaumian]
o3/2x3/2o3x4/3x - (contains "2thah")
o3/2o3/2x3x4/3x - gaqrin

x3/2x3/2x3x4/3o - [Grünbaumian]
x3/2x3/2x3o4/3x - [Grünbaumian]
x3/2x3/2o3x4/3x - [Grünbaumian]
x3/2o3/2x3x4/3x - quacgarn
o3/2x3/2x3x4/3x - [Grünbaumian]

x3/2x3/2x3x4/3x - [Grünbaumian]
x3/2o3/2o3/2o4o - tac
o3/2x3/2o3/2o4o - rat
o3/2o3/2x3/2o4o - nit
o3/2o3/2o3/2x4o - rin
o3/2o3/2o3/2o4x - pent

x3/2x3/2o3/2o4o - [Grünbaumian]
x3/2o3/2x3/2o4o - sart
x3/2o3/2o3/2x4o - (contains "2firp")
x3/2o3/2o3/2o4x - quacant
o3/2x3/2x3/2o4o - [Grünbaumian]
o3/2x3/2o3/2x4o - sibrant
o3/2x3/2o3/2o4x - span
o3/2o3/2x3/2x4o - [Grünbaumian]
o3/2o3/2x3/2o4x - quarn
o3/2o3/2o3/2x4x - tan

x3/2x3/2x3/2o4o - [Grünbaumian]
x3/2x3/2o3/2x4o - [Grünbaumian]
x3/2x3/2o3/2o4x - [Grünbaumian]
x3/2o3/2x3/2x4o - [Grünbaumian]
x3/2o3/2x3/2o4x - quacrant
x3/2o3/2o3/2x4x - (contains "2firp")
o3/2x3/2x3/2x4o - [Grünbaumian]
o3/2x3/2x3/2o4x - [Grünbaumian]
o3/2x3/2o3/2x4x - pattin
o3/2o3/2x3/2x4x - [Grünbaumian]

x3/2x3/2x3/2x4o - [Grünbaumian]
x3/2x3/2x3/2o4x - [Grünbaumian]
x3/2x3/2o3/2x4x - [Grünbaumian]
x3/2o3/2x3/2x4x - [Grünbaumian]
o3/2x3/2x3/2x4x - [Grünbaumian]

x3/2x3/2x3/2x4x - [Grünbaumian]
x3/2o3/2o3/2o4/3o - tac
o3/2x3/2o3/2o4/3o - rat
o3/2o3/2x3/2o4/3o - nit
o3/2o3/2o3/2x4/3o - rin
o3/2o3/2o3/2o4/3x - pent

x3/2x3/2o3/2o4/3o - [Grünbaumian]
x3/2o3/2x3/2o4/3o - sart
x3/2o3/2o3/2x4/3o - (contains "2firp")
x3/2o3/2o3/2o4/3x - scant
o3/2x3/2x3/2o4/3o - [Grünbaumian]
o3/2x3/2o3/2x4/3o - sibrant
o3/2x3/2o3/2o4/3x - quappin
o3/2o3/2x3/2x4/3o - [Grünbaumian]
o3/2o3/2x3/2o4/3x - sirn
o3/2o3/2o3/2x4/3x - quittin

x3/2x3/2x3/2o4/3o - [Grünbaumian]
x3/2x3/2o3/2x4/3o - [Grünbaumian]
x3/2x3/2o3/2o4/3x - [Grünbaumian]
x3/2o3/2x3/2x4/3o - [Grünbaumian]
x3/2o3/2x3/2o4/3x - carnit
x3/2o3/2o3/2x4/3x - (contains "2firp")
o3/2x3/2x3/2x4/3o - [Grünbaumian]
o3/2x3/2x3/2o4/3x - [Grünbaumian]
o3/2x3/2o3/2x4/3x - quiptin
o3/2o3/2x3/2x4/3x - [Grünbaumian]

x3/2x3/2x3/2x4/3o - [Grünbaumian]
x3/2x3/2x3/2o4/3x - [Grünbaumian]
x3/2x3/2o3/2x4/3x - [Grünbaumian]
x3/2o3/2x3/2x4/3x - [Grünbaumian]
o3/2x3/2x3/2x4/3x - [Grünbaumian]

x3/2x3/2x3/2x4/3x - [Grünbaumian]



tridental ones
 o-P-o-Q-o *b-R-o-S-o  = 
                         
  o_                     
     -P_                 
         >o--R--o--S--o  
     _Q-                 
  o-                     

Within spherical space this type of Dynkin diagrams allows for P,Q,R,S all being either 3 or 3/2 only.


Demipenteractic Symmetries   (up)

Clearly, if both the link marks of the shorter legs as well as the node decorations at their ends are the same, then the resulting polyteron will have an additional symmetry, then resulting from the symmetry of the diagram. Hence those polytera then will be re-found in the (full) penteractic symmetry as well. All others somewhere show up an 'h' within their OBSAs, thus refering for that hemi/demi symmetry only.

o3o3o *b3o3o (convex) o3o3o *b3o3/2o o3o3o *b3/2o3o o3o3o *b3/2o3/2o
x3o3o *b3o3o - hin
o3x3o *b3o3o - nit
o3o3o *b3x3o - rat
o3o3o *b3o3x - tac

x3x3o *b3o3o - thin
x3o3x *b3o3o - rin
x3o3o *b3x3o - sirhin
x3o3o *b3o3x - siphin
o3x3o *b3x3o - bittit
o3x3o *b3o3x - sart
o3o3o *b3x3x - tot

x3x3x *b3o3o - bittin
x3x3o *b3x3o - girhin
x3x3o *b3o3x - pithin
x3o3x *b3x3o - sibrant
x3o3x *b3o3x - spat
x3o3o *b3x3x - pirhin
o3x3o *b3x3x - gart

x3x3x *b3x3o - gibrant
x3x3x *b3o3x - pirt
x3x3o *b3x3x - giphin
x3o3x *b3x3x - pattit

x3x3x *b3x3x - gippit
x3o3o *b3o3/2o - hin
o3x3o *b3o3/2o - nit
o3o3o *b3x3/2o - rat
o3o3o *b3o3/2x - tac

x3x3o *b3o3/2o - thin
x3o3x *b3o3/2o - rin
x3o3o *b3x3/2o - sirhin
x3o3o *b3o3/2x - (contains "2firp")
o3x3o *b3x3/2o - bittit
o3x3o *b3o3/2x - (contains "2thah")
o3o3o *b3x3/2x - [Grünbaumian]

x3x3x *b3o3/2o - bittin
x3x3o *b3x3/2o - girhin
x3x3o *b3o3/2x - (contains "2thah")
x3o3x *b3x3/2o - sibrant
x3o3x *b3o3/2x - (contains "2firp")
x3o3o *b3x3/2x - [Grünbaumian]
o3x3o *b3x3/2x - [Grünbaumian]

x3x3x *b3x3/2o - gibrant
x3x3x *b3o3/2x - (contains "2thah")
x3x3o *b3x3/2x - [Grünbaumian]
x3o3x *b3x3/2x - [Grünbaumian]

x3x3x *b3x3/2x - [Grünbaumian]
x3o3o *b3/2o3o - hin
o3x3o *b3/2o3o - nit
o3o3o *b3/2x3o - rat
o3o3o *b3/2o3x - tac

x3x3o *b3/2o3o - thin
x3o3x *b3/2o3o - rin
x3o3o *b3/2x3o - (contains "2thah")
x3o3o *b3/2o3x - (contains "2firp")
o3x3o *b3/2x3o - [Grünbaumian]
o3x3o *b3/2o3x - (contains "2thah")
o3o3o *b3/2x3x - tot

x3x3x *b3/2o3o - bittin
x3x3o *b3/2x3o - [Grünbaumian]
x3x3o *b3/2o3x - (contains "2thah")
x3o3x *b3/2x3o - (contains "2thah")
x3o3x *b3/2o3x - (contains "2firp")
x3o3o *b3/2x3x - (contains "2thah")
o3x3o *b3/2x3x - [Grünbaumian]

x3x3x *b3/2x3o - [Grünbaumian]
x3x3x *b3/2o3x - (contains "2thah")
x3x3o *b3/2x3x - [Grünbaumian]
x3o3x *b3/2x3x - (contains "2thah")

x3x3x *b3/2x3x - [Grünbaumian]
x3o3o *b3/2o3/2o - hin
o3x3o *b3/2o3/2o - nit
o3o3o *b3/2x3/2o - rat
o3o3o *b3/2o3/2x - tac

x3x3o *b3/2o3/2o - thin
x3o3x *b3/2o3/2o - rin
x3o3o *b3/2x3/2o - (contains "2thah")
x3o3o *b3/2o3/2x - siphin
o3x3o *b3/2x3/2o - [Grünbaumian]
o3x3o *b3/2o3/2x - sart
o3o3o *b3/2x3/2x - [Grünbaumian]

x3x3x *b3/2o3/2o - bittin
x3x3o *b3/2x3/2o - [Grünbaumian]
x3x3o *b3/2o3/2x - pithin
x3o3x *b3/2x3/2o - (contains "2thah")
x3o3x *b3/2o3/2x - spat
x3o3o *b3/2x3/2x - [Grünbaumian]
o3x3o *b3/2x3/2x - [Grünbaumian]

x3x3x *b3/2x3/2o - [Grünbaumian]
x3x3x *b3/2o3/2x - pirt
x3x3o *b3/2x3/2x - [Grünbaumian]
x3o3x *b3/2x3/2x - [Grünbaumian]

x3x3x *b3/2x3/2x - [Grünbaumian]
o3o3/2o *b3o3o o3o3/2o *b3o3/2o o3o3/2o *b3/2o3o o3o3/2o *b3/2o3/2o
x3o3/2o *b3o3o - hin
o3x3/2o *b3o3o - nit
o3o3/2x *b3o3o - hin
o3o3/2o *b3x3o - rat
o3o3/2o *b3o3x - tac

x3x3/2o *b3o3o - thin
x3o3/2x *b3o3o - (contains "2thah")
x3o3/2o *b3x3o - sirhin
x3o3/2o *b3o3x - siphin
o3x3/2x *b3o3o - [Grünbaumian]
o3x3/2o *b3x3o - bittit
o3x3/2o *b3o3x - sart
o3o3/2x *b3x3o - (contains "2thah")
o3o3/2x *b3o3x - (contains "2firp")
o3o3/2o *b3x3x - tot

x3x3/2x *b3o3o - [Grünbaumian]
x3x3/2o *b3x3o - girhin
x3x3/2o *b3o3x - pithin
x3o3/2x *b3x3o - (contains "2thah")
x3o3/2x *b3o3x - (contains "2thah")
x3o3/2o *b3x3x - pirhin
o3x3/2x *b3x3o - [Grünbaumian]
o3x3/2x *b3o3x - [Grünbaumian]
o3x3/2o *b3x3x - gart
o3o3/2x *b3x3x - (contains "2thah")

x3x3/2x *b3x3o - [Grünbaumian]
x3x3/2x *b3o3x - [Grünbaumian]
x3x3/2o *b3x3x - giphin
x3o3/2x *b3x3x - (contains "2thah")
o3x3/2x *b3x3x - [Grünbaumian]

x3x3/2x *b3x3x - [Grünbaumian]
x3o3/2o *b3o3/2o - hin
o3x3/2o *b3o3/2o - nit
o3o3/2x *b3o3/2o - hin
o3o3/2o *b3x3/2o - rat
o3o3/2o *b3o3/2x - tac

x3x3/2o *b3o3/2o - thin
x3o3/2x *b3o3/2o - (contains "2thah")
x3o3/2o *b3x3/2o - sirhin
x3o3/2o *b3o3/2x - (contains "2firp")
o3x3/2x *b3o3/2o - [Grünbaumian]
o3x3/2o *b3x3/2o - bittit
o3x3/2o *b3o3/2x - (contains "2thah")
o3o3/2x *b3x3/2o - (contains "2thah")
o3o3/2x *b3o3/2x - siphin
o3o3/2o *b3x3/2x - [Grünbaumian]

x3x3/2x *b3o3/2o - [Grünbaumian]
x3x3/2o *b3x3/2o - girhin
x3x3/2o *b3o3/2x - (contains "2thah")
x3o3/2x *b3x3/2o - (contains "2thah")
x3o3/2x *b3o3/2x - (contains "2thah")
x3o3/2o *b3x3/2x - [Grünbaumian]
o3x3/2x *b3x3/2o - [Grünbaumian]
o3x3/2x *b3o3/2x - [Grünbaumian]
o3x3/2o *b3x3/2x - [Grünbaumian]
o3o3/2x *b3x3/2x - [Grünbaumian]

x3x3/2x *b3x3/2o - [Grünbaumian]
x3x3/2x *b3o3/2x - [Grünbaumian]
x3x3/2o *b3x3/2x - [Grünbaumian]
x3o3/2x *b3x3/2x - [Grünbaumian]
o3x3/2x *b3x3/2x - [Grünbaumian]

x3x3/2x *b3x3/2x - [Grünbaumian]
x3o3/2o *b3/2o3o - hin
o3x3/2o *b3/2o3o - nit
o3o3/2x *b3/2o3o - hin
o3o3/2o *b3/2x3o - rat
o3o3/2o *b3/2o3x - tac

x3x3/2o *b3/2o3o - thin
x3o3/2x *b3/2o3o - (contains "2thah")
x3o3/2o *b3/2x3o - (contains "2thah")
x3o3/2o *b3/2o3x - (contains "2firp")
o3x3/2x *b3/2o3o - [Grünbaumian]
o3x3/2o *b3/2x3o - [Grünbaumian]
o3x3/2o *b3/2o3x - (contains "2thah")
o3o3/2x *b3/2x3o - sirhin
o3o3/2x *b3/2o3x - siphin
o3o3/2o *b3/2x3x - tot

x3x3/2x *b3/2o3o - [Grünbaumian]
x3x3/2o *b3/2x3o - [Grünbaumian]
x3x3/2o *b3/2o3x - (contains "2thah")
x3o3/2x *b3/2x3o - (contains "2thah")
x3o3/2x *b3/2o3x - (contains "2thah")
x3o3/2o *b3/2x3x - (contains "2thah")
o3x3/2x *b3/2x3o - [Grünbaumian]
o3x3/2x *b3/2o3x - [Grünbaumian]
o3x3/2o *b3/2x3x - [Grünbaumian]
o3o3/2x *b3/2x3x - pirhin

x3x3/2x *b3/2x3o - [Grünbaumian]
x3x3/2x *b3/2o3x - [Grünbaumian]
x3x3/2o *b3/2x3x - [Grünbaumian]
x3o3/2x *b3/2x3x - (contains "2thah")
o3x3/2x *b3/2x3x - [Grünbaumian]

x3x3/2x *b3/2x3x - [Grünbaumian]
x3o3/2o *b3/2o3/2o - hin
o3x3/2o *b3/2o3/2o - nit
o3o3/2x *b3/2o3/2o - hin
o3o3/2o *b3/2x3/2o - rat
o3o3/2o *b3/2o3/2x - tac

x3x3/2o *b3/2o3/2o - thin
x3o3/2x *b3/2o3/2o - (contains "2thah")
x3o3/2o *b3/2x3/2o - (contains "2thah")
x3o3/2o *b3/2o3/2x - siphin
o3x3/2x *b3/2o3/2o - [Grünbaumian]
o3x3/2o *b3/2x3/2o - [Grünbaumian]
o3x3/2o *b3/2o3/2x - sart
o3o3/2x *b3/2x3/2o - sirhin
o3o3/2x *b3/2o3/2x - (contains "2firp")
o3o3/2o *b3/2x3/2x - [Grünbaumian]

x3x3/2x *b3/2o3/2o - [Grünbaumian]
x3x3/2o *b3/2x3/2o - [Grünbaumian]
x3x3/2o *b3/2o3/2x - pithin
x3o3/2x *b3/2x3/2o - (contains "2thah")
x3o3/2x *b3/2o3/2x - (contains "2thah")
x3o3/2o *b3/2x3/2x - [Grünbaumian]
o3x3/2x *b3/2x3/2o - [Grünbaumian]
o3x3/2x *b3/2o3/2x - [Grünbaumian]
o3x3/2o *b3/2x3/2x - [Grünbaumian]
o3o3/2x *b3/2x3/2x - [Grünbaumian]

x3x3/2x *b3/2x3/2o - [Grünbaumian]
x3x3/2x *b3/2o3/2x - [Grünbaumian]
x3x3/2o *b3/2x3/2x - [Grünbaumian]
x3o3/2x *b3/2x3/2x - [Grünbaumian]
o3x3/2x *b3/2x3/2x - [Grünbaumian]

x3x3/2x *b3/2x3/2x - [Grünbaumian]
o3/2o3/2o *b3o3o o3/2o3/2o *b3o3/2o o3/2o3/2o *b3/2o3o o3/2o3/2o *b3/2o3/2o
x3/2o3/2o *b3o3o - hin
o3/2x3/2o *b3o3o - nit
o3/2o3/2o *b3x3o - rat
o3/2o3/2o *b3o3x - tac

x3/2x3/2o *b3o3o - [Grünbaumian]
x3/2o3/2x *b3o3o - rin
x3/2o3/2o *b3x3o - (contains "2thah")
x3/2o3/2o *b3o3x - (contains "2firp")
o3/2x3/2o *b3x3o - bittit
o3/2x3/2o *b3o3x - sart
o3/2o3/2o *b3x3x - tot

x3/2x3/2x *b3o3o - [Grünbaumian]
x3/2x3/2o *b3x3o - [Grünbaumian]
x3/2x3/2o *b3o3x - [Grünbaumian]
x3/2o3/2x *b3x3o - (contains "2thah")
x3/2o3/2x *b3o3x - (contains "2firp")
x3/2o3/2o *b3x3x - (contains "2thah")
o3/2x3/2o *b3x3x - gart

x3/2x3/2x *b3x3o - [Grünbaumian]
x3/2x3/2x *b3o3x - [Grünbaumian]
x3/2x3/2o *b3x3x - [Grünbaumian]
x3/2o3/2x *b3x3x - (contains "2thah")

x3/2x3/2x *b3x3x - [Grünbaumian]
x3/2o3/2o *b3o3/2o - hin
o3/2x3/2o *b3o3/2o - nit
o3/2o3/2o *b3x3/2o - rat
o3/2o3/2o *b3o3/2x - tac

x3/2x3/2o *b3o3/2o - [Grünbaumian]
x3/2o3/2x *b3o3/2o - rin
x3/2o3/2o *b3x3/2o - (contains "2thah")
x3/2o3/2o *b3o3/2x - siphin
o3/2x3/2o *b3x3/2o - bittit
o3/2x3/2o *b3o3/2x - (contains "2thah")
o3/2o3/2o *b3x3/2x - [Grünbaumian]

x3/2x3/2x *b3o3/2o - [Grünbaumian]
x3/2x3/2o *b3x3/2o - [Grünbaumian]
x3/2x3/2o *b3o3/2x - [Grünbaumian]
x3/2o3/2x *b3x3/2o - (contains "2thah")
x3/2o3/2x *b3o3/2x - spat
x3/2o3/2o *b3x3/2x - [Grünbaumian]
o3/2x3/2o *b3x3/2x - [Grünbaumian]

x3/2x3/2x *b3x3/2o - [Grünbaumian]
x3/2x3/2x *b3o3/2x - [Grünbaumian]
x3/2x3/2o *b3x3/2x - [Grünbaumian]
x3/2o3/2x *b3x3/2x - [Grünbaumian]

x3/2x3/2x *b3x3/2x - [Grünbaumian]
x3/2o3/2o *b3/2o3o - hin
o3/2x3/2o *b3/2o3o - nit
o3/2o3/2o *b3/2x3o - rat
o3/2o3/2o *b3/2o3x - tac

x3/2x3/2o *b3/2o3o - [Grünbaumian]
x3/2o3/2x *b3/2o3o - rin
x3/2o3/2o *b3/2x3o - sirhin
x3/2o3/2o *b3/2o3x - siphin
o3/2x3/2o *b3/2x3o - [Grünbaumian]
o3/2x3/2o *b3/2o3x - (contains "2thah")
o3/2o3/2o *b3/2x3x - tot

x3/2x3/2x *b3/2o3o - [Grünbaumian]
x3/2x3/2o *b3/2x3o - [Grünbaumian]
x3/2x3/2o *b3/2o3x - [Grünbaumian]
x3/2o3/2x *b3/2x3o - sibrant
x3/2o3/2x *b3/2o3x - spat
x3/2o3/2o *b3/2x3x - pirhin
o3/2x3/2o *b3/2x3x - [Grünbaumian]

x3/2x3/2x *b3/2x3o - [Grünbaumian]
x3/2x3/2x *b3/2o3x - [Grünbaumian]
x3/2x3/2o *b3/2x3x - [Grünbaumian]
x3/2o3/2x *b3/2x3x - pattit

x3/2x3/2x *b3/2x3x - [Grünbaumian]
x3/2o3/2o *b3/2o3/2o - hin
o3/2x3/2o *b3/2o3/2o - nit
o3/2o3/2o *b3/2x3/2o - rat
o3/2o3/2o *b3/2o3/2x - tac

x3/2x3/2o *b3/2o3/2o - [Grünbaumian]
x3/2o3/2x *b3/2o3/2o - rin
x3/2o3/2o *b3/2x3/2o - sirhin
x3/2o3/2o *b3/2o3/2x - (contains "2firp")
o3/2x3/2o *b3/2x3/2o - [Grünbaumian]
o3/2x3/2o *b3/2o3/2x - sart
o3/2o3/2o *b3/2x3/2x - [Grünbaumian]

x3/2x3/2x *b3/2o3/2o - [Grünbaumian]
x3/2x3/2o *b3/2x3/2o - [Grünbaumian]
x3/2x3/2o *b3/2o3/2x - [Grünbaumian]
x3/2o3/2x *b3/2x3/2o - sibrant
x3/2o3/2x *b3/2o3/2x - (contains "2firp")
x3/2o3/2o *b3/2x3/2x - [Grünbaumian]
o3/2x3/2o *b3/2x3/2x - [Grünbaumian]

x3/2x3/2x *b3/2x3/2o - [Grünbaumian]
x3/2x3/2x *b3/2o3/2x - [Grünbaumian]
x3/2x3/2o *b3/2x3/2x - [Grünbaumian]
x3/2o3/2x *b3/2x3/2x - [Grünbaumian]

x3/2x3/2x *b3/2x3/2x - [Grünbaumian]


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