polytera


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 5D
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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	Non-existence of other non-Grünbaumian Wythoffians with irreducible symmetries Wythoffians with reducible symmetries: Prisms and Multiprisms Snubs and other Hemiations Holosnubs and other Non-Wythoffians

In the following symmetry listings "etc." means replacments according to 3 ↔ 3/2, to 4 ↔ 4/3, to 5 ↔ 5/4, or to 5/2 ↔ 5/3.

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 (o3o3o3o3o etc.)
Penteractic Symmetries (o3o3o3o4o etc.)

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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---- 5D ----

Terse Overview of Irreduzible Dynkin Graph Types

Hexateral Symmetries (up)

Penteractic Symmetries (up)

Demipenteractic Symmetries (up)