Acronym ..., 5Y4-4T-6P3-tri-3
Name trat-elongated 10Y4-8T-3
 
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Pattern
(fundamental domain of non-prismatic layers)
     u         Vertices:
    /|\        u = vertices within lower trat plane
   / c \       o = vertices within upper trat plane
  b _o_ b      
 /_d/T\d_\     Edges:
u--/-a-\--u    a = {4}-inc. trat-edges
|\b  Y  b/|    b = not {4}-inc. trat-edges
c/b  Y  b\c    c = {4}-inc. lace-edges
o-_--a--_-o    d = not {4}-inc. lace-edges
 \ d\T/d /     
  b  u  b      Prism layers:
   \ | /       N = betw. T and Y4
    \c/        Y = betw. Y4 and Y4
     o         T = betw. T and T
Confer
uniform relative:
gyetoh  
related CRF honeycombs:
editoh   10Y4-8T-3   5Y4-4T-6P3-tri-0   5Y4-4T-6P3-tri-1-alt   5Y4-4T-6P3-tri-1-hel (r/l)   5Y4-4T-6P3-tri-2-alt   5Y4-4T-6P3-tri-2-hel (r/l)  
general polytopal classes:
scaliform  
External
links
mcneill

This scaliform honeycomb is derived from gyetoh by bisecting all of the octs into pairs of squippies with parallel planes in each non-prismatic layer, using mirror symmetry with resp. to the prism layers for layer-wise interrelations.

Further it can be derived from 10Y4-8T-3 by introducing elongating layers of trip at the parallel trat sections.

Further it occurs as (false) gyration within the parallel trip layers of 5Y4-4T-6P3-tri-0 in steps of 3×60°; in fact it just is a mirroring in those trip layers.


Incidence matrix

(N→∞)

2N |  2  4 1  2 1 |  3  3  6  3 2 2  4 |  4  5 3 3
---+--------------+--------------------+----------
 2 | 2N  * *  * * |  1  1  0  1 1 1  0 |  1  2 1 1  a
 2 |  * 4N *  * * |  1  1  1  0 0 0  1 |  1  1 1 1  b
 2 |  *  * N  * * |  0  0  4  0 2 0  0 |  2  4 0 0  c
 2 |  *  * * 2N * |  0  0  2  2 0 0  0 |  2  2 0 0  d
 2 |  *  * *  * N |  0  0  0  0 0 2  4 |  0  0 3 3  e prism-lacing
---+--------------+--------------------+----------
 3 |  1  2 0  0 0 | 2N  *  *  * * *  * |  1  0 1 0  abb-T
 3 |  1  2 0  0 0 |  * 2N  *  * * *  * |  0  1 0 1  abb-Y
 3 |  0  1 1  1 0 |  *  * 4N  * * *  * |  1  1 0 0  bcd
 3 |  1  0 0  2 0 |  *  *  * 2N * *  * |  1  1 0 0  add
 4 |  2  0 2  0 0 |  *  *  *  * N *  * |  0  2 0 0  acac
 4 |  2  0 0  0 2 |  *  *  *  * * N  * |  0  0 1 1  aeae
 4 |  0  2 0  0 2 |  *  *  *  * * * 2N |  0  0 1 1  bebe
---+--------------+--------------------+----------
 4 |  1  2 1  2 0 |  1  0  2  1 0 0  0 | 2N  * * *  tet
 5 |  2  2 2  2 0 |  0  1  2  1 1 0  0 |  * 2N * *  squippy
 6 |  2  4 0  0 3 |  2  0  0  0 0 1  2 |  *  * N *  trip-T
 6 |  2  4 0  0 3 |  0  2  0  0 0 1  2 |  *  * * N  trip-Y

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