periodic lattice component

**Figure 3:** T1 is the smallest triangle, but nevertheless can crystallize in a lattice of pure T1's. The enantiomorphic diagonal reflection also tiles the plane, but cannot evolve under rule 110.
$\begin{figure}\centering\begin{picture}(150,150) \put(0,0){\epsfxsize =150pt \epsffile{lat1.eps}} \end{picture}\end{figure}$

The prime occurrence of T1 is in a cycle of length 4, generating staggered columns of T1's.

Table 1: At certain shift-periods, the cycle may coincide with other patterns (marked by f), especially in the formation of the A gliders (marked by A). It may also end abruptly at a half-space of zeroes (marked by z), as regularly happens in static configurations.

	10	9	8	7	6	5	4	3	2	1	0	1	2	3	4	5	6	7	8	9	10
1	c	.	.	.	c	.	.	.	c	.	.	.	c	.	.	.	c	.	.	.	c
2	.	.	c	.	.	.	c	.	.	.	z	.	.	.	c	.	.	.	c	.
3	c	.	.	.	c	.	.	.	c	.	.	.	A	.	.	.	c	.	.	.	c
4	.	.	c	.	.	.	c	.	.	.	z	.	.	.	c	.	.	.	c	.
5	c	.	.	.	c	.	.	.	f	.	.	.	c	.	.	.	c	.	.	.	c
6	.	.	c	.	.	.	c	.	.	.	z	.	.	.	A	.	.	.	c	.
7	c	.	.	.	c	.	.	.	c	.	.	.	c	.	.	.	c	.	.	.	c
8	.	.	c	.	.	.	f	.	.	.	z	.	.	.	c	.	.	.	c	.
9	c	.	.	.	c	.	.	.	f	.	.	.	f	.	.	.	A	.	.	.	c
10	.	.	c	.	.	.	f	.	.	.	z	.	.	.	c	.	.	.	c	.