There are several groups of chps forming mutually constrained sets of closed diagrams highligting relatinonships between their respective verses. We see three of those as shown in the above figures.
The leftmost diagram is a 6-node loop that contains a core group of five chps starting and ending with 13 that are sequentially maped to their verses (represented by V-arrows). Incidently, these five chps in the core group is the largest set forming such a loop where the nodes are entirely linked to one another via their verses only. Additionally, there are two more sub-loops attached at the top and the bottom, revealing properties related to their ords (see Glossary). The top triangle with vertices 13, 24, and 43 are pairwise-related to each other via their ords (I,U-arrows) and verses (V-arrow). The upper right triangle signifies that 89 is also the 24th prime in addition to its relation to 43. The three nodes 89, 30, and 60 also participate in another sub-loop, where we take into account the fact that 89 is of ord 60, (curved U-arrow).
The middle diagram contains a core group of four (the V-square) starting and ending with 22, similarly related to each other entirely through their verses. At the same time, the top triangle, 22, 49, and 78 form an interesintg subset by themselves. First, we notice that 22nd ord is 49, and 49th ord is 78, which itself is the number of verses of chp 22. From 22 to 78 there are 3117 verses. This also highlights the fact that 31 is of ord 17. What makes this interesting is that from 22 to 78 there are 57 = 114/2 chps and 3117 = 6234/2; thus, half the number of consecutive chps give rise to half the number of total verses! Plus the fact that 62 itself is of ord 34. From 49 to 78 there are 1100 = 100 × 11 verses. Here, we notice 100 and its verses 11. Furthermore, if we chain these two numbers we get 10011. Since, it consists of 1's and 0's only, we may think of it as a binary number, and in fact it equals to 19 in base two! Additionally, the numbers of normal and free verses in chp 22 are 50 and 28 respectively, which may be thought of an indirect hint to chp 50, since, it is of ord 28. Moreover, 50 ± 22 = 28, 72, where we see the reference to chp 72 and its 28 verses!
The last set is the smallest such subset and consists of only a pair of chps, 36 and 83 which are each other's verses respectively. The individual chps in each subset may be linked to chps in other groups as we note for instance, the nodes 13 and 40 from the first and the second sets, respectively, with the following properties: 13 + 27 = 40, where 27 is of ord 13, and from 13 to 40 there are 2511 = 27 × 93 verses, relating chp 27 to its 93 verses. Another example, from 22 to 30, nodes from the second and first groups respectively, there are 874 = 19 × 46 verses, where 46 is of ord 27.