Remarks on the digital-topological k-group structures and the development of the AP1-k- and AP1-k-group

Abstract

In the literature of a digital-topological (DT-, for brevity) group structure on a digital image (X,k), roughly saying, two kinds of methods are shown. Given a digital image (X,k), the first one, named by a DT-k-group, was established in 2022 H10 by using both the Gk- or Ck-adjacency H10 for the product X2:=X × X and the (Gk,k)- or (Ck,k)-continuity for the multiplication α:X2 X H10. The second one with the name of NPi-DT-groups, i ∈ \1,2\, was discussed in 2023 LS1 by using the NPi(k,k)-adjacency for X2 in B1 and the (NPi(k,k), k)-continuities of the multiplication α:X2 X, i∈ \1,2\. However, due to some defects of the NPu(k1,k2, ·s, kv)-adjacency in B1,B2, the APu(k1,k2, ·s, kv)-adjacency was recently developed as an alternative to the NPu(k1,k2, ·s, kv)-adjacency (see Section 4). Besides, we also develop an APu(k1,k2, ·s, kv)-adjacency. For a digital image (X, k), in case an AP1(k,k)-(AP1-, for simplicity) adjacency on X2 exists, we formulate both an AP1-k- and an AP1-k-group. Then we show that an AP1-k-group is equivalent to a Han's DT-k-group based on both the Ck-adjacency on the product X2 and the (Ck, k)-continuity for the multiplication α1:(X2, Ck) (X,k).

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