Bridging Graph-Theoretical and Topological Approaches: Connectivity and Jordan Curves in the Digital Plane

Abstract

This article explores the connections between graph-theoretical and topological approaches in the study of the Jordan curve theorem for grids. Building on the foundational work of Rosenfeld, who developed adjacency-based concepts on Z2, and the subsequent introduction of the topological digital plane K2 with the Khalimsky topology by Khalimsky, Kopperman, and Meyer, we investigate the interplay between these perspectives. Inspired by the work of Khalimsky, Kopperman, and Meyer, we define an operator * transforming subsets of Z2 into subsets of K2. This operator is essential for demonstrating how 8-paths, 4-connectivity, and other discrete structures in Z2 correspond to topological properties in K2. Moreover, we address whether the topological Jordan curve theorem for K2 can be derived from the graph-theoretical version on Z2. Our results illustrate the deep and intricate relationship between these two methodologies, shedding light on their complementary roles in digital topology.

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