Homotopy equivalence of digital pictures in Z2

Abstract

We investigate the properties of digital homotopy in the context of digital pictures (X,, ), where X⊂neq n is a finite set, is an adjacency relation on X, and is an adjacency relation on the complement of X. In particular we focus on homotopy equivalence between digital pictures in 2. We define a numerical homotopy-type invariant for digital pictures in 2 called the outer perimeter, which is a basic tool for distinguishing homotopy types of digital pictures. When a digital picture has no holes, we show that it is homotopy equivalent to its rc-convex hull, obtained by ``filling in the gaps'' of any row or column. We show that a digital picture (X,ci,cj) is homotopy equivalent to only finitely many other digital pictures (Y,ci,cj). At the end of the paper, we raise a conjecture on the largest digital picture of the same homotopy-type of a given digital picture.