Orthogonality and minimality in the homology of locally finite graphs

Abstract

Given a finite set E, a subset D E (viewed as a function E 2) is orthogonal to a given subspace of the 2-vector space of functions E 2 as soon as D is orthogonal to every -minimal element of . This fails in general when E is infinite. However, we prove the above statement for the six subspaces of the edge space of any 3-connected locally finite graph that are relevant to its homology: the topological, algebraic, and finite cycle and cut spaces. This solves a problem of [5]