We characterize the edge-signed graphs in which every ‘significant’ positive closed walk (or combination of walks) has even length, under seven different criteria for significance, and also those edge-signed graphs whose double covering graph is bipartite. If the property of even length is generalized to positivity in a second edge signing, the characterizations generalize as well.
We also characterize the edge-signed graphs with the smallest nontrivial chromatic numbers.
