Configurations of few lines in 3-space. Isotopy, chirality and planar layouts

We give a characterization of the planar layouts of configurations with at most five lines. From this we obtain a new proof of Viro's theorem that the isotopy type of such configurations is completely determined by chirality. We extend this result to labelled configurations. We also give an infinite family of non-realizable line diagrams, called ‘alternatingC-angles’, not containing non-realizable subdiagrams.