Now, trying to look at (Brian) Hodges' model using maths, I've wondered about possible connections with Wilfred Hodges' work.
Dr W. Hodges was listed in searches on lines, axes, and structure:
'Algebraists and geometers like to classify structures by the laws which they obey. A typical law for incidence structures reads:My imagination may be getting the better of me, but there seems something profound in the intersection of the model's two axes and the care - knowledge domains that are created (proposed - adopted..)?
"For any two different lines L and M, there is exactly one point which lies on both L and M."'
So, is Hodges' model a form of 'incidence structure', or does it contain several incidence structures?
Hodges, W. (1985). Truth in a Structure. Proceedings of the Aristotelian Society, 86, 135–151. http://www.jstor.org/stable/4545041
Hodges, W. (1985). Truth in a Structure. Proceedings of the Aristotelian Society, 86, 135–151. http://www.jstor.org/stable/4545041