Intergenesis develops a generative foundation for geometry beginning from a single primitive act. The act produces an oriented between, and this minimal structure forces a sequence of developmental consequences: interior, motion, curvature, scale, the cone of admissible development, collapse, dual limits, and timing. Each element arises only because the previous one exists, forming a strict dependency chain. No prior space, metric, or point-set structure is assumed; all geometric notions are derived from the generative conditions imposed by the primitive act and four irreducible axioms (straight extension, branching, bounded curvature–scale ratio, and interior admissibility). The result is a minimal developmental geometry in which straightness, curvature, scale, and timing emerge as structural invariants rather than primitives.
Robert A. Moser (Sat,) studied this question.