We introduce projective triangular complexes, a simplicial and three‑layered enhancement of real projective space that restores the interior–boundary–exterior structure implicitly present in projective geometry. A projective triangular complex consists of a triangulated projective sphere together with a canonical three‑layer decomposition and a compatible action of projective transformations and projective duality. We show that the category of projective triangular complexes over RPn admits an initial object, the standard projective triangular complex, obtained from the canonical three‑layer structure and a minimal triangulation. Independently, we construct a free projective triangular complex via a left adjoint F to the forgetful functor U:ProjTriCompn→ProjGeomn, and prove that this free object is isomorphic to the standard one. This establishes a universal characterization of the three‑layer projective structure: every projective triangular complex over RPn arises uniquely from the standard model by simplicial refinement. As a consequence, any invariant defined on the free (equivalently, standard) complex extends naturally and uniquely to all projective triangular complexes. Moreover, we show that the essential image of U consists precisely of RPn, yielding a categorical reconstruction theorem: classical projective geometry appears as the forgetful shadow of a richer universal structure. This work positions projective triangular complexes as a canonical and universal geometric framework underlying real projective space, unifying projective transformations, duality, and simplicial topology within a single categorical structure.
Renji Nakayama (Tue,) studied this question.