This paper demonstrates that major transitions in physics and mathematics exhibit an invariant three-part structure: (1) the functioning framework requires a constitutive background condition that must remain non-thematic for the framework to operate; (2) at points of structural crisis, this background condition forces itself into visibility as a formal contradiction or incompleteness the framework cannot resolve in its own terms; (3) the successor framework is constructed from the operative architecture of what the prior framework had to exclude. Ten cases drawn from the history and formalism of physics and mathematics - from the crisis of irrationals in Greek mathematics through the vacuum energy problem in contemporary quantum field theory - are shown to instantiate this structure with formal precision. The demonstration proceeds not by imposing an external philosophical schema but by exhibiting the structure within the formalism itself: in the Hodge dual operator that requires Maxwell's equations to operate on their own complement; in Lenz's law encoding productive resistance into the sign structure of electrodynamics; in the independence of the parallel postulate exposing geometry's dependence on an ungroundable axiom; in the vacuum catastrophe revealing that the ground state of physics is formally groundless. The convergence across independent domains traces the silhouette of a structure that cannot be directly defined because it withdraws by constitution - but whose shape becomes undeniable when enough of its boundary is mapped. The paper concludes that the generative structure of paradigm transition is not an accident of intellectual history but a formal consequence of how any sufficiently powerful framework relates to its own conditions of possibility.
Moreno Nourizadeh (Thu,) studied this question.