https: //youtu. be/dl9NqTrSE₀? si=bpQZPIpwIL3Qzp3F https: //youtu. be/DpS8inAdzWE? si=YKTufd8677qQDbjM This paper is the sixth installment in the SRCD (Self-Regulated Curvature Dynamics) research series, following earlier works on the wave equation, the gravitational constant G, the speed of light c, the origin of wavelength, and the structural unification of the four fundamental forces. The broader SRCD program—developed in detail across a 277-page foundational manuscript—proposes that physical laws and constants are not fundamental axioms, but emergent, stability-regulated structures arising from an underlying discrete geometric substrate. Within this worldview, spacetime is not treated as a smooth manifold at the most basic level; instead, continuum descriptions appear as effective representations selected by structural regularity and stability. The unifying aim of the series is to show that continuum differential equations and physical constants arise without being postulated, through self-regulation, structural constraints, and stability selection in discrete dynamics. In this paper, we address a central foundational question within the SRCD framework: How can continuum differential operators—particularly the operator structure of the wave equation—be rigorously justified when the underlying dynamics are defined purely on discrete indices? Starting from integer-indexed discrete dynamics, we introduce an explicit order-preserving embedding of the discrete index set into an ordered continuum, together with a pullback construction that allows continuum representations to be evaluated without assuming smoothness as a primitive axiom. Rather than relying on continuum limits or numerical convergence arguments, the analysis demonstrates that standard continuum operators arise as stability-selected fixed points of local, translation-invariant discrete dynamics in the long-wavelength regime. Central difference operators encode the structural content of second derivatives whenever a regular continuum representation exists, while symmetry and stability uniquely select Laplacian-type generators and, consequently, the continuum wave operator. This work does not introduce new numerical schemes or new physical constants. Instead, it provides a mathematically closed and conceptually explicit foundation for the emergence of continuum operator structures from discrete dynamics, serving as a structural bridge between the detailed SRCD worldview and its concrete mathematical realization.
Seunghyun Hong (Sun,) studied this question.