Capital mobility inevitably leads to capital concentration, which constitutes the most fundamental paradox of market economies. This paper demonstrates that this problem can be resolved geometrically. By introducing a points dimension mirroring currency, the economic system is elevated from a one‑dimensional real line to a two‑dimensional complex plane: currency forms the real axis, and points form the imaginary axis. Each individual is constrained to an orbit defined by the rule that currency plus points equals a constant. Euler’s formula, e^i+1 = 0, precisely captures this mechanism: capital can flow along the real axis (e), yet every movement is matched by an equal and opposite shift of points along the imaginary axis (i). National sovereign debt defines the boundary of this flow (), ensuring capital can never escape toward infinity. Mathematically, this paper proves that under two‑dimensional complex‑plane constraints, capital can only fluctuate within bounded limits — retaining liquidity while eliminating the cone‑shaped divergence of runaway accumulation. The appendix uses a simple two‑agent case study (a housing transaction between Party A and Party B) to intuitively illustrate how two zeros can lie out of horizontal alignment and converge to zero simultaneously. This work provides a geometric proof and mathematical foundation for the core mechanisms of the Symbiotic Order: the dual‑track currency‑points system, zero‑sum equilibrium, and internal balance paired with external expansion.
Pige Li (Sun,) studied this question.