We model primes as escape axes of a dissipative noncommutative system. As composite interactions accumulate, internal network cohesion grows and absorbs rotational instability. A new prime emerges only when residual instability exceeds this cohesion, yielding a rare alignment event. This mechanism explains the decreasing density of primes and reframes prime generation as a saturation-driven transition.
Jeong Min Yeon (Fri,) studied this question.