We show that a genuine Lorentzian quadratic form on a prime shell cannot be realized within a single symmetry-complete finite field Fp. The obstruction is elementary: to split time from space one needs a time coefficient c2 in the nonsquare class of Fp, but then c ∉ Fp. Thus, the minimal construction of a Minkowski metric in the Finite Ring Continuum (FRC) requires the quadratic extension Fp2 (“the next shell”), where such a c exists. We interpret this obstruction as the algebraic origin of causal \ (Fₚ \) \ (Fₚ \) structure: just as the South Pole of the orbital complex Sp lies beyond an observer’s horizon, the constant distinguishing time from space lies beyond the local field. Causality, in this sense, is encoded as algebraic inaccessibility, becoming available only by extension beyond the shell. This short note isolates the mechanism in a minimal form, making the causal significance of square-class separation explicit and fully reproducible. \ (Fₚ \) \ (\)
Yosef Akhtman (Fri,) studied this question.