This paper formalizes the **Tralse Limit Theorem**: the claim that every proposition, every physical law, and every conceivable constraint has a non-zero degree of tralsity. No proposition achieves τ = 0 or τ = 1 exactly. "Binary" claims are permitted in TI Sigma as efficient rhetoric — *sufficiently true* — but the deep ontological structure is always continuous, never exactly discrete. The proof proceeds from the nature of CCC (the Greatest Conceivable Being): because CCC is not a perfectionist, CCC necessarily permits tralsity in its own laws. Since all physical laws are downstream of CCC's permissive structure, every physical law inherits a non-zero violation probability. Even the most stringent physical constant must, by necessity, have a probability of being violated — even if that probability is 1 in a googolplex or smaller.
Brandon Charles Emerick (Tue,) studied this question.