On the consistency of NF via Fuzzy Forcing
Abstract
In this paper, we present a proof of the consistency of the New Foundations set theory (NF). NF's main idea is to permit very large sets (including the Universal Set) by restricting set formation to stratified formulas, thereby avoiding the classic set-theoretic paradoxes. Our proof employs a new forcing method incorporating concepts from fuzzy logic. A brief outline of the proof can be as follows: (1) We extend ZF to Fuzzy ZF with a membership function μ over D=Q [0,1]; (2) we define Fuzzy NF as , and (3) we derive a crisp N model of NF. Our proof does not depend on Holmes' Tangled Type Theory (TTT). It establishes that if ZF is consistent, then NF is also consistent. It achieves that via the chain ZF → Fuzzy ZF → → NF. The method presented in this paper offers a novel perspective connecting fuzzy logic with classic set theory.
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