A Structural Fixed-Point Principle in Kunen's Theorem on Quasigroups

Abstract

Kunen proved that a quasigroup satisfying a Moufang-type identity (N1) must be a loop. We reformulate the argument in the category Set as a fixed-point extraction principle. From N1 one canonically obtains an idempotent endomorphism j:G G. Its fixed-point object Fix(j)=Eq(j,idG) splits off as a retract. The N1-symmetry forces j to coequalize the (regular) translation action, hence j factors through the terminal object. Thus Fix(j) 1, yielding a unique global identity element. This provides a conceptual reformulation of Kunen's original algebraic proof Kunen.