Deconstructing Superintelligence: Identity, Self-Modification and Différance

Abstract

Self-modification is routinely treated as constitutive of artificial superintelligence (SI), yet modification is a relative action requiring a supplement outside the operation. We formalise this on an associative operator algebra A with update operator U, difference operator D, and self-representation operator R, identifying the supplement with Comm( U). A propagation theorem shows [ U, R] decomposes through [ U, D], so non-commutation propagates to self-representation. The liar paradox is the rank-one case [ T,ΠL]=0, and class A systems, in which U acts on D, reproduce it at system scale, yielding a structure coinciding with Priest's inclosure schema and Derrida's différance. Our results show that the strong self-modification taken to define superintelligence may undermine the persistent identity upon which such systems are premised.