This paper introduces Invariant Omnilectic Mathematics as a closure-based reconstruction of mathematical foundations. The central proposal is that mathematics does not begin from arbitrary symbolic convention, pure nothingness, or an unexplained assumption of unity, but from a primary closure disclosure expressed by the Seed Equation: This equation is interpreted not merely as a technical convention of combinatorics or formal power series, but as the ontological expression of coherence-generating invariance: self-referential nullity disclosing unity. From this Primary Seed Equation, the paper develops an immediate closure family, and an expanded seed architecture, corresponding to coherence, identity, phase, and scale. The paper formalizes a four-layer ontology of mathematics: where denotes Invariant Mathematics, Field Mathematics, Relational Mathematics, and Derived Mathematics. Number, set, field, relation, law, arithmetic, algebra, geometry, calculus, topology, probability, information theory, and physical mathematics are then interpreted as progressive disclosures of closure. The resulting framework does not reject standard mathematics. Rather, it proposes that standard mathematical systems may be understood as derived formal expressions of deeper closure conditions. The paper’s central thesis is that closure is ontologically prior to mathematical construction, and that mathematics is the formal disclosure of coherence, identity, relation, transformation, and law. Keywords: Invariant Omnilectic Mathematics; Primary Seed Equation; ; closure; coherence; coherence-generating invariance; Unified Coherence Closure Framework; mathematical ontology; seed architecture; invariant mathematics; field mathematics; relational mathematics; derived mathematics; ; Euler relation; scale closure; identity; phase; mathematical foundations.
Philip Lilien (Sun,) studied this question.