What does this research mean for the field?

A two-register apparatus comprising operational and formal registers, connected by a conservativity theorem, enables formal reasoning over non-operational entities without introducing new operational commitments. Novelty: ClaimNovelty.METHODOLOGICAL. Consensus alignment: ConsensusAlignment.NEUTRAL.

What question did this study set out to answer?

This work aims to introduce VR-Forms, enhancing the VR program by implementing a two-register apparatus combining operational and formal elements.

June 2, 2026Open Access

VR-Forms: An Operational Two-Register Apparatus over VR-Sets

Key Points

This work aims to introduce VR-Forms, enhancing the VR program by implementing a two-register apparatus combining operational and formal elements.
Introduced a two-register system consisting of an operational register and a formal register.
Established a conservativity theorem connecting the two registers, ensuring no new operational commitments.
Reframed the philosophical presentation to adopt a no-ontology position.
Confirmed that the formal register is a conservative extension of the operational register, generating no new operational commitments.
Provided a clear status for classical paradoxes and uncountable objects as formal terms without operational correlate.
Extended the formal register to include mythological, theological, and literary descriptions, demonstrating its universality.

Abstract

VR-Forms is the fourth work in the cycle developing the VR programme (Reznik 2026, preprints VR. A Formal System, VR-Numbers, VR-Sets). It introduces a two-register apparatus on top of VR-Sets: an operational register (operational sets of VR-Sets, with closure principle and reference-based ∈) and a formal register (syntactic descriptions without operational commitment). The formal register provides a universal language for everything that is not operationally realised — classical uncountable objects, paradoxical classes, mythological and theological terms, philosophical categories. The two registers are connected by a conservativity theorem (Theorem III.1): the formal register is a conservative extension of the operational, generating no new operational commitments and proving nothing in the operational register that VR-Sets could not already prove. The transit rule allows formal reasoning over uncountable intermediaries, with results automatically translating into the operational register when the conclusion is itself operational. The apparatus closes the operational contour of the VR cycle: VR can now speak about everything, while ascribing no ontology — only operations, ∅ itself the base. Classical paradoxes (Russell, Vitali, Skolem) and classical uncountable objects (ℝ, ℘(ℕ), proper classes) receive a clear status — formal terms without operational correlate. The same status, by uniform application of the principle of forms, extends to mythological, theological, and literary descriptions, demonstrating the universality of the formal register beyond mathematics. Version 1.0.2 (2026) reframes the philosophical presentation to a no-ontology position: ∅ is taken as a nullary operation, the two registers are named operational/formal (the earlier label "ontological register" is dropped, as the cycle ascribes no ontology), and the cycle's slogan becomes "nothing is — all is doing"; no axiom, definition, or theorem is altered. (Version 1.0.1 added Part IX — methodological observations from the Lean 4 formalisation.)

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