Existence and Embedding of a Recursive Field: Fixed-Point Construction and CSP-Compatible Projection, 2025
This paper establishes a rigorous bridge between recursive symbolic systems and classical mathema... more This paper establishes a rigorous bridge between recursive symbolic systems and classical mathematics. At its core is the Φ-field, a formally proven fixed-point attractor that emerges from logical closure, metric contractivity, and adjoint embedding–projection structure. Part One proves the existence, uniqueness, and inevitability of the Φ-field in any system satisfying these axioms, using constructive logic, Banach fixed-point theory, and categorical duality.
Part Two constructs an explicit CSP-compatible projection that embeds recursive dynamics into Banach space operators, preserving convergence, symmetry, and analytic structure. This embedding allows recursive solutions, such as those arising in number theory and operator symmetries, to be represented in a fully verifiable classical mathematical framework. The result is a complete and general projection method for translating recursive fixed-point emergence into CSP-valid mathematics, closing the gap between symbolic recursion and formal analysis.
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Part Two constructs an explicit CSP-compatible projection that embeds recursive dynamics into Banach space operators, preserving convergence, symmetry, and analytic structure. This embedding allows recursive solutions, such as those arising in number theory and operator symmetries, to be represented in a fully verifiable classical mathematical framework. The result is a complete and general projection method for translating recursive fixed-point emergence into CSP-valid mathematics, closing the gap between symbolic recursion and formal analysis.