A Complete Proof of the Simon--Lukic Conjecture for Higher-Order Szego Theorems

Abstract

This paper provides a complete proof of Simon-Lukic conjecture for orthogonal polynomials on the unit circle. For a probability measure dμ = w(θ) dθ2π + dμs with Verblunsky coefficients α=\αn\n=0∞, distinct singular points (θk)k=1, and multiplicities (mk)k=1, we establish the equivalence between the entropy condition \[ ∫02π Πk=1 [1 - (θ - θk)]mk w(θ) dθ2π > -∞ \] and the decomposition condition \[ ∃ β(1), …, β() : α = Σk=1 β(k) \,\, with \,\, (S - e-iθk)mk β(k) ∈ 2, \,\, β(k) ∈ 2mk + 2. \] The proof synthesizes unitary transformations, discrete Sobolev-type inequalities, higher-order Szego expansions, and a novel algebraic decomposition technique. Our resolution affirms that spectral theory is fundamentally local-global behavior emerges from the superposition of local resonances, each governed by its intrinsic scale.