Moments of Leb restricted to the intersection spectrum Σ_{α,λ} of the AMO are polynomials in λ with trigonometric-polynomial coefficients in α, implying continuous weak-* dependence of μ⁻_{α,λ} on parameters and analyticity in λ away from λ=1.
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Geometric Binder cumulants derived from a generalized Bargmann invariant detect gap closure in quantum systems for identifying phase transitions.
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Generalized Aubry-Andr\'e formula and continuity of the intersection spectrum of the Almost Mathieu operator
Moments of Leb restricted to the intersection spectrum Σ_{α,λ} of the AMO are polynomials in λ with trigonometric-polynomial coefficients in α, implying continuous weak-* dependence of μ⁻_{α,λ} on parameters and analyticity in λ away from λ=1.
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From generating functions to the geometric Binder cumulant
Geometric Binder cumulants derived from a generalized Bargmann invariant detect gap closure in quantum systems for identifying phase transitions.