Proves a generalised eigenvector expansion for infinite Toeplitz matrices with completely monotone entries, giving real eigenvalues and eigenvectors even when the matrix is not normal.
McCoy and T.T
2 Pith papers cite this work. Polarity classification is still indexing.
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2026 2verdicts
UNVERDICTED 2representative citing papers
The large-N limit of a QCD-inspired unitary matrix model admits analytic solutions for spectral density, Wilson loops, and free energy in the ungapped phase, reproducing low-T QCD, with a third-order phase transition at μ=0 and a continuous transition of at least second order at finite μ.
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Generalised eigenvector expansion of infinite Toeplitz matrices with absolutely/completely monotone entries
Proves a generalised eigenvector expansion for infinite Toeplitz matrices with completely monotone entries, giving real eigenvalues and eigenvectors even when the matrix is not normal.
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Large-$N$ Dynamics of a QCD-Inspired Unitary Matrix Model
The large-N limit of a QCD-inspired unitary matrix model admits analytic solutions for spectral density, Wilson loops, and free energy in the ungapped phase, reproducing low-T QCD, with a third-order phase transition at μ=0 and a continuous transition of at least second order at finite μ.