Sparse antagonistic random matrices with diagonal disorder and Jacobian structure show five spectral phases; the population dynamics algorithm underestimates spectral support under strong disorder.
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A coefficient-based approach derives analytical phase boundaries and higher winding numbers in 1D non-Hermitian topological superconductors, verified via open-boundary spectra and disorder stability.
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Spectral properties and phase diagrams of sparse antagonistic random matrices with diagonal disorder and Jacobian-like structure
Sparse antagonistic random matrices with diagonal disorder and Jacobian structure show five spectral phases; the population dynamics algorithm underestimates spectral support under strong disorder.
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Higher-winding phases in one-dimensional non-Hermitian topological superconductors
A coefficient-based approach derives analytical phase boundaries and higher winding numbers in 1D non-Hermitian topological superconductors, verified via open-boundary spectra and disorder stability.