Derives precise large-N asymptotics for disconnected and connected DSFF components in the elliptic Ginibre ensemble for all γ ≥ 0, α ≥ 0, characterizing dip-ramp-plateau structures and a mesoscopic interpolating regime.
Moments at the hard edge and Rayleigh functions
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abstract
Motivated by the analogy between spectral moments of random matrices and associated zeta functions, we study inverse power trace moments of the Laguerre ensemble of dimension $N$ and inverse temperature parameter $\beta>0$. We consider a large $N$ regime determined by the low-lying eigenvalues of the ensemble known as the hard edge. In the classical cases $\beta \in \{1,2,4\}$, we obtain explicit results for the inverse moments and extend these to formulae for the corresponding Mellin transforms. In the case of general $\beta>0$, by a result of Fyodorov and Le Doussal, we obtain a different formula for the moments given as a sum over partitions. We use this to consider a low temperature limit where $\beta \to \infty$ as $N \to \infty$. In this limit, we show that the moments are given in terms of the Bessel zeta function.
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math-ph 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Dissipative Spectral Form Factor of the Complex Elliptic Ginibre Ensemble across Various Non-Hermiticity Regimes
Derives precise large-N asymptotics for disconnected and connected DSFF components in the elliptic Ginibre ensemble for all γ ≥ 0, α ≥ 0, characterizing dip-ramp-plateau structures and a mesoscopic interpolating regime.