The sine process under the influence of a varying potential

@article{Bothner2018TheSP,
  title={The sine process under the influence of a varying potential},
  author={Thomas Bothner and Percy Deift and Alexander Its and I. V. Krasovsky},
  journal={Journal of Mathematical Physics},
  year={2018}
}
We review the authors' recent work \cite{BDIK1,BDIK2,BDIK3} where we obtain the uniform large $s$ asymptotics for the Fredholm determinant $D(s,\gamma):=\det(I-\gamma K_s\upharpoonright_{L^2(-1,1)})$, $0\leq\gamma\leq 1$. The operator $K_s$ acts with kernel $K_s(x,y)=\sin(s(x-y))/(\pi(x-y))$ and $D(s,\gamma)$ appears for instance in Dyson's model \cite{Dyson2} of a Coulomb log-gas with varying external potential or in the bulk scaling analysis of the thinned GUE \cite{BP}. 
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References

SHOWING 1-10 OF 26 REFERENCES
On the Asymptotic Behavior of a Log Gas in the Bulk Scaling Limit in the Presence of a Varying External Potential I
We study the determinant $${\det(I-\gamma K_s), 0 < \gamma < 1}$$det(I-γKs),0<γ<1 , of the integrable Fredholm operator Ks acting on the interval (−1, 1) with kernel $${K_s(\lambda, \mu)= \frac{\sin
Large Deformations of the Tracy–Widom Distribution I: Non-oscillatory Asymptotics
We analyze the left-tail asymptotics of deformed Tracy–Widom distribution functions describing the fluctuations of the largest eigenvalue in invariant random matrix ensembles after removing each soft
From gap probabilities in random matrix theory to eigenvalue expansions
We present a method to derive asymptotics of eigenvalues for trace-class integral operators K : L 2 ( J ; d λ ) ⥀ ?> , acting on a single interval J ⊂ R ?> , which belongs to the ring of integrable
On the asymptotic behavior of a log gas in the bulk scaling limit in the presence of a varying external potential ”
s of Invited Talks Louis Pierre Arguin City University of New York “The maxima of the Riemann zeta function in a short interval of the critical line” A conjecture of Fyodorov, Hiary & Keating states
On the analysis of incomplete spectra in random matrix theory through an extension of the Jimbo–Miwa–Ueno differential
Asymptotic behavior of spacing distributions for the eigenvalues of random matrices
It is known that the probability Eβ(0, S) that an arbitrary interval of length S contains none of the eigenvalues of a random matrix chosen from the orthogonal (β = 1), unitary (β = 2) or symplectic
Dyson's Constant in the Asymptotics of the Fredholm Determinant of the Sine Kernel
AbstractWe prove that the asymptotics of the Fredholm determinant of I−Kα, where Kα is the integral operator with the sine kernel on the interval [0, α], are given by This formula was conjectured
The Asymptotics of a Continuous Analogue of Orthogonal Polynomials
Szego polynomials are associated with weight functions on the unit circle. M. G. Krein introduced a continuous analogue of these, a family of entire functions of exponential type associated with a
Toeplitz and Wiener-Hopf determinants with piecewise continuous symbols
Deformations of the Tracy-Widom distribution.
TLDR
Two models in which Tracy-Widom distribution undergoes transformations are considered, one of which introduces disorder in the Gaussian ensembles by superimposing an external source of randomness, and the other consists of removing at random a fraction of eigenvalues of a random matrix.
...
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