Your search keyword '"Baik, Jinho"' showing total 245 results

1. Pinched-up periodic KPZ fixed point

Author

Baik, Jinho and Liu, Zhipeng

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

The periodic KPZ fixed point is the conjectural universal limit of the KPZ universality class models on a ring when both the period and time critically tend to infinity. For the case of the periodic narrow wedge initial condition, we consider the conditional distribution when the periodic KPZ fixed point is unusually large at a particular position and time. We prove a conditional limit theorem up to the ``pinch-up" time. When the period is large enough, the result is the same as that for the KPZ fixed point on the line obtained by Liu and Wang in 2022. We identify the regimes in which the result changes and find probabilistic descriptions of the limits., Comment: 43 pages, Theorem 1.8 is added, some typos are corrected

Published

2024

2. Differential equations for the KPZ and periodic KPZ fixed points

Author

Baik, Jinho, Prokhorov, Andrei, and Silva, Guilherme L. F.

Subjects

Mathematics - Probability, Mathematical Physics, Mathematics - Classical Analysis and ODEs, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

The KPZ fixed point is a 2d random field, conjectured to be the universal limiting fluctuation field for the height function of models in the KPZ universality class. Similarly, the periodic KPZ fixed point is a conjectured universal field for spatially periodic models. For both fields, their multi-point distributions in the space-time domain have been computed recently. We show that for the case of the narrow-wedge initial condition, these multi-point distributions can be expressed in terms of so-called integrable operators. We then consider a class of operators that include the ones arising from the KPZ and the periodic KPZ fixed points, and find that they are related to various matrix integrable differential equations such as coupled matrix mKdV equations, coupled matrix NLS equations with complex time, and matrix KP-II equations. When applied to the KPZ fixed points, our results extend previously known differential equations for one-point distributions and equal-time, multi-position distributions to multi-time, multi-position setup.

Published

2022

3. KPZ limit theorems

Author

Baik, Jinho

Subjects

Mathematics - Probability

Abstract

One-dimensional interacting particle systems, 1+1 random growth models, and two-dimensional directed polymers define 2d height fields. The KPZ universality conjecture posits that an appropriately scaled height function converges to a model-independent universal random field for a large class of models. We survey limit theorems for a few models and discuss changes that arise in different domains. In particular, we present recent results on periodic domains. We also comment on integrable probability models, integrable differential equations, and universality., Comment: 19 pages, 13 figures, a survey paper to appear in 2022 ICM proceedings, two references [52, 67] are added in the revision

Published

2022

4. Differential Equations for the KPZ and Periodic KPZ Fixed Points

Author

Baik, Jinho, Prokhorov, Andrei, and Silva, Guilherme L. F.

Published

2023

5. Spherical spin glass model with external field

Author

Baik, Jinho, Collins-Woodfin, Elizabeth, Doussal, Pierre Le, and Wu, Hao

Subjects

Condensed Matter - Disordered Systems and Neural Networks, Mathematical Physics, Mathematics - Probability

Abstract

We analyze the free energy and the overlaps in the 2-spin spherical Sherrington Kirkpatrick spin glass model with an external field for the purpose of understanding the transition between this model and the one without an external field. We compute the limiting values and fluctuations of the free energy as well as three types of overlaps in the setting where the strength of the external field goes to zero as the dimension of the spin variable grows. In particular, we consider overlaps with the external field, the ground state, and a replica. Our methods involve a contour integral representation of the partition function along with random matrix techniques. We also provide computations for the matching between different scaling regimes. Finally, we discuss the implications of our results for susceptibility and for the geometry of the Gibbs measure. Some of the findings of this paper are confirmed rigorously by Landon and Sosoe in their recent paper which came out independently and simultaneously., Comment: 75 pages, 9 figures, 5 tables. Version 2: a few small typos are corrected. One author's last name (Collins-Woodfin) is changed from version 1. Version 3: corrected a few small typos and added one reference [11]

Published

2020

6. Limiting one-point distribution of periodic TASEP

Author

Baik, Jinho, Liu, Zhipeng, and Silva, Guilherme L. F.

Subjects

Mathematics - Probability

Abstract

The relaxation time limit of the one-point distribution of the spatially periodic totally asymmetric simple exclusion process is expected to be the universal one point distribution for the models in the KPZ universality class in a periodic domain. Unlike the infinite line case, the limiting one point distribution depends non-trivially on the scaled time parameter. We study several properties of this distribution for the case of the periodic step and flat initial conditions. We show that the distribution changes from a Tracy-Widom distribution in the small time limit to the Gaussian distribution in the large time limit, and also obtain right tail estimate for all time. Furthermore, we establish a connection to integrable differential equations such as the KP equation, coupled systems of mKdV and nonlinear heat equations, and the KdV equation., Comment: 64 pages, 8 figures

Published

2020

7. Edge distribution of thinned real eigenvalues in the real Ginibre ensemble

Author

Baik, Jinho and Bothner, Thomas

Subjects

Mathematical Physics, Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems, Primary 60B20, Secondary 45M05, 60G70

Abstract

This paper is concerned with the explicit computation of the limiting distribution function of the largest real eigenvalue in the real Ginibre ensemble when each real eigenvalue has been removed independently with constant likelihood. We show that the recently discovered integrable structures in \cite{BB} generalize from the real Ginibre ensemble to its thinned equivalent. Concretely, we express the aforementioned limiting distribution function as a convex combination of two simple Fredholm determinants and connect the same function to the inverse scattering theory of the Zakharov-Shabat system. As corollaries, we provide a Zakharov-Shabat evaluation of the ensemble's real eigenvalue generating function and obtain precise control over the limiting distribution function's tails. The latter part includes the explicit computation of the usually difficult constant factors., Comment: 36 pages, 5 figures

Published

2020

8. Periodic TASEP with general initial conditions

Author

Baik, Jinho and Liu, Zhipeng

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

We consider the one-dimensional totally asymmetric simple exclusion process with an arbitrary initial condition in a spatially periodic domain, and obtain explicit formulas for the multi-point distributions in the space-time plane. The formulas are given in terms of an integral involving a Fredholm determinant. We then evaluate the large-time, large-period limit in the relaxation time scale, which is the scale such that the system size starts to affect the height fluctuations. The limit is obtained assuming certain conditions on the initial condition, which we show that the step, flat, and step-flat initial conditions satisfy. Hence, we obtain the limit theorem for these three initial conditions in the periodic model, extending the previous work on the step initial condition. We also consider uniform random and uniform-step random initial conditions., Comment: 77 pages, 12 figures

Published

2019

9. Edge Distribution of Thinned Real Eigenvalues in the Real Ginibre Ensemble

Author

Baik, Jinho and Bothner, Thomas

Published

2022

10. The largest real eigenvalue in the real Ginibre ensemble and its relation to the Zakharov-Shabat system

Author

Baik, Jinho and Bothner, Thomas

Subjects

Mathematical Physics, Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems, Primary 60B20, Secondary 45M05, 60G70

Abstract

The real Ginibre ensemble consists of $n\times n$ real matrices ${\bf X}$ whose entries are i.i.d. standard normal random variables. In sharp contrast to the complex and quaternion Ginibre ensemble, real eigenvalues in the real Ginibre ensemble attain positive likelihood. In turn, the spectral radius $R_n=\max_{1\leq j\leq n}|z_j({\bf X})|$ of the eigenvalues $z_j({\bf X})\in\mathbb{C}$ of a real Ginibre matrix ${\bf X}$ follows a different limiting law (as $n\rightarrow\infty$) for $z_j({\bf X})\in\mathbb{R}$ than for $z_j({\bf X})\in\mathbb{C}\setminus\mathbb{R}$. Building on previous work by Rider, Sinclair \cite{RS} and Poplavskyi, Tribe, Zaboronski \cite{PTZ}, we show that the limiting distribution of $\max_{j:z_j\in\mathbb{R}}z_j({\bf X})$ admits a closed form expression in terms of a distinguished solution to an inverse scattering problem for the Zakharov-Shabat system. As byproducts of our analysis we also obtain a new determinantal representation for the limiting distribution of $\max_{j:z_j\in\mathbb{R}}z_j({\bf X})$ and extend recent tail estimates in \cite{PTZ} via nonlinear steepest descent techniques., Comment: 34 pages, 13 figures; the slight title change in version 3 reflects the reworking of Theorem 1.5

Published

2018

11. Ferromagnetic to paramagnetic transition in spherical spin glass

Author

Baik, Jinho, Lee, Ji Oon, and Wu, Hao

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

We consider the spherical spin glass model defined by a combination of the pure 2-spin spherical Sherrington-Kirkpatrick Hamiltonian and the ferromagnetic Curie-Weiss Hamiltonian. In the large system limit, there is a two-dimensional phase diagram with respect to the temperature and the coupling strength. The phase diagram is divided into three regimes; ferromagnetic, paramagnetic, and spin glass regimes. The fluctuations of the free energy are known in each regime. In this paper, we study the transition between the ferromagnetic regime and the paramagnetic regime in a critical scale., Comment: 41pages, 2 figures

Published

2018

12. Free energy of bipartite spherical Sherrington--Kirkpatrick model

Author

Baik, Jinho and Lee, Ji Oon

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

We consider the free energy of the bipartite spherical Sherrington--Kirkpatrick model. We find the critical temperature and prove the limiting free energy for all non-critical temperature. We also show that the law of the fluctuation of the free energy converges to the Gaussian distribution when the temperature is above the critical temperature, and to the GOE Tracy--Widom distribution when the temperature is below the critical temperature. The result is universal, and the analysis is applicable to a more general setting including the case where the disorders are non-identically distributed., Comment: 43 pages

Published

2017

13. Multi-point distribution of periodic TASEP

Author

Baik, Jinho and Liu, Zhipeng

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

The height fluctuations of the models in the KPZ class are expected to converge to a universal process. The spatial process at equal time is known to converge to the Airy process or its variations. However, the temporal process, or more generally the two-dimensional space-time fluctuation field, is less well understood. We consider this question for the periodic TASEP (totally asymmetric simple exclusion process). For a particular initial condition, we evaluate the multi-time and multi-location distribution explicitly in terms of a multiple integral involving a Fredholm determinant. We then evaluate the large time limit in the so-called relaxation time scale., Comment: 59 pages,7 figures, corrected some typos, modified Remarks 2.4 and 2.6

Published

2017

14. Facilitated exclusion process

Author

Baik, Jinho, Barraquand, Guillaume, Corwin, Ivan, and Suidan, Toufic

Subjects

Mathematics - Probability, Condensed Matter - Statistical Mechanics, Mathematical Physics, 60K35, 60G55, 82C23, 60B20

Abstract

We study the Facilitated TASEP, an interacting particle system on the one dimensional integer lattice. We prove that starting from step initial condition, the position of the rightmost particle has Tracy Widom GSE statistics on a cube root time scale, while the statistics in the bulk of the rarefaction fan are GUE. This uses a mapping with last-passage percolation in a half-quadrant which is exactly solvable through Pfaffian Schur processes. Our results further probe the question of how first particles fluctuate for exclusion processes with downward jump discontinuities in their limiting density profiles. Through the Facilitated TASEP and a previously studied MADM exclusion process we deduce that cube-root time fluctuations seem to be a common feature of such systems. However, the statistics which arise are shown to be model dependent (here they are GSE, whereas for the MADM exclusion process they are GUE). We also discuss a two-dimensional crossover between GUE, GOE and GSE distribution by studying the multipoint distribution of the first particles when the rate of the first one varies. In terms of half-space last passage percolation, this corresponds to last passage times close to the boundary when the size of the boundary weights is simultaneously scaled close to the critical point., Comment: 26 pages. This paper results from splitting the v1 of arXiv:1606.00525 in two parts. This paper contains our results on the facilitated exclusion process, as well as a detailed derivation of crossover kernels. The v2 of arXiv:1606.00525 contains only our results on last passage percolation in a half-space

Published

2017

15. THE LARGEST REAL EIGENVALUE IN THE REAL GINIBRE ENSEMBLE AND ITS RELATION TO THE ZAKHAROV–SHABAT SYSTEM

Author

Baik, Jinho and Bothner, Thomas

Published

2020

16. TASEP on a ring in sub-relaxation time scale

Author

Baik, Jinho and Liu, Zhipeng

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

Interacting particle systems in the KPZ universality class on a ring of size $L$ with $O(L)$ number of particles are expected to change from KPZ dynamics to equilibrium dynamics at the so-called relaxation time scale $t=O(L^{3/2})$. In particular the system size is expected to have little effect to the particle fluctuations in the sub-relaxation time scale $t\ll L^{3/2}$. We prove that this is indeed the case for the totally asymmetric simple exclusion process (TASEP) with two types of initial conditions. For flat initial condition, we show that the particle fluctuations are given by the Airy$_1$ process as in the infinite TASEP with flat initial condition. On the other hand, the TASEP on a ring with step initial condition is equivalent to the periodic TASEP with a certain shock initial condition. We compute the fluctuations explicitly both away from and near the shocks for the infinite TASEP with same initial condition, and then show that the periodic TASEP has same fluctuations in the sub-relaxation time scale., Comment: 32 pages, 12 figures

Published

2016

17. Fluctuations of the free energy of the spherical Sherrington-Kirkpatrick model with ferromagnetic interaction

Author

Baik, Jinho and Lee, Ji Oon

Subjects

Mathematics - Probability

Abstract

We consider a spherical spin system with pure 2-spin spherical Sherrington-Kirkpatrick Hamiltonian with ferromagnetic Curie-Weiss interaction. The system shows a two-dimensional phase transition with respect to the temperature and the coupling constant. We compute the limiting distributions of the free energy for all parameters away from the critical values. The zero temperature case corresponds to the well-known phase transition of the largest eigenvalue of a rank 1 spiked random symmetric matrix. As an intermediate step, we establish a central limit theorem for the linear statistics of rank 1 spiked random symmetric matrices., Comment: 45 pages, references added

Published

2016

18. Pfaffian Schur processes and last passage percolation in a half-quadrant

Author

Baik, Jinho, Barraquand, Guillaume, Corwin, Ivan, and Suidan, Toufic

Subjects

Mathematics - Probability, Condensed Matter - Statistical Mechanics, Mathematical Physics, 60K35, 60G55, 82C23, 05E05, 60B20

Abstract

We study last passage percolation in a half-quadrant, which we analyze within the framework of Pfaffian Schur processes. For the model with exponential weights, we prove that the fluctuations of the last passage time to a point on the diagonal are either GSE Tracy-Widom distributed, GOE Tracy-Widom distributed, or Gaussian, depending on the size of weights along the diagonal. Away from the diagonal, the fluctuations of passage times follow the GUE Tracy-Widom distribution. We also obtain a two-dimensional crossover between the GUE, GOE and GSE distribution by studying the multipoint distribution of last passage times close to the diagonal when the size of the diagonal weights is simultaneously scaled close to the critical point. We expect that this crossover arises universally in KPZ growth models in half-space. Along the way, we introduce a method to deal with diverging correlation kernels of point processes where points collide in the scaling limit., Comment: v4: minor typos corrected. v3: 58 pages, to appear in Annals of Probability. The initial submission arXiv:1606.00525v1 has been splitted in two parts. This paper contains only the results on last passage percolation. The results on the facilitated TASEP appear in arXiv:1707.01923

Published

2016

19. Fluctuations of TASEP on a ring in relaxation time scale

Author

Baik, Jinho and Liu, Zhipeng

Subjects

Mathematical Physics, Mathematics - Probability

Abstract

We consider the totally asymmetric simple exclusion process on a ring with flat and step initial conditions. We assume that the size of the ring and the number of particles tend to infinity proportionally and evaluate the fluctuations of tagged particles and currents. The crossover from the KPZ dynamics to the equilibrium dynamics occurs when the time is proportional to the 3/2 power of the ring size. We compute the limiting distributions in this relaxation time scale. The analysis is based on an explicit formula of the finite-time one-point distribution obtained from the coordinate Bethe ansatz method., Comment: 51 pages, 9 figures, the error term in (8.15) is corrected

Published

2016

20. Fluctuations of the free energy of the spherical Sherrington-Kirkpatrick model

Author

Baik, Jinho and Lee, Ji Oon

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

The spherical Sherrington-Kirkpatrick model is a spherical mean field model for spin glass. We consider the fluctuations of the free energy at arbitrary non-critical temperature for the 2-spin model with no magnetic field. We show that in the high temperature regime the law of the fluctuations converges to the Gaussian distribution just like in the Sherrington-Kirtkpatrick model. We show, on the other hand, that the law of the fluctuations is given by the GOE Tracy-Widom distribution in the low temperature regime. The orders of the fluctuations are markedly different in these two regimes. A universality of the limit law is also proved., Comment: 41 pages, reference added

Published

2015

21. Periodic TASEP with general initial conditions

Author

Baik, Jinho and Liu, Zhipeng

Published

2021

22. Batch latency analysis and phase transitions for a tandem of queues with exponentially distributed service times

Author

Baik, Jinho and Nadakuditi, Raj Rao

Subjects

Mathematics - Probability, Computer Science - Information Theory

Abstract

We analyze the latency or sojourn time L(m,n) for the last customer in a batch of n customers to exit from the m-th queue in a tandem of m queues in the setting where the queues are in equilibrium before the batch of customers arrives at the first queue. We first characterize the distribution of L(m,n) exactly for every m and n, under the assumption that the queues have unlimited buffers and that each server has customer independent, exponentially distributed service times with an arbitrary, known rate. We then evaluate the first two leading order terms of the distributions in the large m and n limit and bring into sharp focus the existence of phase transitions in the system behavior. The phase transition occurs due to the presence of either slow bottleneck servers or a high external arrival rate. We determine the critical thresholds for the service rate and the arrival rate, respectively, about which this phase transition occurs; it turns out that they are the same. This critical threshold depends, in a manner we make explicit, on the individual service rates, the number of customers and the number of queues but not on the external arrival rate., Comment: To be publised in Queuing Systems: Theory and Applications

Published

2014

23. On the average of the Airy process and its time reversal

Author

Baik, Jinho and Liu, Zhipeng

Subjects

Mathematics - Probability

Abstract

We show that the supremum of the average of the Airy process and its time reversal minus a parabola is distributed as the maximum of two independent GUE Tracy-Widom random variables. The proof is obtained by considering a directed last passage percolation model with a rotational symmetry in two different ways. We also review other known identities between the Airy process and the Tracy-Widom distributions., Comment: 12 pages

Published

2013

24. Circular unitary ensemble with highly oscillatory potential

Author

Baik, Jinho

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

We study the effect of highly oscillatory potentials to the eigenvalues of a random matrix. Consider the circular unitary ensembles with an external potential which is periodic with the period comparable to the average spacing of the eigenvalues. We show that in this case the density of states is periodic and does not converge in the large matrix limit, but the local correlation functions converge to some simple combinations of the sine kernel and the potential. We evaluate the correlation functions exactly and also asymptotically., Comment: 13 pages, 4 figures. An important new reference [5] is added

Published

2013

25. Facilitated Exclusion Process

Author

Baik, Jinho, Barraquand, Guillaume, Corwin, Ivan, Suidan, Toufic, Norwegian University of Science &, Celledoni, Elena, editor, Di Nunno, Giulia, editor, Ebrahimi-Fard, Kurusch, editor, and Munthe-Kaas, Hans Zanna, editor

Published

2018

26. Discrete Toeplitz/Hankel determinants and the width of non-intersecting processes

Author

Baik, Jinho and Liu, Zhipeng

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

We show that the ratio of a discrete Toeplitz/Hankel determinant and its continuous counterpart equals a Freholm determinant involving continuous orthogonal polynomials. This identity is used to evaluate a triple asymptotic of some discrete Toeplitz/Hankel determinants which arise in studying non-intersecting processes. We show that the asymptotic fluctuations of the width of such processes are given by the GUE Tracy-Widom distribution. This result leads us to an identity between the GUE Tracy-Widom distribution and the maximum of the sum of two independent Airy processes minus a parabola. We provide an independent proof of this identity., Comment: 30 pages, 3 figures

Published

2012

27. Convergence of the two-point function of the stationary TASEP

Author

Baik, Jinho, Ferrari, Patrik L., and Péché, Sandrine

Subjects

Mathematical Physics, 82C22, 60K35, 15A52

Abstract

We consider the two-point function of the totally asymmetric simple exclusion process with stationary initial conditions. The two-point function can be expressed as the discrete Laplacian of the variance of the associated height function. The limit of the distribution function of the appropriately scaled height function was obtained previously by Ferrari and Spohn. In this paper we show that the convergence can be improved to the convergence of moments. This implies the convergence of the two-point function in a weak sense along the near-characteristic direction as time tends to infinity, thereby confirming the conjecture in the paper of Ferrari and Spohn., Comment: LaTeX, 18 pages, 2 figures; Minor corrections

Published

2012

28. On a relationship between high rank cases and rank one cases of Hermitian random matrix models with external source

Author

Baik, Jinho and Wang, Dong

Subjects

Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We prove an identity on Hermitian random matrix models with external source relating the high rank cases to the rank 1 cases. This identity was proved and used in a previous paper of ours to study the asymptotics of the top eigenvalues. In this paper, we give an alternative, more conceptual proof of this identity based on a connection between the Hermitian matrix models with external source and the discrete KP hierarchy. This connection is obtained using the vertex operator method of Adler and van Moerbeke. The desired identity then follows from the Fay-like identity of the discrete KP tau vector., Comment: 16 pages, no figures

Published

2012

29. On the joint distribution of the maximum and its position of the Airy2 process minus a parabola

Author

Baik, Jinho, Liechty, Karl, and Schehr, Gregory

Subjects

Nonlinear Sciences - Exactly Solvable and Integrable Systems, Mathematical Physics, Mathematics - Probability

Abstract

The maximal point of the Airy2 process minus a parabola is believed to describe the scaling limit of the end-point of the directed polymer in a random medium, which was proved to be true for a few specific cases. Recently two different formulas for the joint distribution of the location and the height of this maximal point were obtained, one by Moreno Flores, Quastel and Remenik, and the other by Schehr. The first formula is given in terms of the Airy function and an associated operator, and the second formula is expressed in terms of the Lax pair equations of the Painleve II equation. We give a direct proof that these two formulas are the same., Comment: 15 pages, no figure, minor revision, to appear in J.Math.Phys

Published

2012

30. Universality for directed polymers in thin rectangles

Author

Auffinger, Antonio, Baik, Jinho, and Corwin, Ivan

Subjects

Mathematics - Probability, Mathematical Physics, 60K35, 82D30

Abstract

We consider the fluctuations of the free energy of positive temperature directed polymers in thin rectangles (N,N^{\alpha}), \alpha < 3/14. For general weight distributions with finite fourth moment we prove that the distribution of these fluctuations converges as N goes to infinity to the GUE Tracy-Widom distribution., Comment: 12 pages

Published

2012

31. Limiting distribution of maximal crossing and nesting of Poissonized random matchings

Author

Baik, Jinho and Jenkins, Robert

Subjects

Mathematics - Probability, Mathematical Physics, Mathematics - Combinatorics

Abstract

The notion of $r$-crossing and $r$-nesting of a complete matching was introduced and a symmetry property was proved by Chen et al. [Trans. Amer. Math. Soc. 359 (2007) 1555-1575]. We consider random matchings of large size and study their maximal crossing and their maximal nesting. It is known that the marginal distribution of each of them converges to the GOE Tracy-Widom distribution. We show that the maximal crossing and the maximal nesting becomes independent asymptotically, and we evaluate the joint distribution for the Poissonized random matchings explicitly to the first correction term. This leads to an evaluation of the asymptotic of the covariance. Furthermore, we compute the explicit second correction term in the distribution function of two objects: (a) the length of the longest increasing subsequence of Poissonized random permutation and (b) the maximal crossing, and hence also the maximal nesting, of Poissonized random matching., Comment: Published in at http://dx.doi.org/10.1214/12-AOP781 the Annals of Probability (http://www.imstat.org/aop/) by the Institute of Mathematical Statistics (http://www.imstat.org)

Published

2011

32. On the largest eigenvalue of a Hermitian random matrix model with spiked external source II. Higher rank cases

Author

Baik, Jinho and Wang, Dong

Subjects

Mathematical Physics, Mathematics - Classical Analysis and ODEs, Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems, 60B20 (Primary) 37K10, 15B52, 41A60 (Secondary)

Abstract

This is the second part of a study of the limiting distributions of the top eigenvalues of a Hermitian matrix model with spiked external source under a general external potential. The case when the external source is of rank one was analyzed in an earlier paper. In the present paper we extend the analysis to the higher rank case. If all the eigenvalues of the external source are less than a critical value, the largest eigenvalue converges to the right end-point of the support of the equilibrium measure as in the case when there is no external source. On the other hand, if an external source eigenvalue is larger than the critical value, then an eigenvalue is pulled off from the support of the equilibrium measure. This transition is continuous, and is universal, including the fluctuation laws, for convex potentials. For non-convex potentials, two types of discontinuous transitions are possible to occur generically. We evaluate the limiting distributions in each case for general potentials including those whose equilibrium measure have multiple intervals for their support., Comment: 51 pages, 1 figure. This is the final version, to appear in IMRN. Title is changed slightly

Published

2011

33. On the largest eigenvalue of a Hermitian random matrix model with spiked external source I. Rank one case

Author

Baik, Jinho and Wang, Dong

Subjects

Mathematical Physics, Mathematics - Classical Analysis and ODEs, Mathematics - Probability, 60B20 (Primary), 15B52, 41A60 (secondary)

Abstract

Consider a Hermitian matrix model under an external potential with spiked external source. When the external source is of rank one, we compute the limiting distribution of the largest eigenvalue for general, regular, analytic potential for all values of the external source. There is a transitional phenomenon, which is universal for convex potentials. However, for non-convex potentials, new types of transition may occur. The higher rank external source is analyzed in the subsequent paper., Comment: 61 pages, 10 figures, typos corrected

Published

2010

34. Limit process of stationary TASEP near the characteristic line

Author

Baik, Jinho, Ferrari, Patrik L., and Péché, Sandrine

Subjects

Mathematical Physics, Condensed Matter - Statistical Mechanics, Mathematics - Combinatorics, 82C22, 60K35, 15A52

Abstract

The totally asymmetric simple exclusion process (TASEP) on Z with the Bernoulli-rho measure as initial conditions, 0

Published

2009

35. Total integrals of global solutions to Painleve II

Author

Baik, Jinho, Buckingham, Robert, DiFranco, Jeffery, and Its, Alexander

Subjects

Mathematics - Classical Analysis and ODEs, Mathematical Physics, 33E17, 35Q15, 15A52

Abstract

We evaluate the total integral from negative infinity to positive infinity of all global solutions to the Painleve II equation on the real line. The method is based on the interplay between one of the equations of the associated Lax pair and the corresponding Riemann-Hilbert problem. In addition, we evaluate the total integral of a function related to a special solution to the Painleve V equation. As a corollary, we obtain short proofs of the computation of the constant terms of the limiting gap probabilities in the edge and the bulk of the Gaussian Orthogonal and Gaussian Symplectic Ensembles that were obtained recently in [4] and [18]. We also evaluate the total integrals of certain polynomials of the Painleve functions and their derivatives. These polynomials are the densities of the first integrals of the modified Korteweg-de Vries equation. We discuss the relations of the formulae we have obtained to the classical trace formulae for the Dirac operator on the line.

Published

2008

36. On the Christoffel-Darboux kernel for random Hermitian matrices with external source

Author

Baik, Jinho

Subjects

Mathematics - Complex Variables

Abstract

Bleher and Kuijlaars, and Daems and Kuijlaars showed that the correlation functions of the eigenvalues of a random matrix from unitary ensemble with external source can be expressed in terms of the Christoffel-Darboux kernel for multiple orthogonal polynomials. We obtain a representation of this Christoffel-Darboux kernel in terms of the usual orthogonal polynomials.

Published

2008

37. PFAFFIAN SCHUR PROCESSES AND LAST PASSAGE PERCOLATION IN A HALF-QUADRANT

Author

Baik, Jinho, Barraquand, Guillaume, Corwin, Ivan, and Suidan, Toufic

Published

2018

38. Asymptotics of Tracy-Widom distributions and the total integral of a Painlev\'e II function

Author

Baik, Jinho, Buckingham, Robert, and DiFranco, Jeffery

Subjects

Mathematics - Functional Analysis, Mathematical Physics, Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems, 15A52, 33E17, 35Q15

Abstract

The Tracy-Widom distribution functions involve integrals of a Painlev\'e II function starting from positive infinity. In this paper, we express the Tracy-Widom distribution functions in terms of integrals starting from minus infinity. There are two consequences of these new representations. The first is the evaluation of the total integral of the Hastings-McLeod solution of the Painlev\'e II equation. The second is the evaluation of the constant term of the asymptotic expansions of the Tracy-Widom distribution functions as the distribution parameter approaches minus infinity. For the GUE Tracy-Widom distribution function, this gives an alternative proof of the recent work of Deift, Its, and Krasovsky. The constant terms for the GOE and GSE Tracy-Widom distribution functions are new., Comment: 29 pages, 1 figure

Published

2007

39. Random matrix central limit theorems for nonintersecting random walks

Author

Baik, Jinho and Suidan, Toufic M.

Subjects

Mathematics - Probability, 60F05 (Primary)

Abstract

We consider nonintersecting random walks satisfying the condition that the increments have a finite moment generating function. We prove that in a certain limiting regime where the number of walks and the number of time steps grow to infinity, several limiting distributions of the walks at the mid-time behave as the eigenvalues of random Hermitian matrices as the dimension of the matrices grows to infinity., Comment: Published in at http://dx.doi.org/10.1214/009117906000001105 the Annals of Probability (http://www.imstat.org/aop/) by the Institute of Mathematical Statistics (http://www.imstat.org)

Published

2006

40. A Model for the Bus System in Cuernevaca (Mexico)

Author

Baik, Jinho, Borodin, Alexei, Deift, Percy, and Suidan, Toufic

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

The bus transportation system in Cuernevaca, Mexico, has certain distinguished, innovative features and has been the subject of an intriguing, recent study by M. Krbalek and P. Seba. Krbalek and Seba analyzed the statistics of bus arrivals on Line 4 close to the city center. They studied, in particular, the bus spacing distribution and also the bus number variance measuring the fluctuations of the total number of buses arriving at a fixed location during a time interval T. Quite remarkably, it was found that these two statistics are well modeled by the Gaussian Unitary Ensemble (GUE) of random matrix theory. Our goal in this paper is to provide a plausible explanation of these observations, and to this end we introduce a microscopic model for the bus line that leads simply and directly to GUE., Comment: 9 pages, 1 figure

Published

2005

41. Painleve formulas of the limiting distributions for non-null complex sample covariance matrices

Author

Baik, Jinho

Subjects

Mathematics - Probability, Mathematics - Statistics Theory, 33E17, 60E99, 62E99

Abstract

In a recent study of large non-null sample covariance matrices, a new sequence of functions generalizing the GUE Tracy-Widom distribution of random matrix theory was obtained. This paper derives Painlev\'e formulas of these functions and use them to prove that they are indeed distribution functions. Applications of these new distribution functions to last passage percolation, queues in tandem and totally asymmetric simple exclusion process are also discussed. As a part of the proof, a representation of orthogonal polynomials on the unit circle in terms of an operator on a discrete set is presented., Comment: 24 pages, 1 Figure

Published

2005

42. Spherical Spin Glass Model with External Field

Author

Baik, Jinho, Collins-Woodfin, Elizabeth, Le Doussal, Pierre, and Wu, Hao

Published

2021

43. A GUE Central Limit Theorem and Universality of Directed First and Last Passage Site Percolation

Author

Baik, Jinho and Suidan, Toufic M.

Subjects

Mathematics - Probability

Abstract

We prove a GUE central limit theorem for random variables with finite fourth moment. We apply this theorem to prove that the directed first and last passage percolation problems in thin rectangles exhibit universal fluctuations given by the Tracy-Widom law., Comment: 8 pages. To appear in IMRN

Published

2004

44. Eigenvalues of Large Sample Covariance Matrices of Spiked Population Models

Author

Baik, Jinho and Silverstein, Jack W.

Subjects

Mathematics - Statistics Theory, Mathematics - Probability, 15A52, 60F15, 62H99

Abstract

We consider a spiked population model, proposed by Johnstone, whose population eigenvalues are all unit except for a few fixed eigenvalues. The question is to determine how the sample eigenvalues depend on the non-unit population ones when both sample size and population size become large. This paper completely determines the almost sure limits for a general class of samples., Comment: 24 pages, 6 figures

Published

2004

45. Phase transition of the largest eigenvalue for non-null complex sample covariance matrices

Author

Baik, Jinho, Arous, Gerard Ben, and Peche, Sandrine

Subjects

Mathematics - Probability

Abstract

We compute the limiting distributions of the largest eigenvalue of a complex Gaussian sample covariance matrix when both the number of samples and the number of variables in each sample become large. When all but finitely many, say $r$, eigenvalues of the covariance matrix are the same, the dependence of the limiting distribution of the largest eigenvalue of the sample covariance matrix on those distinguished $r$ eigenvalues of the covariance matrix is completely characterized in terms of an infinite sequence of new distribution functions that generalize the Tracy-Widom distributions of the random matrix theory. Especially a phase transition phenomena is observed. Our results also apply to a last passage percolation model and a queuing model., Comment: 50 pages, 8 figures

Published

2004

46. Limiting distribution of last passage percolation models

Author

Baik, Jinho

Subjects

Mathematics - Probability, Condensed Matter - Statistical Mechanics

Abstract

We survey some results and applications of last percolation models of which the limiting distribution can be evaluated., Comment: 10 pages, a survey paper. A new reference is included at p.5

Published

2003

47. Products and Ratios of Characteristic Polynomials of Random Hermitian Matrices

Author

Baik, Jinho, Deift, Percy, and Strahov, Eugene

Subjects

Mathematical Physics, Mathematics - Classical Analysis and ODEs, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We present new and streamlined proofs of various formulae for products and ratios of characteristic polynomials of random Hermitian matrices that have appeared recently in the literature., Comment: 18 pages, LaTex

Published

2003

48. Uniform Asymptotics for Polynomials Orthogonal With Respect to a General Class of Discrete Weights and Universality Results for Associated Ensembles: Announcement of Results

Author

Baik, Jinho, Kriecherbauer, Thomas, McLaughlin, Ken T. -R., and Miller, Peter D.

Subjects

Mathematics - Classical Analysis and ODEs, Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We compute the pointwise asymptotics of orthogonal polynomials with respect to a general class of pure point measures supported on finite sets as both the number of nodes of the measure and also the degree of the orthogonal polynomials become large. The class of orthogonal polynomials we consider includes as special cases the Krawtchouk and Hahn classical discrete orthogonal polynomials, but is far more general. In particular, we consider nodes that are not necessarily equally spaced. The asymptotic results are given with error bound for all points in the complex plane except for a finite union of discs of arbitrarily small but fixed radii. These exceptional discs are the neighborhoods of the so-called band edges of the associated equilibrium measure. As applications, we prove universality results for correlation functions of a general class of discrete orthogonal polynomial ensembles, and in particular we deduce asymptotic formulae with error bound for certain statistics relevant in the random tiling of a hexagon with rhombus-shaped tiles. The discrete orthogonal polynomials are characterized in terms of a a Riemann-Hilbert problem formulated for a meromorphic matrix with certain pole conditions. By extending the methods of [17, 22], we suggest a general and unifying approach to handle Riemann-Hilbert problems in the situation when poles of the unknown matrix are accumulating on some set in the asymptotic limit of interest., Comment: 28 pages, 7 figures

Published

2002

49. Painlev\'e expressions for LOE, LSE and interpolating ensembles

Author

Baik, Jinho

Subjects

Nonlinear Sciences - Exactly Solvable and Integrable Systems, Mathematics - Probability

Abstract

We consider an ensemble which interpolates the Laguerre orthogonal ensemble and the Laguerre symplectic ensemble. This interpolating ensemble was introduced earlier by the author and Rains in connection with a last passage percolation model with a symmetry condition. In this paper, we obtain a Painelev\'e V expression for the distribution of the rightmost particle of the interpolating ensemble. Special cases of this result yield the Painlev\'e V expressions for the largest eigenvalues of Laguerre orthogonal ensemble and Laguerre symplectic ensemble of finite size., Comment: LaTex, 41 pages, 2 Figures

Published

2002

50. Optimal tail estimates for directed last passage site percolation with geometric random variables

Author

Baik, Jinho, Deift, Percy, McLaughlin, Ken, Miller, Peter, and Zhou, Xin

Subjects

Mathematics - Probability, Mathematical Physics

Abstract

In this paper, we obtain optimal uniform lower tail estimates for the probability distribution of the properly scaled length of the longest up/right path of the last passage site percolation model considered by Johansson in [12]. The estimates are used to prove a lower tail moderate deviation result for the model. The estimates also imply the convergence of moments, and also provide a verification of the universal scaling law relating the longitudinal and the transversal fluctuations of the model., Comment: AMS-LaTex, 41 pages, 17 figures

Published

2001