Past Probability Seminars Spring 2012: Difference between revisions
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= UW Math Probability Seminar Spring 2012 = | |||
Thursdays in 901 Van Vleck Hall at 2:25 PM, unless otherwise noted. | Thursdays in 901 Van Vleck Hall at 2:25 PM, unless otherwise noted. | ||
Organized by | Organized by [http://www.math.wisc.edu/%7Emoreno Gregorio Moreno Flores] and� [http://www.math.wisc.edu/%7Evalko Benedek Valk�] | ||
== Schedule and Abstracts == | |||
|| Thursday, January 26, || | |||
|| *[http://www.math.wisc.edu/%7Eseppalai Timo Sepp�l�inen], *University of Wisconsin - Madison || | |||
|| *The exactly solvable log-gamma polymer* || | |||
| Thursday, January 26, | | |||
| | |||
| | |||
Among 1+1 dimensional directed lattice polymers, log-gamma distributed weights are a special case that is amenable to various useful exact calculations (an ''exactly solvable'' case). This talk discusses various aspects of the log-gamma model, in particular an approach to analyzing the model through a geometric or "tropical" version of the Robinson-Schensted-Knuth correspondence. | Among 1+1 dimensional directed lattice polymers, log-gamma distributed weights are a special case that is amenable to various useful exact calculations (an ''exactly solvable'' case). This talk discusses various aspects of the log-gamma model, in particular an approach to analyzing the model through a geometric or "tropical" version of the Robinson-Schensted-Knuth correspondence. | ||
---- | ---- | ||
|| Thursday, February 9, || | |||
|| [http://www.statslab.cam.ac.uk/%7Earnab/ Arnab Sen]*, *Cambridge || | |||
| Thursday, February 9, | | || *Random Toeplitz matrices* || | ||
| | |||
| | |||
Abstract: Random Toeplitz matrices belong to the exciting area that lies at the intersection of the usual Wigner random matrices and random Schrodinger operators. In this talk I will describe two recent results on random Toeplitz matrices. First, the maximum eigenvalue, suitably normalized, converges to the 2-4 operator norm of the well-known Sine kernel. Second, the limiting eigenvalue distribution is absolutely continuous, which partially settles a conjecture made by Bryc, Dembo and Jiang (2006). I will also present several open questions and conjectures. | Abstract: Random Toeplitz matrices belong to the exciting area that lies at the intersection of the usual Wigner random matrices and random Schrodinger operators. In this talk I will describe two recent results on random Toeplitz matrices. First, the maximum eigenvalue, suitably normalized, converges to the 2-4 operator norm of the well-known Sine kernel. Second, the limiting eigenvalue distribution is absolutely continuous, which partially settles a conjecture made by Bryc, Dembo and Jiang (2006). I will also present several open questions and conjectures. | ||
This is a joint work with Balint Virag (Toronto). | This is a joint work with Balint Virag (Toronto). | ||
---- | ---- | ||
|| Thursday, February 16, || | |||
|| [http://www.math.wisc.edu/%7Evalko Benedek Valk�]*, *University of Wisconsin - Madison || | |||
| Thursday, February 16, | | || *Point processes and carousels* || | ||
| | |||
| | |||
For several classical matrix models the joint density of the eigenvalues can be written as an expression involving a Vandermonde determinant raised to the power of 1, 2 or 4. Most of these examples have beta-generalizations where this exponent is replaced by a parameter beta>0. In recent years the point process limits of various beta ensembles have been derived. The limiting processes are usually described as the spectrum of certain stochastic operators or with the help of a coupled system of SDEs. In the bulk beta Hermite case (which is the generalization of GUE) there is a nice geometric construction of the point process involving a Brownian motion in the hyperbolic plane, this is the Brownian carousel. Surprisingly, there are a number of other limit processes that have carousel like representation. We will discuss a couple of examples and some applications of these new representations. | For several classical matrix models the joint density of the eigenvalues can be written as an expression involving a Vandermonde determinant raised to the power of 1, 2 or 4. Most of these examples have beta-generalizations where this exponent is replaced by a parameter beta>0. In recent years the point process limits of various beta ensembles have been derived. The limiting processes are usually described as the spectrum of certain stochastic operators or with the help of a coupled system of SDEs. In the bulk beta Hermite case (which is the generalization of GUE) there is a nice geometric construction of the point process involving a Brownian motion in the hyperbolic plane, this is the Brownian carousel. Surprisingly, there are a number of other limit processes that have carousel like representation. We will discuss a couple of examples and some applications of these new representations. | ||
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|| Thursday, February 23 , || | |||
|| *[http://www.math.wisc.edu/%7Ekurtz Tom Kurtz], *University of Wisconsin - Madison || | |||
|| *Particle representations for SPDEs and strict positivity of solutions* || | |||
| Thursday, February 23 , | | |||
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| | |||
Stochastic partial differential equations arise naturally as limits of finite systems of interacting particles. For a variety of purposes, it is useful to keep the particles in the limit obtaining an infinite exchangeable system of stochastic differential equations. The corresponding de Finetti measure then gives the solution of the SPDE. These representations frequently simplify existence, uniqueness and convergence results. The support properties of the measure-valued solution can be studied using Girsanov change of measure techniques. The ideas will be illustrated by a model of asset prices set by an infinite system of competing traders. These latter results are joint work with Dan Crisan and Yoonjung Lee. | Stochastic partial differential equations arise naturally as limits of finite systems of interacting particles. For a variety of purposes, it is useful to keep the particles in the limit obtaining an infinite exchangeable system of stochastic differential equations. The corresponding de Finetti measure then gives the solution of the SPDE. These representations frequently simplify existence, uniqueness and convergence results. The support properties of the measure-valued solution can be studied using Girsanov change of measure techniques. The ideas will be illustrated by a model of asset prices set by an infinite system of competing traders. These latter results are joint work with Dan Crisan and Yoonjung Lee. | ||
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|| Wednesday, February 29, || | |||
|| *[http://www.math.wisc.edu/%7Earmstron/ Scott Armstrong], *University of Wisconsin - Madison || | |||
| Wednesday, February 29, | | || *PDE methods for diffusions in random environments* || | ||
| | |||
| | |||
Abstract: I will summarize some recent work with Souganidis on the stochastic homogenization of (viscous) Hamilton-Jacobi equations. The homogenization of (special cases of) these equations can be shown to be equivalent to some well-known results of Sznitman in the 90s on the quenched large deviations of Brownian motion in the presence of Poissonian obstacles. I will explain the PDE point of view and speculate on some further connections that can be made with probability. | Abstract: I will summarize some recent work with Souganidis on the stochastic homogenization of (viscous) Hamilton-Jacobi equations. The homogenization of (special cases of) these equations can be shown to be equivalent to some well-known results of Sznitman in the 90s on the quenched large deviations of Brownian motion in the presence of Poissonian obstacles. I will explain the PDE point of view and speculate on some further connections that can be made with probability. | ||
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|| Wednesday, March 7, || | |||
|| *[http://www.math.harvard.edu/%7Ebourgade/ Paul Bourgade,] *Harvard University || | |||
| Wednesday, March 7, | | || *Universality for beta ensembles* || | ||
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| | |||
Abstract: Wigner stated the general hypothesis that the distribution of eigenvalue spacings of large complicated quantum systems is universal in the sense that it depends only on the symmetry class of the physical system but not on other detailed structures. The simplest case for this hypothesis is for ensembles of large but finite dimensional matrices. Spectacular progress was done in the past two decades to prove universality of random matrices presenting an orthogonal, unitary or symplectic invariance. These models correspond to log-gases with respective inverse temperature 1, 2 or 4. I will report on a joint work with L. Erdos and H.-T. Yau, which yields local universality for the log-gases at arbitrary temperature, for analytic external potential. The involved techniques include a multiscale analysis and a local logarithmic Sobolev inequality. | Abstract: Wigner stated the general hypothesis that the distribution of eigenvalue spacings of large complicated quantum systems is universal in the sense that it depends only on the symmetry class of the physical system but not on other detailed structures. The simplest case for this hypothesis is for ensembles of large but finite dimensional matrices. Spectacular progress was done in the past two decades to prove universality of random matrices presenting an orthogonal, unitary or symplectic invariance. These models correspond to log-gases with respective inverse temperature 1, 2 or 4. I will report on a joint work with L. Erdos and H.-T. Yau, which yields local universality for the log-gases at arbitrary temperature, for analytic external potential. The involved techniques include a multiscale analysis and a local logarithmic Sobolev inequality. | ||
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|| Thursday, March 8, || | |||
|| William Stanton, UC Boulder || | |||
| Thursday, March 8, | | || *An Improved Right-Tail Upper Bound for a KPZ "Crossover Distribution" * || | ||
| | |||
| | |||
Abstract: In the last decade, there has been an explosion of research on KPZ universality: the notion that the Kardar-Parisi-Zhang stochastic PDE from statistical physics describes the fluctuations of a large class of models. In 2010, Amir, Corwin, and Quastel proved that the KPZ equation arises as a scaling limit of the Weakly Asymmetric Simple Exclusion Process (WASEP). In this sense, the KPZ equation interpolates between the KPZ universality class and the Edwards-Wilkinson class. Thus, the distributions of height functions of the KPZ equation are called the "crossover distributions." In this talk, I will introduce the notion of KPZ universality and the crossover distributions and present a new result giving an improved upper bound for the right-tail of a particular crossover distribution. | Abstract: In the last decade, there has been an explosion of research on KPZ universality: the notion that the Kardar-Parisi-Zhang stochastic PDE from statistical physics describes the fluctuations of a large class of models. In 2010, Amir, Corwin, and Quastel proved that the KPZ equation arises as a scaling limit of the Weakly Asymmetric Simple Exclusion Process (WASEP). In this sense, the KPZ equation interpolates between the KPZ universality class and the Edwards-Wilkinson class. Thus, the distributions of height functions of the KPZ equation are called the "crossover distributions." In this talk, I will introduce the notion of KPZ universality and the crossover distributions and present a new result giving an improved upper bound for the right-tail of a particular crossover distribution. | ||
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| Thursday, April 19, | | || Thursday, April 19, || | ||
| | || *[http://www.ime.unicamp.br/%7Enancy/ Nancy Garcia], *UNICAMP || | ||
| | || *Perfect simulation for chains and processes with infinite range * || | ||
Abstract: In this talk we discuss how to perform Kalikow-type decompositions for discontinuous chains of infinite memory and for interacting particle systems with interactions of infinite range. Then, we will show how this decomposition can be used to generate samples from these systems. | |||
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|| Thursday, April 26, || | |||
|| *[http://www.math.wisc.edu/%7Ekuelbs/ Jim Kuelbs], *University of Wisconsin - Madison || | |||
|| *A CLT for Empirical Processes and Empirical Quantile Processes Involving Time Dependent Data * || | |||
We establish empirical quantile process CLT's based on _n_ independent copies of a stochastic process [https://www.math.wisc.edu/wiki/images/math/d/8/8/d8896a9bb72b546bf5ac8d95f8605e52.png] that are uniform in [https://www.math.wisc.edu/wiki/images/math/9/2/0/920136016b3f1ddc7e2b3c324de1f8d2.png] and quantile levels [https://www.math.wisc.edu/wiki/images/math/b/a/3/ba319da3734404ce838411ab728d6b7f.png], where _I_ is a closed sub-interval of (0,1). Typically _E_ = [0,_T_], or a finite product of such intervals. Also included are CLT's for the empirical process based on [https://www.math.wisc.edu/wiki/images/math/4/7/7/4775f0168a6bb2a6101e0164e928d25b.png] that are uniform in [https://www.math.wisc.edu/wiki/images/math/f/9/1/f91eac6562b2faf8629279e63da044b5.png]. The process [https://www.math.wisc.edu/wiki/images/math/d/8/8/d8896a9bb72b546bf5ac8d95f8605e52.png] may be chosen from a broad collection of Gaussian processes, compound Poisson processes, stationary independent increment stable processes, and martingales. | |||
We establish empirical quantile process CLT's based on | |||
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|| Monday, April 30, || | |||
|| [http://people.maths.ox.ac.uk/~szpruch/ Lukas Szpruch], Oxford || | |||
| Monday, April 30, | | || *Antithetic multilevel Monte Carlo method. * || | ||
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Abstract: We introduce a new multilevel Monte Carlo (MLMC) estimator for multidimensional SDEs driven by Brownian motion. Giles has previously shown that if we combine a numerical approximation with strong order of convergence $O(\D t)$ with MLMC we can reduce the computational complexity to estimate expected values of functionals of SDE solutions with a root-mean-square error of $\eps$ from $O(\eps^{-3})$ to $O(\eps^{-2})$. However, in general, to obtain a rate of strong convergence higher than $O(\D t^{1/2})$ requires simulation, or approximation, of \Levy areas. Through the construction of a suitable antithetic multilevel correction estimator, we are able to avoid the simulation of \Levy areas and still achieve an $O(\D t2)$ variance for smooth payoffs, and almost an $O(\D t^{3/2})$ variance for piecewise smooth payoffs, even though there is only $O(\D t^{1/2})$ strong convergence. This results in an $O(\eps^{-2})$ complexity for estimating the value of European and Asian put and call options. We also comment on the extension of the antithetic approach to pricing Asian and barrier options. | Abstract: We introduce a new multilevel Monte Carlo (MLMC) estimator for multidimensional SDEs driven by Brownian motion. Giles has previously shown that if we combine a numerical approximation with strong order of convergence $O(\D t)$ with MLMC we can reduce the computational complexity to estimate expected values of functionals of SDE solutions with a root-mean-square error of $\eps$ from $O(\eps^{-3})$ to $O(\eps^{-2})$. However, in general, to obtain a rate of strong convergence higher than $O(\D t^{1/2})$ requires simulation, or approximation, of \Levy areas. Through the construction of a suitable antithetic multilevel correction estimator, we are able to avoid the simulation of \Levy areas and still achieve an $O(\D t2)$ variance for smooth payoffs, and almost an $O(\D t^{3/2})$ variance for piecewise smooth payoffs, even though there is only $O(\D t^{1/2})$ strong convergence. This results in an $O(\eps^{-2})$ complexity for estimating the value of European and Asian put and call options. We also comment on the extension of the antithetic approach to pricing Asian and barrier options. | ||
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|| Wednesday, May 2, || | |||
|| [http://www.math.udel.edu/~wli/ Wenbo Li], University of Delaware || | |||
| Wednesday, May 2, | | || *Probabilities of all real zeros for random polynomials * || | ||
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Abstract: There is a long history on the study of zeros of random polynomials whose coefficients are independent, identically distributed, non-degenerate random variables. We will first provide an overview on zeros of random functions and then show exact and/or asymptotic bounds on probabilities that all zeros of a random polynomial are real under various distributions. The talk is accessible to undergraduate and graduate students in any areas of mathematics. | Abstract: There is a long history on the study of zeros of random polynomials whose coefficients are independent, identically distributed, non-degenerate random variables. We will first provide an overview on zeros of random functions and then show exact and/or asymptotic bounds on probabilities that all zeros of a random polynomial are real under various distributions. The talk is accessible to undergraduate and graduate students in any areas of mathematics. | ||
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|| Thursday, May 3, || | |||
|| [http://math.bu.edu/people/isaacson/ Samuel Isaacson], Boston University || | |||
| Thursday, May 3, | | || *TBA* || | ||
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Abstract: TBA. | Abstract: TBA. | ||
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Latest revision as of 19:39, 26 August 2013
UW Math Probability Seminar Spring 2012
Thursdays in 901 Van Vleck Hall at 2:25 PM, unless otherwise noted.
Organized by Gregorio Moreno Flores and� [http://www.math.wisc.edu/%7Evalko Benedek Valk�]
Schedule and Abstracts
|| Thursday, January 26, || || *[http://www.math.wisc.edu/%7Eseppalai Timo Sepp�l�inen], *University of Wisconsin - Madison || || *The exactly solvable log-gamma polymer* ||
Among 1+1 dimensional directed lattice polymers, log-gamma distributed weights are a special case that is amenable to various useful exact calculations (an exactly solvable case). This talk discusses various aspects of the log-gamma model, in particular an approach to analyzing the model through a geometric or "tropical" version of the Robinson-Schensted-Knuth correspondence.
|| Thursday, February 9, || || Arnab Sen*, *Cambridge || || *Random Toeplitz matrices* ||
Abstract: Random Toeplitz matrices belong to the exciting area that lies at the intersection of the usual Wigner random matrices and random Schrodinger operators. In this talk I will describe two recent results on random Toeplitz matrices. First, the maximum eigenvalue, suitably normalized, converges to the 2-4 operator norm of the well-known Sine kernel. Second, the limiting eigenvalue distribution is absolutely continuous, which partially settles a conjecture made by Bryc, Dembo and Jiang (2006). I will also present several open questions and conjectures.
This is a joint work with Balint Virag (Toronto).
|| Thursday, February 16, || || [http://www.math.wisc.edu/%7Evalko Benedek Valk�]*, *University of Wisconsin - Madison || || *Point processes and carousels* ||
For several classical matrix models the joint density of the eigenvalues can be written as an expression involving a Vandermonde determinant raised to the power of 1, 2 or 4. Most of these examples have beta-generalizations where this exponent is replaced by a parameter beta>0. In recent years the point process limits of various beta ensembles have been derived. The limiting processes are usually described as the spectrum of certain stochastic operators or with the help of a coupled system of SDEs. In the bulk beta Hermite case (which is the generalization of GUE) there is a nice geometric construction of the point process involving a Brownian motion in the hyperbolic plane, this is the Brownian carousel. Surprisingly, there are a number of other limit processes that have carousel like representation. We will discuss a couple of examples and some applications of these new representations.
Joint with Balint Virag.
|| Thursday, February 23 , || || *Tom Kurtz, *University of Wisconsin - Madison || || *Particle representations for SPDEs and strict positivity of solutions* ||
Stochastic partial differential equations arise naturally as limits of finite systems of interacting particles. For a variety of purposes, it is useful to keep the particles in the limit obtaining an infinite exchangeable system of stochastic differential equations. The corresponding de Finetti measure then gives the solution of the SPDE. These representations frequently simplify existence, uniqueness and convergence results. The support properties of the measure-valued solution can be studied using Girsanov change of measure techniques. The ideas will be illustrated by a model of asset prices set by an infinite system of competing traders. These latter results are joint work with Dan Crisan and Yoonjung Lee.
|| Wednesday, February 29, || || *Scott Armstrong, *University of Wisconsin - Madison || || *PDE methods for diffusions in random environments* ||
Abstract: I will summarize some recent work with Souganidis on the stochastic homogenization of (viscous) Hamilton-Jacobi equations. The homogenization of (special cases of) these equations can be shown to be equivalent to some well-known results of Sznitman in the 90s on the quenched large deviations of Brownian motion in the presence of Poissonian obstacles. I will explain the PDE point of view and speculate on some further connections that can be made with probability.
|| Wednesday, March 7, || || *Paul Bourgade, *Harvard University || || *Universality for beta ensembles* ||
Abstract: Wigner stated the general hypothesis that the distribution of eigenvalue spacings of large complicated quantum systems is universal in the sense that it depends only on the symmetry class of the physical system but not on other detailed structures. The simplest case for this hypothesis is for ensembles of large but finite dimensional matrices. Spectacular progress was done in the past two decades to prove universality of random matrices presenting an orthogonal, unitary or symplectic invariance. These models correspond to log-gases with respective inverse temperature 1, 2 or 4. I will report on a joint work with L. Erdos and H.-T. Yau, which yields local universality for the log-gases at arbitrary temperature, for analytic external potential. The involved techniques include a multiscale analysis and a local logarithmic Sobolev inequality.
|| Thursday, March 8, || || William Stanton, UC Boulder || || *An Improved Right-Tail Upper Bound for a KPZ "Crossover Distribution" * ||
Abstract: In the last decade, there has been an explosion of research on KPZ universality: the notion that the Kardar-Parisi-Zhang stochastic PDE from statistical physics describes the fluctuations of a large class of models. In 2010, Amir, Corwin, and Quastel proved that the KPZ equation arises as a scaling limit of the Weakly Asymmetric Simple Exclusion Process (WASEP). In this sense, the KPZ equation interpolates between the KPZ universality class and the Edwards-Wilkinson class. Thus, the distributions of height functions of the KPZ equation are called the "crossover distributions." In this talk, I will introduce the notion of KPZ universality and the crossover distributions and present a new result giving an improved upper bound for the right-tail of a particular crossover distribution.
|| Thursday, April 19, || || *Nancy Garcia, *UNICAMP || || *Perfect simulation for chains and processes with infinite range * ||
Abstract: In this talk we discuss how to perform Kalikow-type decompositions for discontinuous chains of infinite memory and for interacting particle systems with interactions of infinite range. Then, we will show how this decomposition can be used to generate samples from these systems.
|| Thursday, April 26, || || *Jim Kuelbs, *University of Wisconsin - Madison || || *A CLT for Empirical Processes and Empirical Quantile Processes Involving Time Dependent Data * ||
We establish empirical quantile process CLT's based on _n_ independent copies of a stochastic process [1] that are uniform in [2] and quantile levels [3], where _I_ is a closed sub-interval of (0,1). Typically _E_ = [0,_T_], or a finite product of such intervals. Also included are CLT's for the empirical process based on [4] that are uniform in [5]. The process [6] may be chosen from a broad collection of Gaussian processes, compound Poisson processes, stationary independent increment stable processes, and martingales.
|| Monday, April 30, || || Lukas Szpruch, Oxford || || *Antithetic multilevel Monte Carlo method. * ||
Abstract: We introduce a new multilevel Monte Carlo (MLMC) estimator for multidimensional SDEs driven by Brownian motion. Giles has previously shown that if we combine a numerical approximation with strong order of convergence $O(\D t)$ with MLMC we can reduce the computational complexity to estimate expected values of functionals of SDE solutions with a root-mean-square error of $\eps$ from $O(\eps^{-3})$ to $O(\eps^{-2})$. However, in general, to obtain a rate of strong convergence higher than $O(\D t^{1/2})$ requires simulation, or approximation, of \Levy areas. Through the construction of a suitable antithetic multilevel correction estimator, we are able to avoid the simulation of \Levy areas and still achieve an $O(\D t2)$ variance for smooth payoffs, and almost an $O(\D t^{3/2})$ variance for piecewise smooth payoffs, even though there is only $O(\D t^{1/2})$ strong convergence. This results in an $O(\eps^{-2})$ complexity for estimating the value of European and Asian put and call options. We also comment on the extension of the antithetic approach to pricing Asian and barrier options.
|| Wednesday, May 2, || || Wenbo Li, University of Delaware || || *Probabilities of all real zeros for random polynomials * ||
Abstract: There is a long history on the study of zeros of random polynomials whose coefficients are independent, identically distributed, non-degenerate random variables. We will first provide an overview on zeros of random functions and then show exact and/or asymptotic bounds on probabilities that all zeros of a random polynomial are real under various distributions. The talk is accessible to undergraduate and graduate students in any areas of mathematics.
|| Thursday, May 3, || || Samuel Isaacson, Boston University || || *TBA* ||
Abstract: TBA.