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  1. Graduate Student Lunch Seminar

    Location: MSRI: Baker Board Room
    Created on Sep 03, 2015 04:06 PM PDT
  2. Graduate Student Lunch Seminar

    Location: MSRI: Baker Board Room
    Created on Sep 03, 2015 04:04 PM PDT
  3. Graduate Student Lunch Seminar

    Location: MSRI: Baker Board Room
    Created on Sep 03, 2015 04:03 PM PDT
  4. Graduate Student Lunch Seminar

    Location: MSRI: Simons Auditorium
    Created on Sep 03, 2015 04:02 PM PDT
  5. Graduate Student Lunch Seminar

    Location: MSRI: Simons Auditorium

    Dear friends,
    here's the topic of the next graduate student lunch meeting:

    The idea is to further explore the concept of "invariant measure" associated to the flow of a Hamiltonian PDE. The starting point would be Burq-Tzvetkov's 2007 "Invariant measure for a 3d nonlinear wave equation" and some ideas from Deng-Tzvetkov-Visciglia's "Invariant measures and long time behavior for the Benjamin-Ono equation" (depending on my reading speed).

    I have chosen those papers based on the following considerations. The paper by Burq and Tzvetkov is the first in their series of papers on the randomized approach to the wave equation, and it looks easier to read than the others. My hope is that it will provide some insight into the construction of invariant measures without too many technical complications. The paper by Deng, Tzvetkov and Visciglia is interesting because it obtains information on an infinite-dimensional flow by using an invariant measure and the Poincare's recurrence theorem. This is an idea that we have never seen in previous meetings.

    As usual you will find the bibliography at the following Dropbox link:


    All the best


    Hi, this sounds good.

    I also suggest finish reading the previous paper of Bourgain,
    We are still left with several "harder" case.
    I think it will be rewarding to finish this.
    If people are interested, I can also try to do a presentation.
    Created on Sep 03, 2015 04:01 PM PDT
  6. Graduate Student Lunch Seminar

    Location: MSRI: Baker Board Room
    Speakers: Xueying Yu (Massachusetts Institute of Technology), Haitian Yue (University of Massachusetts Amherst)

    We are fortunate to have Haitian and Xueying presenting results on the cubic NLS next Thursday, starting at 11am. See the message below.

    Dear Prof. Bates.
    We plan to introduce the almost sure LWP result for cubic NLS on the torus T^2, essentially based on Bourgain's paper(attached below). For the X^{s,b} part, we need also refer to the lecture #2 of Bourgain's lecture notes(attached below) and the section 2.6 of Tao's book: Nonlinear Dispersive Equations: Local and Global Analysis.
    Since there are too many cases, maybe we will just sketch a outline of the whole proof, and cover a few simple cases.
    Haitian Yue & Xueying Yu
    Created on Sep 03, 2015 08:59 AM PDT
  7. Postdoc Symposium (Part I): Wave maps with large data

    Location: MSRI: Simons Auditorium
    Speakers: Andrew Lawrie (Massachusetts Institute of Technology)

    The wave maps equation is perhaps the simplest incarnation of a geometric wave equation -- the nonlinearity arises naturally from the Riemannian structure of the target manifold. It is the hyperbolic analogue of the (elliptic) harmonic maps equation and the (parabolic) harmonic map heat flow.

    We will review some of the significant developments from the past decade concerning the asymptotic dynamics of solutions to the energy critical wave maps equation, emphasizing the crucial role that harmonic maps play in singularity formation. We will also discuss new phenomena that arise when curvature is introduced in the domain, focusing on the theory of wave maps on hyperbolic space that is being developed jointly with Sung-Jin Oh and Sohrab Shahshahani.

    Updated on Sep 18, 2015 11:31 AM PDT
  8. Graduate Student Lunch Seminar

    Location: MSRI: Baker Board Room
    Created on Sep 03, 2015 08:56 AM PDT
  9. Graduate Student Lunch Seminar

    Location: MSRI: Baker Board Room
    Created on Sep 03, 2015 08:55 AM PDT
  10. Graduate Student Lunch Seminar

    Location: MSRI: Baker Board Room
    Updated on Sep 03, 2015 02:19 PM PDT
  11. Graduate Student Lunch Seminar

    Location: MSRI: Baker Board Room
    Updated on Aug 28, 2015 03:58 PM PDT
  12. Computing critical values of quadratic Dirichlet L-functions, with an eye toward their moments.

    Location: MSRI: Simons Auditorium
    Speakers: Matthew Alderson

    Moments of L-functions has been a topic of intense research in recent years. Through the integration of random matrix theory and multiple Dirichlet series with traditional number theoretic arguments, methods for studying the moments of L-functions have been developed and, in turn, have lead to many well-posed conjectures for their behavior. In my talk, I will discuss the (integral) moments of quadratic DIrichlet L-functions evaluated at the critical point s=1/2. In particular, I will present formulas for computing the critical values for such L-functions and then compare the data for the corresponding moments to the (aforementioned) conjectured moments.
    Updated on Aug 03, 2016 05:05 AM PDT
  13. FBP-Informal Seminar

    Location: MSRI: Baker Board Room
    Speakers: TBA, Lihe Wang

    Updated on Apr 01, 2011 03:03 AM PDT
  14. Moment Polynomials for the Riemann Zeta Function

    Location: MSRI: Simons Auditorium
    Speakers: Shuntaro Yamagishi

    I will explain how we calculated the coefficients of moment
    polynomials for the Riemann zeta function for k = 4,5.., 13
    and numerically tested them against the moment polynomial conjecture.
    Updated on Aug 03, 2016 05:05 AM PDT
  15. "Computing L-functions in SAGE"

    Location: MSRI: Simons Auditorium
    Speakers: Rishikesh

    Created on Mar 23, 2011 08:26 AM PDT
  16. Imaging Edges in Random Media

    Location: MSRI: Simons Auditorium
    Speakers: Fernando Guevara Vasquez

    Pizza Lunch

    Consider the problem of imaging a reflector (target) from recordings of the echoes resulting from probing the medium with waves emanating from an array of transducers (the array response matrix). We present an algorithm that selectively illuminates the edges or the interior of an extended target by choosing particular subspaces of the array response matrix. For a homogeneous background medium, we characterize these subspaces in terms of the singular functions of a space and wave number restricting operator, which are also called generalized prolate spheroidal wave functions. We discuss results indicating what can be expected from using this algorithm when the medium fluctuates around a constant background medium and the fluctuations can be modeled as a random field.
    Updated on May 13, 2013 11:01 PM PDT
  17. Integrable Equations for Random Matrix Spectral Gap Probabilities

    Location: MSRI: Simons Auditorium
    Speakers: Igor Rumanov

    Pizza Lunch

    Connections are exposed between integrable equations for spectral gap probabilities of unitary invariant ensembles of random matrices (UE) derived by different --- Tracy-Widom (TW) and Adler-Shiota-van Moerbeke (ASvM) --- methods. Simple universal relations are obtained between these probabilities and their ratios on one side, and variables of the approach using resolvent kernels of Fredholm operators on the other side. A unified description of UE is developed in terms of universal, i.e. independent of the specific probability measure, PDEs for gap probabilities, using the correspondence of TW and ASvM variables. These considerations are based on the three-term recurrence for orthogonal polynomials (OP) and one-dimensional Toda lattice (or Toda-AKNS) integrable hierarchy whose flows are the continuous transformations between different OP bases. Similar connections exist for coupled UE. The gap probabilities for one-matrix Gaussian UE (GUE) or joint gap probabilities for coupled GUE satisfy various PDEs whose number grows with the number of spectral endpoints. With the above connections serving as a guide, minimal complete sets of independent lowest order PDEs for the GUE and for the largest eigenvalues of two-matrix coupled GUE are found.
    Updated on May 13, 2013 11:01 PM PDT
  18. The Inverse Calderon Problem for Schrödinger Operator on Riemann Surfaces

    Location: MSRI: Simons Auditorium
    Speakers: Leo tzou

    Pizza Lunch

    We show that on a smooth compact Riemann surface with boundary (M0, g) the Dirichletto- Neumann map of the Schrödinger operator â g + V determines uniquely the potential V . This seemingly analytical problem turns out to have connections with ideas in symplectic geometry and differential topology. We will discuss how these geometrical features arise and the techniques we use to treat them. This is joint work with Colin Guillarmou of CNRS Nice. The speaker is partially supported by NSF Grant No. DMS-0807502 during this work.
    Updated on May 13, 2013 11:01 PM PDT
  19. E. Nordenstam's Talk

    Location: MSRI: Simons Auditorium
    Speakers: Eric Nordenstam

    Pizza Lunch

    Updated on May 13, 2013 11:01 PM PDT
  20. Resistor Networks and Optimal Grids for Electrical Impedance Tomography with Partial Boundary Measurements

    Location: MSRI: Baker Board Room
    Speakers: Alexander Mamonov

    Pizza Lunch

    The problem of Electrical Impedance Tomography (EIT) with partial boundary measurements is to determine the electric conductivity inside a body from the simultaneous measurements of direct currents and voltages on a subset of its boundary. Even in the case of full boundary measurements the non-linear inverse problem is known to be exponentially ill-conditioned. Thus, any numerical method of solving the EIT problem must employ some form of regularization. We propose to regularize the problem by using sparse representations of the unknown conductivity on adaptive finite volume grids known as the optimal grids. Then the discretized partial data EIT problem can be reduced to solving the discrete inverse problems for resistor networks. Two distinct approaches implementing this strategy are presented. The first approach uses the results for the EIT problem with full boundary measurements, which rely on the use of resistor networks with circular graph topology. The optimal grids for such networks are essentially one dimensional objects, which can be computed explicitly. We solve the partial data problem by reducing it to the full data case using the theory of extremal quasiconformal (Teichmuller) mappings. The second approach is based on resistor networks with the pyramidal graph topology. Such network topology is better suited for the partial data problem, since it allows for explicit treatment of the inaccessible part of the boundary. We present a method of computing the optimal grids for the networks with general topology (including pyramidal), which is based on the sensitivity analysis of both the continuum and the discrete EIT problems. We present extensive numerical results for the two approaches. We demonstrate both the optimal grids and the reconstructions of smooth and discontinuous conductivities in a variety of domains. The numerical results show two main advantages of our approaches compared to the traditional optimization-based methods. First, the inversion based on resistor networks is orders of magnitude faster than any iterative algorithm. Second, our approaches are able to correctly reconstruct the conductivities of very high contrast, which usually present a challenge to the iterative or linearization-based inversion methods.
    Updated on May 13, 2013 11:01 PM PDT