Assistant Professor, Department of Mathematics and Statistics

AUTHOR

Duan Chen

Tuesday, January 9th, 11:00AM-12:00 noon, Conference room

January 07, 2018 by Duan Chen

Professor:Jae Woo JEONG, Department of Mathematics, Miami University

Title:Numerical Methods for Biharmonic Equations on non-convex Domains

Abstract: Several methods constructing C1-continuous basis functions have been introduced for the numerical solutions of fourth-order partial differential equations. However, implementing these C1-continuous basis functions for biharmonic equations is complicated or may encounter some difficulties. In the framework of IGA (IsoGeometric Analysis), it is relatively easy to construct highly regular spline basis functions to deal with high order PDEs through a single patch approach. Whenever physical domains are non convex polygons, it is desirable to use IGA for PDEs on non-convex domains with multi-patches. In this case, it is not easy to make patchwise smooth B-spline functions global smooth functions.In this talk, we propose two new approaches constructing C1-continuous basis functions for biharmonic equation on non-convex domain: (i) Firstly, by modifying Bezier polynomials or B-spline functions, we construct hierarchical global C1-continuous basis functions whose imple- mentation is as simple as that of conventional FEM (Finite Element Methods). (ii) Secondly, by taking advantages of proper use of the control point, weights, and NURBS (Non-Uniform Rational B-Spline), we construct one-patch C1-continuous geometric map onto an irregular physical domain and associated C1-continuous basis functions. Hence, we can avoid the difficulties aris- ing multi patch approaches. Both of the proposed methods can be easily extended to construct highly smooth basis functions for the numerical solutions of higher order partial differential equations.

Friday, Jan 12, 11:00AM-12:00Noon, Fretwell 315

January 04, 2018 by Duan Chen

Dr. Roman Kazinnik, Data Scientist at Brighthouse Financial

Title:Deep learning and mathematical perspectives: historical developments and modern challenges

Abstract: Artificial Intelligence (AI) is often viewed as a massive parallel optimization problem, and has gained its popularity presumably due to the recent wide availability of parallel computing power. On one hand, AI departs from fundamental mathematical conceptions: it doesn’t prescribe any PDE when solving inverse problems, and AI learning algorithms do not care about dense representations in functional space. However, there is a great deal of mathematical principles that are in widely implemented by modern AI.

In this talk I am going to cover some of these techniques and principles that are deployed by AI, and familiar to the applied mathematicians. I will also show how a lack of rigorous underlying model presents, perhaps, one of the major challenges in deploying modern AI methodologies. I consider building such rigorous underlying modeling principles as one of the most interesting modern challenges applied mathematicians can find in AI.

Friday, Dec 1st, 4:00PM-5:00PM, Fretwell 206

November 16, 2017 by Duan Chen

Professor: Louis H Kauffman, Department of Mathematics, Statistics, and Computer Science University of Illinois at Chicago

Title:Graphical Invariants of Knots and Links

Abstract:This talk is joint work with Qingying Deng. We generalize the signed Tutte polynomial relationship with the Kauffman bracket model of the Jones polynomial to a new polynomial defined on signed cyclic graphs (graphs with signed edges and cyclic orders at the vertices) and show how these graphs are codings for checkerboard colorable virtual links. We show how virtualization of classical links corresponds to simple operations on the planar signed cyclic graphs. We relate our new polynomial invariant to both the bracket polynomials for virtual knots and links and to the Bollobas-Riordan polynomial.

Friday, October 13, 11:00AM-12:00Noon, Conference room

October 11, 2017 by Duan Chen

Professor Yanlai Chen , Dept of Mathematics, University of Massachusetts, Dartmouth

Title:Ultra-efficient Reduced Basis Method and Its Integration with Uncertainty Quantification

Abstract: Models of reduced computational complexity is indispensable in scenarios where a large number of numerical solutions to a parametrized problem are desired in a fast/real-time fashion. Thanks to an offline-online procedure and the recognition that the parameter-induced solution manifolds can be well approximated by finite-dimensional spaces, reduced basis method (RBM) and reduced collocation method (RCM) can improve efficiency by several orders of magnitudes. The accuracy of the RBM solution is maintained through a rigorous a posteriori error estimator whose efficient development is critical and involves fast eigensolvers. After giving a brief introduction of the RBM/RCM, this talk will show our recent work on significantly delaying the curse of dimensionality for uncertainty quantification, and new fast algorithms for speeding up the offline portion of the RBM/RCM by around 6-fold.

Wednesday, August 30, 2:00PM-3:00PM, Conference room

August 23, 2017 by Duan Chen

Professor Seokchan Kim, Dept of Mathematics, ChangWon National University, Changwon, Korea

Title:FEM to compute Numerical Solution of PDEs with Corner Singularities using SIF

Abstract: We consider the Poisson equation with homogeneous Dirichlet boundary condition defined on non convex polygonal domain with one re-entrant corner. Solution of such equation has singular behavior near that re-entrant corner and can be expressed as a sum of the regular part and the singular part. The coefficient of the singular part is called ‘the Stress Intensity Factor. The talk is to introduce a new method to obtain an accurate numerical solution for the Poisson Equation with corner singularities using the Stress Intensity Factor.

Friday, March 31, 11:00AM-12:00Noon, Conference room

March 27, 2017 by Duan Chen

Ching-Shan Chou, Department of Mathematics, The Ohio State University

Title:Cell signaling, cell morphogenesis and cell-cell communication

Abstract: Cell-to-cell communication is fundamental to biological processes which require cells to coordinate their functions. In this talk, we will present the first computer simulations of the yeast mating process, which is a model system for investigating proper cell-to-cell communication. Computer simulations revealed important robustness strategies for mating in the presence of noise. These strategies included the polarized secretion of pheromone, the presence of the alpha-factor protease Bar1, and the regulation of sensing sensitivity.

Wednesday, March 29, 3:30-4:30PM, Fretwell 315

March 15, 2017 by Duan Chen

Zhiyi Zhang, Department of Mathematics and Statistics, University of North Carolina at Charlotte

Title:Statistical Implications of Turing’s Formula

Abstract:

This talk is organized into three parts.

1. Turing’s formula is introduced. Given an iid sample from an countable alphabet under a probability distribution, Turing’s formula (introduced by Good (1953), hence also known as the Good-Turing formula) is a mind-bending non-parametric estimator of total probability associated with letters of the alphabet that are NOT represented in the sample. Many of its statistical properties were not clearly known for a stretch of nearly sixty years until recently. Some of the newly established results, including various asymptotic normal laws, are described.

2. Turing’s perspective is described. Turing’s formula brought about a new perspective (or a new characterization) of probability distributions on general countable alphabets. The new perspective in turn provides a new way to do statistics on alphabets, where the usual statistical concepts associated with random variables (on the real line) no longer exist, for example, moments, tails, coefficients of correlation, characteristic functions don’t exist on alphabets (a major challenge of modern data sciences). The new perspective, in the form of entropic basis, is introduced.

3. Several applications are presented, including estimation of information entropy and diversity indices

Friday, March 17, 10:00-11:00AM, Conference room

March 07, 2017 by Duan Chen

Mingrui Yang, Department of Radiology, Case Western Reserve University

Title:Low Rank Approximation Methods for MR Fingerprinting with Large Scale Dictionaries

Abstract: This work proposes new low rank approximation approaches with significant memory savings for large scale MR fingerprinting (MRF) problems.

We introduce a compressed MRF with randomized SVD method to significantly reduce the memory requirement for calculating a low rank approximation of large sized MRF dictionaries. We further relax this requirement by exploiting the structures of MRF dictionaries in the randomized SVD space and fitting them to low-degree polynomials to generate high resolution MRF parameter maps.

In vivo 1.5 and 3 Tesla brain scan data are used to validate the approaches. It is shown that T₁, T₂ and off-resonance maps are in good agreement with that of the standard MRF approach. Moreover, the memory savings is up to 1000 times for the MRF-FISP sequence and more than 15 times for the MRF-bSSFP sequence.

The proposed compressed MRF with randomized SVD and dictionary fitting methods are memory efficient low rank approximation methods, which can benefit the usage of MRF in clinical settings. They also have great potentials in large scale MRF problems, such as problems where multi-component chemical exchange effects are considered.

Monday, January 23rd, 3:30-4:30 PM, Conference room

January 10, 2017 by Duan Chen

Valery Romanovski, Center for Applied Mathematics and Theoretical Physics

Title: Some algebraic tools for investigation of systems of ODEs

Abstract: We give an introduction to algorithms of the elimination theory and methods for solving polynomial systems and show how they can be used for the qualitative investigation of autonomous systems of ordinary differential equations. We then apply them to study the May-Leonard system which models some ecological and chemical processes.

Thursday, January 5th, 11:00AM in Conference room

December 26, 2016 by Duan Chen

Duk-Soon Oh, Department of Mathematics, Rutgers University

Title: Domain Decomposition Methods