# PDEs & Applications Seminar

The aim of these seminars is to bring speakers in the research area of partial differential equations (PDEs) to inform us about their cutting-edge research in the analysis of PDEs and mathematical modeling of natural and physical phenomena as well as engineering applications. We also encourage graduate students to present their own results as well as research papers they find interesting.

#### Jameson Graber (Baylor University)

Feb 06, 2024 9:30 am - 10:30 am

Title: The Master Equation in Mean Field Game Theory

#### Mark Veraar (Delft University of Technology)

Jan 30, 2024 9:30 am - 10:30 am

Title: Stochastic partial differential equations in critical spaces

#### Henry Shum (University of Waterloo)

Jan 23, 2024 9:30 am - 10:30 am

Title: Numerical simulations of microswimmers

#### Tyler Meadows (Queen’s)

Dec 05, 2023 9:30 am - 10:30 am

Title: Numerical methods for 1-D biofilm models

#### Anirban Dutta (Queen’s)

Nov 28, 2023 9:30 am - 10:30 am

Title: Stability properties for an abstract evolution equation

#### Zachary Selk (Queen’s)

Nov 21, 2023 9:30 am - 10:30 am

Title: Stochastic Representations of Solutions of the Wave Equation

#### Giusy Mazzone (Queen’s)

Nov 14, 2023 9:30 am - 10:30 am

Title: On the motion of a fluid-filled elastic solid (Part II)

#### Giusy Mazzone (Queen’s)

Nov 07, 2023 9:30 am - 10:30 am

Title: On the motion of a fluid-filled elastic solid

#### Somnath Pradhan (Queen’s)

Oct 31, 2023 9:30 am - 10:30 am

Title: Robustness to Incorrect Models and Discrete Approximations for Controlled Diffusions under Several Cost Criteria

#### Maria Teresa Chiri (Queen’s)

Oct 24, 2023 9:30 am - 10:30 am

Title: Conservation Laws with discontinuous flux in the conserved quantity: Hamilton- Jacobi approach

#### Maria Teresa Chiri (Queen’s)

Oct 17, 2023 9:30 am - 10:30 am

Title: Conservation law models for supply chains on a network with finite buffers

#### Anirban Dutta (Queen’s)

Oct 03, 2023 9:30 am - 10:30 am

Title: Continuous dependence of solutions to evolution equations in the setting of maximal L^p regularity (part II)