Dynamical models have become a central tool used to investigate a variety of problems related to the ecology of infectious diseases. Most of these models focus on one of two scales: population-level (e.g. compartmental models) or within-host processes (e.g. immune-pathogen interactions). Important questions continue to emerge that may depend on feedbacks between multiple scales. Consequently, there is a need to improve the understanding of local transmission dynamics by linking multiple scales of disease etiology, as well as the consequences of spatial heterogeneity on disease dynamics across geographic regions. This MRC will discuss the state of the ﬁeld and develop methods to address recent and emerging issues related to multiple scales and relevant heterogeneities such as the role of contact heterogeneity in the spread of infectious disease.
The applied questions addressed in this MRC will require knowledge and techniques from such mathematical areas as differential equations, difference equations, dynamical systems, probability, statistics and various natural sciences. Interdisciplinary collaboration will be an essential component of the work, which is related to two of the NSF’s 10 Big Ideas: Growing Convergence of Research and Understanding the Rules of Life.
Applications are being accepted on MathPrograms.org until the deadline of 11:59 p.m. Eastern Time, February 15, 2020.
For questions about the application process, please contact Kim Kuda at the AMS.