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4:00pm to 5:00pm - RH 306 - Applied and Computational Mathematics Ryan Wilkinson - (UCLA) The Role of the SIR Model in Covid-19 Data Analysis Accurate mathematical modeling allows Covid surges to be predicted and public health measures to be well-timed. Although many models exist that are able to capture Covid case trends, broad disagreements remain about how complex models must be to capture the diversity of Covid case dynamics. Here, we form clusters of Covid trajectories in U.S. states and use model-agnostic data analysis to estimate the effective population size of Covid-contracting individuals. These clusters exhibit a surprisingly small repertoire of possible case trajectories that are largely insensitive to differences in public health measures. Low levels of dynamical variation between case curve groupings suggests that the right model for capturing case trajectories may rely on only a few parameters. In turn, we revisit compartment models as the simplest models for how individuals interact and proliferate Covid. Our analysis shows why SIR models may successfully represent dynamics of disease spread even in heterogeneous populations. With this new understanding of SIR fitting in mind, we show the models predict Omicron case surges with high fidelity. |
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1:00pm to 2:00pm - RH 440R - Dynamical Systems William Wood - (UC Irvine) Uniform Hyperbolicity and the Periodic Anderson-Bernoulli Model In this talk we will focus on the notion of uniform hyperbolicity of sets of matrices, and apply it to transfer matrices related to a discrete Schrodinger operator to study its spectrum. Specifically, we will show how to apply Johnson’s Theorem that claims that a Schrodinger cocycle is uniformly hyperbolic if and only if the corresponding energy value is not in the spectrum, to the periodic Anderson-Bernoulli Model. As a result, we will prove that the spectrum of period two Anderson-Bernoulli Model consists of at most four intervals. |
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2:00pm to 3:00pm - 510R Rowland Hall - Combinatorics and Probability Lucas Benigni - (University of Chicago) Quantum Unique Ergodicity for generalized Wigner matrices We prove a strong form of delocalization of eigenvectors for general large random matrices called Quantum Unique Ergodicity. These estimates state that the mass of an eigenvector over a subset of entries tends to the uniform distribution. We are also able to prove that the fluctuations around the uniform distribution are Gaussian for a regime of a subset of entries. The proof relies on new eigenvector observables studied dynamically through the Dyson Brownian motion combined with a novel bootstrap comparison argument. |
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9:00am to 10:00am - Zoom - Inverse Problems Li LI - (Institute for Pure and Applied Mathematics, UCLA) Inverse problems for fractional parabolic equations with power type nonlinearities |
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3:00pm to 4:00pm - ISEB 6600 - Applied and Computational Mathematics Shigui Ruan - (University of Miami) The Influence of Human Behavior and Social Factors on the Spread of Infectious Diseases Human behavior and social factors play important roles in the spread of infectious diseases, understanding the influence of them on the spread of diseases can be key to improving control efforts. In this talk I will introduce some recent studies on the influence of human behavior and social factors on the spread of infectious diseases. More specifically, studies on vaccination decision using Nash equilibrium strategy, the impact of social inequalities, and the influence of psychological effect will be reviewed. Both results and problems will be presented. |
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4:00pm - MSTB 124 - Graduate Seminar Knut Solna - (UCI) TBA |