, 603
Probability Seminar
Anna K. Panorska, Tomasz J. Kozubowski (University of Nevada, Reno)
=== 13:15 - 14:00 ===
prof. Anna K. Panorska (University of Nevada, Reno)
From Atmospheric Rivers to Flood Risk: A Multivariate Model for Extreme Precipitation
Water resources and flood risk in the western United States are commonly driven by large scale precipitation events lasting several consecutive days. Some of the largest precipitation events are driven by the Atmospheric Rivers, the “rivers in the sky”. We propose a multivariate model for the extreme precipitation events describing their duration, intensity, and maximum. We also link it to the atmospheric flow patterns, like those producing the Atmospheric Rivers. As the most important questions related to the impact of extreme precipitation are about the risk or probability of these extreme events, our ultimate goal is to employ the statistical model along with the meteorological and statistical methods leading to estimation of these probabilities.
This talk is based on joint work with Alexander Weyant (SCRIPPS Institution of Oceanography, UC San Diego).
=== 13:15 - 14:00 ===
prof. Tomasz J. Kozubowski (University of Nevada, Reno)
Flexible Multivariate Skew Distributions via Coordinate-wise and Spectral Gaussian Mixtures
Gaussian mean - variance mixtures form a powerful and widely used framework in probability and statistics, with applications spanning hierarchical modeling, Bayesian computation, stochastic processes, and machine learning. In this talk, we consider two new families of multivariate skew distributions derived from novel extensions of the classical Gaussian mixture construction. The first extension employs coordinate-wise mixing, allowing different dimensions of the random vector to exhibit distinct skewness and tail behavior. The second is based on spectral (eigenvalue-driven) mixing, where the mixture structure is tied to the eigenvalues of the Gaussian covariance matrix, producing rich dependence patterns and highly adaptable distributional shapes. We present key analytical properties of these new distribution families, including moments, dependence structure, and infinite divisibility, and briefly discuss parameter estimation. A financial data example highlights the improved flexibility and fit provided by these models. This talk is based on joint work with Amos Natido.