Author | Title | Subject | Date | Publication Type | ||
---|---|---|---|---|---|---|
1 | Rice, Gregory | Invariance principles in functional time series analysis with applications | Analysis of Variance; Functional Data; Time Series; Weak convergence | 2015-05 | dissertation | |
2 | Reeder, Ron | Limit theorems in functional data analysis with applications | Asymptotics; Functional data analysis; Polynomial regression; Principal component analysis; Limit theorems (Probability theory) | 2011-12 | dissertation | |
3 | Martinez, Cristian | Some birational geometric aspects of moduli spaces of sheaves on surfaces via bridgeland wall-crossing | Algebraic geometry; Birational geometry; Derived categories; Stability conditions | 2015-05 | dissertation | |
4 | Kordy, Michal Adam | Efficient computational methods for electromagnetic imaging with applications to 3D magnetotellurics | Applied Mathematics; Geophysics; Mathematics | 2014-12 | dissertation | |
5 | Basinski, Andrew James | Information-use strategies in ants | Ants; Behavior; Ecology; Foraging; Spatial | 2016 | dissertation | |
6 | Zhang, Yuchen | Generic vanishing, pluri-canonical maps and volume of isolated sigularity | Pluri-canonical maps; Isolated singularity | 2014-05 | dissertation | |
7 | Miles, Christopher Edward | A hop, switch, and jump: stochasticity in models of motor-mediated intracellular transport | Mathematics; biology; biophysics | 2018 | dissertation | |
8 | Schoening, Anna | Limit theorems for random walk in a mixing random environment | Probability; Random walk in random environment | 2012-08 | dissertation | |
9 | Richins, Russell Bingham | Some applications of minimizing variational principles for the complex Helmholtz equation | Minimizing; Variational principles | 2010 | dissertation | |
10 | Brown, Adam | Arakawa-Suzuki functors for whittaker modules | 2019 | dissertation | ||
11 | McAfee, Sean | Twisted cells for real reductive lie groups | 2019 | dissertation | ||
12 | Miller, Curtis | Change point inference with renyi-type statistics | 2020 | dissertation | ||
13 | Karamched, Bhargav | Mathematical models of motor-based intracellular transport | Adiabatic Approximation; Advection-Diffusion Equation; Axonal Transport; Length Control; Molecular Motors; Vesicular Delivery | 2017 | dissertation |