Scott Hottovy, Ph.D.
Affiliations: | 2013 | Applied Mathematics | University of Arizona, Tucson, AZ |
Area:
Applied Mathematics, MathematicsGoogle:
"Scott Hottovy"Parents
Sign in to add mentor| Jan Wehr | grad student | 2013 | University of Arizona | |
| (The Smoluchowski-Kramers approximation for stochastic differential equations with arbitrary state dependent friction.) | ||||
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Publications
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| Stechmann SN, Hottovy S. (2020) Asymptotic Models for Tropical Intraseasonal Oscillations and Geostrophic Balance Journal of Climate. 33: 4715-4737 |
| Hottovy S, McDaniel A, Wehr J. (2019) A Small Delay and Correlation Time Limit of Stochastic Differential Delay Equations with State-Dependent Colored Noise Journal of Statistical Physics. 175: 19-46 |
| Ogrosky HR, Stechmann SN, Hottovy S. (2019) Instability and nonlinear dynamics of the MJO in a tropical channel model with vertically varying convective adjustment Theoretical and Computational Fluid Dynamics. 33: 307-323 |
| Stechmann SN, Hottovy S. (2017) Unified Spectrum of Tropical Rainfall and Waves in a Simple Stochastic Model Geophysical Research Letters. 44 |
| Herzog DP, Hottovy S, Volpe G. (2016) The Small-Mass Limit for Langevin Dynamics with Unbounded Coefficients and Positive Friction Journal of Statistical Physics. 163: 659-673 |
| Birrell J, Hottovy S, Volpe G, et al. (2016) Small Mass Limit of a Langevin Equation on a Manifold Annales Henri Poincare. 1-49 |
| Hottovy S, Stechmann SN. (2015) A spatiotemporal stochastic model for tropical precipitation and water vapor dynamics Journal of the Atmospheric Sciences. 72: 4721-4738 |
| Hottovy S, Stechmann SN. (2015) Threshold models for rainfall and convection: Deterministic versus stochastic triggers Siam Journal On Applied Mathematics. 75: 861-884 |
| Hottovy S, McDaniel A, Volpe G, et al. (2015) The Smoluchowski-Kramers Limit of Stochastic Differential Equations with Arbitrary State-Dependent Friction Communications in Mathematical Physics. 336: 1259-1283 |
| Pesce G, McDaniel A, Hottovy S, et al. (2013) Stratonovich-to-Itô transition in noisy systems with multiplicative feedback. Nature Communications. 4: 2733 |