Gary Froyland - Selected Publications#
1. Gary Froyland and Peter Koltai. "Detecting the birth and death of finite-time coherent sets". In: Communications on Pure and Applied Mathematics 76.12 (2023), pp. 3551-4136.
2. Gary Froyland, Dimitrios Giannakis, Benjamin Lintner, Maxwell Pike, and Joanna Slawinska. “Spectral analysis of climate dynamics with operator-theoretic approaches”, In: Nature Communications 12 (2022), pp. 6570-6590.
3. Davor Dragicevic, Gary Froyland, Cecilia Gonzalez-Tokman, and Sandro Vaienti. "A spectral approach for quenched limit theorems for random hyperbolic dynamical systems". In: Transactions of the American Mathematical Society, 373 (2020), pp. 629-664.
4. Davor Dragicevic, Gary Froyland, Cecilia Gonzalez-Tokman, and Sandro Vaienti. “A spectral approach for quenched limit theorems for random expanding dynamical systems”. In: Communications in Mathematical Physics 360.3 (2018), pp. 1121–1187.
5. Gary Froyland and Erik Kwok. "A dynamic Laplacian for identifying Lagrangian coherent structures on weighted Riemannian manifolds". In: Journal of Nonlinear Science, 30 (2020), pp. 1889–1971.
6. Gary Froyland, Cecilia Gonzalez-Tokman, and Anthony Quas. “Stochastic Stability of Lyapunov Exponents and Oseledets Splittings for Semi-invertible Matrix Cocycles”. In: Communications on Pure and Applied Mathematics 68.11 (2015), pp. 2052–2081.
7. Gary Froyland, Robyn M. Stuart, and Erik van Sebille. “How well-connected is the surface of the global ocean?” In: Chaos 24.3 (2014), p. 033126.
8. Gary Froyland, Simon Lloyd, and Anthony Quas. “Coherent structures and isolated spectrum for Perron–Frobenius cocycles”. In: Ergodic Theory and Dynamical Systems 30.3 (2010), pp. 729–756.
9. Gary Froyland, Naratip Santitissadeekorn, and Adam Monahan. “Transport in time-dependent dynamical systems: Finite-time coherent sets”. In: Chaos 20 (2010), p. 043116.
10. Natashia Boland, Irina Dumitrescu, Gary Froyland, and Ambros M. Gleixner. “LP-based disaggregation approaches to solving the open pit mining production scheduling problem with block processing selectivity”. In: Computers and Operations Research 36.4 (2009), pp. 1064–1089.