GEORGIA KARALI

GEORGIA KARALI

Georgia Karali is a Professor at the Department of Mathematics and Applied Mathematics at University of Crete and also a collaborative member at IACM/FORTH since 2007. Her research interests include among others partial differential equations and stochastic partial differential equations.
GEORGIA
KARALI
...
Dept. of Mathematics & Applied Mathematics, Univ. of Crete, Voutes Campus, GR-710 03 Heraklion, Crete Greece
+30 2810 393729
- R Kousovista, G Karali, V Karalis (2023) Modeling the Double Peak Phenomenon in Drug Absorption Kinetics: The Case of Amisulpride, BioMedInformatics 3 (1), 177-192.
- Antonopoulou D., Bitsaki M., Karali G. (2022) The multi-dimensional stochastic Stefan financial model for a portofolio of assets, Discrete Contin. Dyn. Syst.- Ser. B, 4, 1955-1987.
- Antonopoulou, D., Karali, G., Tzirakis, K. (2021) Layer dynamics for the one dimensional ε-dependent Cahn-Hilliard/Allen-Cahn equation, Calc. Var. Partial Differential Equations, 60, 207.
- Bates, P., Fusco, G., Karali, G., (2018) Gradient dynamics: motion near a manifold of quasi-equilibria, SIAM Journal on Applied Dynamical Systems, 17, no 3, 2106-2145.
- Antonopoulou, D., Farazakis, D., Karali, G., (2018) Malliavin Calculus for the stochastic Cahn-Hilliard/Allen-Cahn equation with unbounded noise diffusion, J. Differential Equations, 265, no 7, 3168-3211, (2018).
- Antonopoulou, D., Blomker, D., Karali, G., (2018) The sharp interface limit for the stochastic Cahn-Hilliard equation, Annales Inst. Henri Poincare Probab. and Stat., 54, no 1, 280-298.
- Antonopoulou, D., Bates, P. Blomker, D., Karali, G., Millet, A., (2016). Motion of a droplet for the stochastic mass-conserving Allen-Cahn equation, SIAM J. Math. Anal. 48, no 1, 670-708.
- Antonopoulou, D., Karali, G., Millet, A., (2016). Existence and regularity of solution for a Stochastic Cahn-Hilliard/Allen-Cahn equation with un-bounded noise diffusion, J. Differential Equations, 260, 2383-2417, (2016).
- D. Antonopoulou, D. Blömker, G. Karali, Front motion in the one-dimensional stochastic Cahn-Hilliard equation, SIAM J. Math. Anal., 44, 3242-3280, (2012).
- G. Karali, M. Katsoulakis, The role of multiple microscopic mechanisms in cluster interface evolution, JDE, 235, 418-438, (2007).
Applied analysis, partial differential equations, nonlinear analysis, stochastic partial differential equations, deterministic and stochastic problems of phase change, singular perturbation problems, stochastic and deterministic dynamics, asymptotics, mean curvature flow, stochastic motion under mean curvature, kinetics of phase transitions, mathematical methods for multi-scale problems.