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Anna Geyer
Anna Geyer
TU Delft; formerly: University of Vienna, Universitat Autònoma de Barcelona, Spain
Verified email at tudelft.nl - Homepage
Title
Cited by
Cited by
Year
Solitary traveling water waves of moderate amplitude
A Geyer
Journal of Nonlinear Mathematical Physics 19 (supp01), 1240010, 2012
402012
Orbital stability of solitary waves of moderate amplitude in shallow water
ND Mutlubaş, A Geyer
Journal of Differential Equations 255 (2), 254-263, 2013
342013
Shallow water equations for equatorial tsunami waves
A Geyer, R Quirchmayr
Philosophical Transactions of the Royal Society A: Mathematical, Physical …, 2018
272018
On the wave length of smooth periodic traveling waves of the Camassa–Holm equation
A Geyer, J Villadelprat
Journal of differential equations 259 (6), 2317-2332, 2015
262015
Spectral stability of periodic waves in the generalized reduced Ostrovsky equation
A Geyer, DE Pelinovsky
Letters in Mathematical Physics, 2017
222017
On the number of limit cycles for perturbed pendulum equations
A Gasull, A Geyer, F Mañosas
Journal of Differential Equations 261 (3), 2141-2167, 2016
182016
Traveling surface waves of moderate amplitude in shallow water
A Gasull, A Geyer
Nonlinear Analysis: Theory, Methods & Applications 102, 105-119, 2014
182014
Linear instability and uniqueness of the peaked periodic wave in the reduced Ostrovsky equation
A Geyer, D Pelinovsky
SIAM Journal on Mathematical Analysis 51 (2), 1188-1208, 2019
152019
Symmetric waves are traveling waves for a shallow water equation modeling surface waves of moderate amplitude
A Geyer
Journal of Nonlinear Mathematical Physics 22 (4), 545-551, 2015
152015
Spectral instability of the peaked periodic wave in the reduced Ostrovsky equations
A Geyer, D Pelinovsky
Proceedings of the American Mathematical Society 148 (12), 5109-5125, 2020
112020
Traveling wave solutions of a highly nonlinear shallow water equation
A Geyer, R Quirchmayr
Discrete and Continuous Dynamical Systems 38 (3), 1567-1604, 2018
112018
Non-uniform continuity of the flow map for an evolution equation modeling shallow water waves of moderate amplitude
ND Mutlubaş, A Geyer, BV Matioc
Nonlinear Analysis: Real World Applications 17, 322-331, 2014
112014
Symmetric solutions of evolutionary partial differential equations
G Bruell, M Ehrnström, A Geyer, L Pei
Nonlinearity 30 (10), 3932, 2017
92017
Stability of smooth periodic travelling waves in the Camassa–Holm equation
A Geyer, RH Martins, F Natali, DE Pelinovsky
Studies in Applied Mathematics 148 (1), 27-61, 2022
82022
Singular solutions for a class of traveling wave equations arising in hydrodynamics
A Geyer, V Mañosa
Nonlinear Analysis: Real World Applications 31, 57-76, 2016
82016
Shallow water models for stratified equatorial flows
A Geyer, R Quirchmayr
arXiv preprint arXiv:1810.11450, 2018
42018
On some background flows for tsunami waves
A Geyer
Journal of Mathematical Fluid Mechanics 14, 141-158, 2012
42012
A Chebyshev criterion with applications
A Gasull, A Geyer, F Mañosas
Journal of Differential Equations 269 (9), 6641-6655, 2020
32020
Well-posedness of a highly nonlinear shallow water equation on the circle
ND Mutlubas, A Geyer, R Quirchmayr
Nonlinear Analysis 197, 111849, 2020
32020
A note on uniqueness and compact support of solutions in a recent model for tsunami background flows
A Geyer
Comm. Pure Appl. Anal. 11 (4), 2012
32012
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Articles 1–20