@article{10902/38898,
year = {2025},
month = {10},
url = {https://hdl.handle.net/10902/38898},
abstract = {In this note, we study the existence of traveling waves of a surface model in a non-newtonian
fluid with odd viscosity. The proof relies on nonlinear bifurcation techniques.},
organization = {We thank the referee for valuable comments and, in particular, for suggesting the approach to the sharpened commutator estimate stated in Remark 2.2. D.A-O has been supported by the fellowship of the Santander-ULL program, Spain and by RYC2023-045563-I, Spain (MICIU/AEI/10.13039/5011 00011033 and FSE+). C.G. has been supported by RYC2022-035967-I, Spain (MCIU/AEI/10.13039 /501100011033 and FSE+), and partially by Grants PID2022-140494NA-I00 and PID2022-137228OB-I00 funded by MCIN/AEI/10.13039/501100011033/FEDER, UE, Spain, by Grant C-EXP-265-UGR23 funded by Consejeria de Universidad, Investigacion e Innovacion & ERDF/EU Andalusia Program, Spain, and by Modeling Nature Research Unit, project QUAL21-011. D.A-O and R. G-B are also supported by the project ‘‘Análisis Matemático Aplicado 𝑦 Ecuaciones Diferenciales’’ Grant PID2022-141187NB-I00 funded by MCIN/ AEI, Spain and acronym ‘‘AMAED’’. R.G-B thanks the department of applied mathematics of the University of Granada where part of this research was performed for their hospitality.},
publisher = {Elsevier},
publisher = {Nonlinear Analysis: Theory, Methods and Applications, 2026,},
title = {Traveling gravity-capillary waves with odd viscosity},
author = {Alonso-Orán, Diego and García, Claudia and Granero Belinchón, Rafael},
}