Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Ayala, Diego
and
Protas, Bartosz
2014.
Vortices, maximum growth and the problem of finite-time singularity formation.
Fluid Dynamics Research,
Vol. 46,
Issue. 3,
p.
031404.
Mulungye, Rachel M.
Lucas, Dan
and
Bustamante, Miguel D.
2015.
Symmetry-plane model of 3D Euler flows and mapping to regular systems to improve blowup assessment using numerical and analytical solutions.
Journal of Fluid Mechanics,
Vol. 771,
Issue. ,
p.
468.
Farazmand, M.
2016.
An adjoint-based approach for finding invariant solutions of Navier–Stokes equations.
Journal of Fluid Mechanics,
Vol. 795,
Issue. ,
p.
278.
Farazmand, Mohammad
and
Sapsis, Themistoklis P.
2017.
A variational approach to probing extreme events in turbulent dynamical systems.
Science Advances,
Vol. 3,
Issue. 9,
Ayala, Diego
and
Protas, Bartosz
2017.
Extreme vortex states and the growth of enstrophy in three-dimensional incompressible flows.
Journal of Fluid Mechanics,
Vol. 818,
Issue. ,
p.
772.
Yun, Dongfang
and
Protas, Bartosz
2018.
Maximum Rate of Growth of Enstrophy in Solutions of the Fractional Burgers Equation.
Journal of Nonlinear Science,
Vol. 28,
Issue. 1,
p.
395.
Ayala, Diego
Doering, Charles R.
and
Simon, Thilo M.
2018.
Maximum palinstrophy amplification in the two-dimensional Navier–Stokes equations.
Journal of Fluid Mechanics,
Vol. 837,
Issue. ,
p.
839.
Schroeder, Philipp W.
John, Volker
Lederer, Philip L.
Lehrenfeld, Christoph
Lube, Gert
and
Schöberl, Joachim
2019.
On reference solutions and the sensitivity of the 2D Kelvin–Helmholtz instability problem.
Computers & Mathematics with Applications,
Vol. 77,
Issue. 4,
p.
1010.
Gargano, F.
Ponetti, G.
Sammartino, M.
and
Sciacca, V.
2019.
Route to chaos in the weakly stratified Kolmogorov flow.
Physics of Fluids,
Vol. 31,
Issue. 2,
Kang, Di
Yun, Dongfang
and
Protas, Bartosz
2020.
Maximum amplification of enstrophy in three-dimensional Navier–Stokes flows.
Journal of Fluid Mechanics,
Vol. 893,
Issue. ,
Fantuzzi, Giovanni
and
Goluskin, David
2020.
Bounding Extreme Events in Nonlinear Dynamics Using Convex Optimization.
SIAM Journal on Applied Dynamical Systems,
Vol. 19,
Issue. 3,
p.
1823.
Jeong, In-Jee
and
Yoneda, Tsuyoshi
2021.
Enstrophy dissipation and vortex thinning for the incompressible 2D Navier–Stokes equations.
Nonlinearity,
Vol. 34,
Issue. 4,
p.
1837.
Protas, Bartosz
2022.
Systematic search for extreme and singular behaviour in some fundamental models of fluid mechanics.
Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences,
Vol. 380,
Issue. 2225,
Caflisch, R.E.
Gargano, F.
Sammartino, M.
and
Sciacca, V.
2022.
Complex singularity analysis for vortex layer flows.
Journal of Fluid Mechanics,
Vol. 932,
Issue. ,
Matharu, Pritpal
Protas, Bartosz
and
Yoneda, Tsuyoshi
2022.
On maximum enstrophy dissipation in 2D Navier–Stokes flows in the limit of vanishing viscosity.
Physica D: Nonlinear Phenomena,
Vol. 441,
Issue. ,
p.
133517.
Kang, Di
and
Protas, Bartosz
2022.
Searching for Singularities in Navier–Stokes Flows Based on the Ladyzhenskaya–Prodi–Serrin Conditions.
Journal of Nonlinear Science,
Vol. 32,
Issue. 6,
Zhao, Xinyu
and
Protas, Bartosz
2023.
Systematic Search for Singularities in 3D Euler Flows.
Journal of Nonlinear Science,
Vol. 33,
Issue. 6,
Elgindi, Tarek
and
Jeong, In-Jee
2023.
On Singular Vortex Patches, I: Well-posedness Issues.
Memoirs of the American Mathematical Society,
Vol. 283,
Issue. 1400,