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Hermenegildo Borges de Oliveira
Hermenegildo Borges de Oliveira
FCT - Universidade do Algarve and CMAFcIO - Universidade de Lisboa
Verified email at ualg.pt
Title
Cited by
Cited by
Year
The Navier–Stokes problem modified by an absorption term
SN Antontsev, HB de Oliveira
Applicable Analysis 89 (12), 1805-1825, 2010
652010
Stopping a viscous fluid by a feedback dissipative field: I. The stationary Stokes problem
SN Antontsev, JI Díaz, HB de Oliveira
Journal of Mathematical Fluid Mechanics 6, 439-461, 2004
342004
Stopping a viscous fluid by a feedback dissipative field: thermal effects without phase changing
SN Antontsev, JI Díaz, HB de Oliveira
Trends in Partial Differential Equations of Mathematical Physics, 1-14, 2005
322005
Some results on the p(u)-Laplacian problem
M Chipot, HB de Oliveira
Mathematische Annalen 375 (1), 283-306, 2019
29*2019
Stopping a viscous fluid by a feedback dissipative field: II. The stationary Navier-Stokes problem
SN Antontsev, JI Díaz, HB de Oliveira
Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche …, 2004
292004
Kelvin–Voigt equations perturbed by anisotropic relaxation, diffusion and damping
SN Antontsev, HB de Oliveira, K Khompysh
Journal of Mathematical Analysis and Applications 473 (2), 1122-1154, 2019
282019
Generalized Kelvin-Voigt equations for nonhomogeneous and incompressible fluids
SN Antontsev, HB de Oliveira, K Khompysh
Communications in Mathematical Sciences 17 (7), 1915-1948, 2019
262019
On the confinement of a viscous fluid by means of a feedback external field
SN Antontsev, JI Dıaz, HB de Oliveira
Comptes Rendus Mécanique 330 (12), 797-802, 2002
232002
The classical Kelvin–Voigt problem for incompressible fluids with unknown non-constant density: Existence, uniqueness and regularity
SN Antontsev, HB De Oliveira, K Khompysh
Nonlinearity 34 (5), 3083, 2021
222021
Existence of weak solutions for the generalized Navier–Stokes equations with damping
HB de Oliveira
Nonlinear Differential Equations and Applications NoDEA 20 (3), 797-824, 2013
212013
Navier-Stokes equations with absorption under slip boundary conditions: existence, uniqueness and extinction in time (Kyoto Conference on the Navier-Stokes Equations and their …
SN Antontsev, HB de Oliveira
数理解析研究所講究録別冊 1, 21-41, 2007
182007
Parabolic reaction-diffusion systems with nonlocal coupled diffusivity terms
J Ferreira, HB de Oliveira
Discrete and Continuous Dynamical Systems-Series A 37 (5), 2431-2453, 2017
162017
Existence and large time behavior for generalized Kelvin-Voigt equations governing nonhomogeneous and incompressible fluids
SN Antontsev, HB De Oliveira, K Khompysh
Journal of Physics: Conference Series 1268 (1), 012008, 2019
142019
Finite time localized solutions of fluid problems with anisotropic dissipation
S Antontsev, HB de Oliveira
Free Boundary Problems: Theory and Applications, 23-32, 2007
142007
Kelvin–Voigt equations with anisotropic diffusion, relaxation and damping: Blow-up and large time behavior
S Antontsev, HB De Oliveira, K Khompysh
Asymptotic Analysis 121 (2), 125-157, 2021
112021
Mathematical models in dynamics of non-Newtonian fluids and in glaciology
SN Antontsev, JI Díaz, HB de Oliveira
Proceedings of the CMNE/CILAMCE Congress, 20, 2007
112007
Asymptotic behavior of trembling fluids
SN Antontsev, HB De Oliveira
Nonlinear Analysis: Real World Applications 19, 54-66, 2014
102014
On a one-equation turbulent model with feedbacks
HB de Oliveira, A Paiva
Springer Proceedings in Mathematics & Statistics 164, 51-61, 2016
92016
Analysis of the existence for the steady Navier-Stokes equations with anisotropic diffusion
SN Antontsev, HB de Oliveira
92014
The Oberbeck–Boussinesq problem modified by a thermo-absorption term
SN Antontsev, HB de Oliveira
Journal of Mathematical Analysis and Applications 379 (2), 802-817, 2011
92011
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