Spatial decay estimates for the Fochheimer equations interfacing with a Darcy equations
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Publication:2142843
DOI10.3934/math.2021728OpenAlexW3198000087MaRDI QIDQ2142843
Baiping Ouyang, Yan Zhang, Jincheng Shi, Ze Wang
Publication date: 30 May 2022
Published in: AIMS Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3934/math.2021728
Nonlinear parabolic equations (35K55) PDEs in connection with fluid mechanics (35Q35) Stokes and related (Oseen, etc.) flows (76D07) Dependence of solutions to PDEs on initial and/or boundary data and/or on parameters of PDEs (35B30)
Cites Work
- Unnamed Item
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- Continuous dependence for the nonhomogeneous Brinkman-Forchheimer equations in a semi-infinite pipe
- Spatial decay bounds for the Forchheimer equations
- Analysis of the boundary condition at the interface between a viscous fluid and a porous medium and related modelling questions
- Patterned ground formation under water
- Convection with temperature dependent viscosity in a porous medium: Nonlinear stability and the Brinkman effect
- Steady nonlinear double-diffusive convection in a porous medium based upon the Brinkman-Forchheimer model
- Continuous dependence results for an ill-posed problem in nonlinear viscoelasticity
- Spatial decay estimates for the Brinkman and Darcy flows in a semi-infinite cylinder
- Structural stability for the Brinkman fluid interfacing with a Darcy fluid in an unbounded domain
- Continuous dependence for a thermal convection model with temperature-dependent solubility
- A semi-analytic porosity evolution scheme for simulating wormhole propagation with the Darcy-Brinkman-Forchheimer model
- Stability in the initial-time geometry problem for the Brinkman and Darcy equations of flow in porous media
- Continuous dependence on boundary reaction terms in a porous medium of Darcy type
- Continuous dependence for the Brinkman-Forchheimer fluid interfacing with a Darcy fluid in a bounded domain
- Numerical analysis and modeling of multiscale Forchheimer-forchheimer coupled model for compressible fluid flow in fractured media aquifer system
- Structural stability for the Boussinesq equations interfacing with Darcy equations in a bounded domain
- Structural stability for the Forchheimer equations interfacing with a Darcy fluid in a bounded region in \(\mathbb{R}^3 \)
- Darcy-Forchheimer flow over an exponentially stretching curved surface with Cattaneo-Christov double diffusion
- Electrified fractional nanofluid flow with suspended carbon nanotubes
- Structural stability of the Boussinesq fluid interfacing with a Darcy fluid in a bounded region in \(R^2\)
- A Darcy-Brinkman model of fractures in porous media
- Spatial decay bounds for double diffusive convection in Brinkman flow
- Recent Developments Concerning Saint-Venant's Principle
- Steady convection in a porous medium based upon the Brinkman model
- Continuous dependence on the source parameters for convective motion in porous media
- Structural stability for the Darcy equations of flow in porous media
- Continuous dependence and convergence results for Brinkman and Forchheimer models with variable viscosity
- Stabilization estimates for penetrative motions in porous media
- Spatial decay estimates for plane flow in Brinkman-Forchheimer model
- ON STABILIZING AGAINST MODELING ERRORS IN A PENETRATIVE CONVECTION PROBLEM FOR A POROUS MEDIUM
- Structural Stability for the Brinkman Equations of Porous Media
- Convergence and Continuous Dependence for the Brinkman–Forchheimer Equations
- SPATIAL DECAY IN THE PIPE FLOW OF A VISCOUS FLUID INTERFACING A POROUS MEDIUM
- Double‐Diffusive Convection in a Porous Medium, Nonlinear Stability, and the Brinkman Effect
- Convection in Porous Media
- MHD Maxwell flow modeled by fractional derivatives with chemical reaction and thermal radiation
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