Finite volume method for mixed convection boundary layer flow of viscoelastic fluid with spatial fractional derivatives over a flat plate
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Publication:2027698
DOI10.1007/s40314-020-01394-2zbMath1465.76009OpenAlexW3118374112MaRDI QIDQ2027698
Publication date: 28 May 2021
Published in: Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s40314-020-01394-2
Boundary-layer theory, separation and reattachment, higher-order effects (76D10) Finite volume methods applied to problems in fluid mechanics (76M12) Viscoelastic fluids (76A10) Fractional derivatives and integrals (26A33) Free convection (76R10) Forced convection (76R05)
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Cites Work
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- Application of fractional continuum mechanics to rate independent plasticity
- A note on unsteady flows of a viscoelastic fluid with the fractional Maxwell model between two parallel plates
- Non-local continuum mechanics and fractional calculus
- Unsteady flow of a generalized Maxwell fluid with fractional derivative due to a constantly accelerating plate
- Fractional differential equations. An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications
- Numerical solution of the space fractional Fokker-Planck equation.
- A new fractional finite volume method for solving the fractional diffusion equation
- Mixed convection boundary-layer flow past a horizontal circular cylinder embedded in a porous medium filled with a nanofluid under convective boundary condition
- Spatial fractional Darcy's law to quantify fluid flow in natural reservoirs
- Anomalous diffusion in rotating Casson fluid through a porous medium
- Boundary layer flows of viscoelastic fluids over a non-uniform permeable surface
- Lie group analysis and similarity solution for fractional Blasius flow
- Effects of fractional mass transfer and chemical reaction on MHD flow in a heterogeneous porous medium
- A spatial fractional seepage model for the flow of non-Newtonian fluid in fractal porous medium
- Derivation of the nonlocal pressure form of the fractional porous medium equation in the hydrological setting
- A finite volume method for two-dimensional Riemann-Liouville space-fractional diffusion equation and its efficient implementation
- Stability and convergence of a finite volume method for the space fractional advection-dispersion equation
- Brittle failures at rounded V-notches: a finite fracture mechanics approach
- A novel finite volume method for the Riesz space distributed-order advection-diffusion equation
- Modeling heat transport in nanofluids with stagnation point flow using fractional calculus
- A spatial-fractional thermal transport model for nanofluid in porous media
- Fractional thermoelasticity
- Oscillating flow of a viscoelastic fluid in a pipe with the fractional Maxwell model
- Stability and convergence of a Crank-Nicolson finite volume method for space fractional diffusion equations
- Spatially fractional-order viscoelasticity, non-locality, and a new kind of anisotropy
- Lie group analysis of 2‐dimensional space‐fractional model for flow in porous media
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