Litcius/Paper detail

High-order conservative formulation of viscous terms for variable viscosity flows

Francesco De Vanna, Alberto Benato, Francesco Picano, Ernesto Benini

2021Acta Mechanica33 citationsDOIOpen Access PDF

Abstract

Abstract The work presents a general strategy to design high-order conservative co-located finite-difference approximations of viscous/diffusion terms for flows featuring extreme variations of diffusive properties. The proposed scheme becomes equivalent to central finite-difference derivatives with corresponding order in the case of uniform flow properties, while in variable viscosity/diffusion conditions it grants a strong preservation and a proper telescoping of viscous/diffusion terms. Presented tests show that standard co-located discretisation of the viscous terms is not able to describe the flow when the viscosity field experiences substantial variations, while the proposed method always reproduces the correct behaviour. Thus, the process is recommended for such flows whose viscosity field highly varies, in both laminar and turbulent conditions, relying on a more robust approximation of diffuse terms in any situation. Hence, the proposed discretisation should be used in all these cases and, for example, in large eddy simulations of turbulent wall flows where the eddy viscosity abruptly changes in the near-wall region.

Topics & Concepts

Laminar flowDiscretizationViscosityTurbulenceMechanicsInviscid flowTurbulence modelingDiffusionFlow (mathematics)MathematicsWork (physics)Turbulent diffusionSolid mechanicsBoundary value problemPhysicsMathematical analysisThermodynamicsFluid Dynamics and Turbulent FlowsComputational Fluid Dynamics and AerodynamicsFluid Dynamics and Vibration Analysis