In two-dimensional odd Stokes flow, the leading-order droplet deformation under shear matches the classical even-viscous result, while higher-order deformation and emulsion rheology depend on the difference in odd viscosity.
A quadtree-adaptive multigrid solver for the serre–green–naghdi equations
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Derives 2D Stokes-based expressions giving apparent viscosity multiplier (2λ+1)/(λ+1) and Taylor deformation D_T^∞ = Ca independent of viscosity ratio λ, validated by DNS.
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Droplet Deformation and Emulsion Rheology in Two-Dimensional Odd Stokes Flow
In two-dimensional odd Stokes flow, the leading-order droplet deformation under shear matches the classical even-viscous result, while higher-order deformation and emulsion rheology depend on the difference in odd viscosity.
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On the Rheology of Two-Dimensional Dilute Emulsions
Derives 2D Stokes-based expressions giving apparent viscosity multiplier (2λ+1)/(λ+1) and Taylor deformation D_T^∞ = Ca independent of viscosity ratio λ, validated by DNS.