Skin friction in zero-pressure-gradient boundary layers
Abstract
A global approach leading to a self-consistent solution to the Navier-Stokes-Prandtl equations for zero-pressure-gradient boundary layers is presented. It is shown that as Reδ→ ∞, the dynamically defined boundary layer thickness δ(x) x/2Rex and the skin friction λ=2τw U02 1/2δ(x). Here τw and U0 are the wall shear stress and free stream velocity, respectively. The theory is formulated as an expansion in powers of a small dimensionless parameter dδ(x)dx→ 0 in the limit x→ ∞.
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