Schlick's approximation

In 3D computer graphics, Schlick's approximation is a formula for approximating the bidirectional reflectance distribution function (BRDF) of metallic surfaces. It was proposed by Christophe Schlick to approximate the contributions of Fresnel terms in the specular reflection of light from conducting surfaces.

According to Schlick's model, the specular reflection coefficient R is given by

${\displaystyle R(\theta )=R_{0}+(1-R_{0})(1-\cos \theta )^{5}}$

where ${\displaystyle \theta }$ is the incident angle (which equals the reflected angle for specular reflection) and ${\displaystyle R_{0}}$ is the reflectance at normal incidence (i.e. the value of the Fresnel term when ${\displaystyle \theta =0}$).

• Phong reflection model
• Blinn-Phong shading model
• Fresnel equations

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