In appendix A of the paper Microfacet Models for Refraction through Rough Surfaces there is a derivation provided for $\Lambda(w)$ but the mathematics is very confusing. Could somebody help me by explaining it?
Smith's shadow masking function $G1$ gives the fraction of microfacets with normal $w_h$ that are visible from direction $w$.
$G(w_o, w_i)$ $=$ $G_1(w_o)G_1(w_i)$
In the literature, the Smith masking function is often expressed as a fraction involving a function $\Lambda(w_o)$. This function is expressed as an integral over the slopes of the microsurface and its form is derived with a raytracing formulation of the masking probability.
$G_1(w_o,w_m)$ $=$ $1\over1+\Lambda(w_o)$
For the Trowbridge-Reitz distribution it is quite simple:
$\Lambda(w)$ $=$ $-1+ \sqrt{1+\alpha^2tan^2\theta}\over 2$
How is this $\Lambda(w)$ function derived?
https://twvideo01.ubm-us.net/o1/vault/gdc2017/Presentations/Hammon_Earl_PBR_Diffuse_Lighting.pdf
– Tare Nov 08 '17 at 15:53