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702 行
26 KiB
702 行
26 KiB
#ifndef UNITY_IMAGE_BASED_LIGHTING_INCLUDED
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#define UNITY_IMAGE_BASED_LIGHTING_INCLUDED
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#include "CommonLighting.hlsl"
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#include "CommonMaterial.hlsl"
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#include "BSDF.hlsl"
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#include "Random.hlsl"
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#include "Sampling/Sampling.hlsl"
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#ifndef UNITY_SPECCUBE_LOD_STEPS
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#define UNITY_SPECCUBE_LOD_STEPS 6
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#endif
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//-----------------------------------------------------------------------------
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// Util image based lighting
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//-----------------------------------------------------------------------------
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// The *approximated* version of the non-linear remapping. It works by
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// approximating the cone of the specular lobe, and then computing the MIP map level
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// which (approximately) covers the footprint of the lobe with a single texel.
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// Improves the perceptual roughness distribution.
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real PerceptualRoughnessToMipmapLevel(real perceptualRoughness, uint mipMapCount)
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{
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perceptualRoughness = perceptualRoughness * (1.7 - 0.7 * perceptualRoughness);
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return perceptualRoughness * mipMapCount;
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}
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real PerceptualRoughnessToMipmapLevel(real perceptualRoughness)
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{
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return PerceptualRoughnessToMipmapLevel(perceptualRoughness, UNITY_SPECCUBE_LOD_STEPS);
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}
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// The *accurate* version of the non-linear remapping. It works by
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// approximating the cone of the specular lobe, and then computing the MIP map level
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// which (approximately) covers the footprint of the lobe with a single texel.
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// Improves the perceptual roughness distribution and adds reflection (contact) hardening.
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// TODO: optimize!
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real PerceptualRoughnessToMipmapLevel(real perceptualRoughness, real NdotR)
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{
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real m = PerceptualRoughnessToRoughness(perceptualRoughness);
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// Remap to spec power. See eq. 21 in --> https://dl.dropboxusercontent.com/u/55891920/papers/mm_brdf.pdf
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real n = (2.0 / max(FLT_EPS, m * m)) - 2.0;
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// Remap from n_dot_h formulation to n_dot_r. See section "Pre-convolved Cube Maps vs Path Tracers" --> https://s3.amazonaws.com/docs.knaldtech.com/knald/1.0.0/lys_power_drops.html
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n /= (4.0 * max(NdotR, FLT_EPS));
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// remap back to square root of real roughness (0.25 include both the sqrt root of the conversion and sqrt for going from roughness to perceptualRoughness)
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perceptualRoughness = pow(2.0 / (n + 2.0), 0.25);
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return perceptualRoughness * UNITY_SPECCUBE_LOD_STEPS;
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}
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// The inverse of the *approximated* version of perceptualRoughnessToMipmapLevel().
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real MipmapLevelToPerceptualRoughness(real mipmapLevel)
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{
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real perceptualRoughness = saturate(mipmapLevel / UNITY_SPECCUBE_LOD_STEPS);
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return saturate(1.7 / 1.4 - sqrt(2.89 / 1.96 - (2.8 / 1.96) * perceptualRoughness));
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}
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//-----------------------------------------------------------------------------
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// Anisotropic image based lighting
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//-----------------------------------------------------------------------------
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// Ref: Donald Revie - Implementing Fur Using Deferred Shading (GPU Pro 2)
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// The grain direction (e.g. hair or brush direction) is assumed to be orthogonal to the normal.
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// The returned normal is NOT normalized.
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real3 ComputeGrainNormal(real3 grainDir, real3 V)
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{
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real3 B = cross(grainDir, V);
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return cross(B, grainDir);
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}
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// Fake anisotropy by distorting the normal (non-negative anisotropy values only).
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// The grain direction (e.g. hair or brush direction) is assumed to be orthogonal to N.
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// Anisotropic ratio (0->no isotropic; 1->full anisotropy in tangent direction)
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real3 GetAnisotropicModifiedNormal(real3 grainDir, real3 N, real3 V, real anisotropy)
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{
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real3 grainNormal = ComputeGrainNormal(grainDir, V);
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return normalize(lerp(N, grainNormal, anisotropy));
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}
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// Ref: "Moving Frostbite to PBR", p. 69.
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real3 GetSpecularDominantDir(real3 N, real3 R, real perceptualRoughness, real NdotV)
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{
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real p = perceptualRoughness;
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real a = 1.0 - p * p;
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real s = sqrt(a);
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#ifdef USE_FB_DSD
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// This is the original formulation.
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real lerpFactor = (s + p * p) * a;
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#else
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// TODO: tweak this further to achieve a closer match to the reference.
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real lerpFactor = (s + p * p) * saturate(a * a + lerp(0.0, a, NdotV * NdotV));
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#endif
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// The result is not normalized as we fetch in a cubemap
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return lerp(N, R, lerpFactor);
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}
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// ----------------------------------------------------------------------------
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// Importance sampling BSDF functions
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// ----------------------------------------------------------------------------
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void SampleGGXDir(real2 u,
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real3 V,
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real3x3 localToWorld,
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real roughness,
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out real3 L,
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out real NdotL,
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out real NdotH,
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out real VdotH,
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bool VeqN = false)
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{
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// GGX NDF sampling
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real cosTheta = sqrt((1.0 - u.x) / (1.0 + (roughness * roughness - 1.0) * u.x));
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real phi = TWO_PI * u.y;
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real3 localH = SphericalToCartesian(phi, cosTheta);
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NdotH = cosTheta;
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real3 localV;
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if (VeqN)
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{
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// localV == localN
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localV = real3(0.0, 0.0, 1.0);
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VdotH = NdotH;
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}
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else
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{
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localV = mul(V, transpose(localToWorld));
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VdotH = saturate(dot(localV, localH));
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}
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// Compute { localL = reflect(-localV, localH) }
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real3 localL = -localV + 2.0 * VdotH * localH;
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NdotL = localL.z;
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L = mul(localL, localToWorld);
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}
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// Ref: "A Simpler and Exact Sampling Routine for the GGX Distribution of Visible Normals".
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void SampleVisibleAnisoGGXDir(real2 u, real3 V, real3x3 localToWorld,
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real roughnessT, real roughnessB,
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out real3 L,
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out real NdotL,
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out real NdotH,
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out real VdotH,
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bool VeqN = false)
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{
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real3 localV = mul(V, transpose(localToWorld));
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// Construct an orthonormal basis around the stretched view direction.
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real3x3 viewToLocal;
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if (VeqN)
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{
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viewToLocal = k_identity3x3;
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}
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else
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{
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viewToLocal[2] = normalize(real3(roughnessT * localV.x, roughnessB * localV.y, localV.z));
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viewToLocal[0] = (viewToLocal[2].z < 0.9999) ? normalize(cross(viewToLocal[2], real3(0, 0, 1))) : real3(1, 0, 0);
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viewToLocal[1] = cross(viewToLocal[0], viewToLocal[2]);
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}
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// Compute a sample point with polar coordinates (r, phi).
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real r = sqrt(u.x);
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real b = viewToLocal[2].z + 1;
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real a = rcp(b);
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real c = (u.y < a) ? u.y * b : 1 + (u.y * b - 1) / viewToLocal[2].z;
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real phi = PI * c;
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real p1 = r * cos(phi);
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real p2 = r * sin(phi) * ((u.y < a) ? 1 : viewToLocal[2].z);
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// Unstretch.
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real3 viewH = normalize(real3(roughnessT * p1, roughnessB * p2, sqrt(1 - p1 * p1 - p2 * p2)));
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VdotH = viewH.z;
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real3 localH = mul(viewH, viewToLocal);
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NdotH = localH.z;
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// Compute { localL = reflect(-localV, localH) }
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real3 localL = -localV + 2 * VdotH * localH;
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NdotL = localL.z;
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L = mul(localL, localToWorld);
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}
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// ref: http://blog.selfshadow.com/publications/s2012-shading-course/burley/s2012_pbs_disney_brdf_notes_v3.pdf p26
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void SampleAnisoGGXDir(real2 u,
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real3 V,
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real3 N,
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real3 tangentX,
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real3 tangentY,
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real roughnessT,
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real roughnessB,
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out real3 H,
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out real3 L)
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{
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// AnisoGGX NDF sampling
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H = sqrt(u.x / (1.0 - u.x)) * (roughnessT * cos(TWO_PI * u.y) * tangentX + roughnessB * sin(TWO_PI * u.y) * tangentY) + N;
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H = normalize(H);
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// Convert sample from half angle to incident angle
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L = 2.0 * saturate(dot(V, H)) * H - V;
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}
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// weightOverPdf return the weight (without the diffuseAlbedo term) over pdf. diffuseAlbedo term must be apply by the caller.
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void ImportanceSampleLambert(real2 u,
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real3x3 localToWorld,
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out real3 L,
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out real NdotL,
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out real weightOverPdf)
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{
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#if 0
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real3 localL = SampleHemisphereCosine(u.x, u.y);
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NdotL = localL.z;
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L = mul(localL, localToWorld);
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#else
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real3 N = localToWorld[2];
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L = SampleHemisphereCosine(u.x, u.y, N);
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NdotL = saturate(dot(N, L));
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#endif
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// Importance sampling weight for each sample
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// pdf = N.L / PI
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// weight = fr * (N.L) with fr = diffuseAlbedo / PI
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// weight over pdf is:
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// weightOverPdf = (diffuseAlbedo / PI) * (N.L) / (N.L / PI)
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// weightOverPdf = diffuseAlbedo
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// diffuseAlbedo is apply outside the function
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weightOverPdf = 1.0;
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}
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// weightOverPdf return the weight (without the Fresnel term) over pdf. Fresnel term must be apply by the caller.
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void ImportanceSampleGGX(real2 u,
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real3 V,
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real3x3 localToWorld,
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real roughness,
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real NdotV,
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out real3 L,
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out real VdotH,
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out real NdotL,
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out real weightOverPdf)
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{
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real NdotH;
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SampleGGXDir(u, V, localToWorld, roughness, L, NdotL, NdotH, VdotH);
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// Importance sampling weight for each sample
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// pdf = D(H) * (N.H) / (4 * (L.H))
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// weight = fr * (N.L) with fr = F(H) * G(V, L) * D(H) / (4 * (N.L) * (N.V))
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// weight over pdf is:
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// weightOverPdf = F(H) * G(V, L) * (L.H) / ((N.H) * (N.V))
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// weightOverPdf = F(H) * 4 * (N.L) * V(V, L) * (L.H) / (N.H) with V(V, L) = G(V, L) / (4 * (N.L) * (N.V))
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// Remind (L.H) == (V.H)
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// F is apply outside the function
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real Vis = V_SmithJointGGX(NdotL, NdotV, roughness);
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weightOverPdf = 4.0 * Vis * NdotL * VdotH / NdotH;
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}
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// weightOverPdf return the weight (without the Fresnel term) over pdf. Fresnel term must be apply by the caller.
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void ImportanceSampleAnisoGGX(real2 u,
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real3 V,
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real3x3 localToWorld,
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real roughnessT,
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real roughnessB,
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real NdotV,
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out real3 L,
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out real VdotH,
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out real NdotL,
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out real weightOverPdf)
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{
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real3 tangentX = localToWorld[0];
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real3 tangentY = localToWorld[1];
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real3 N = localToWorld[2];
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real3 H;
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SampleAnisoGGXDir(u, V, N, tangentX, tangentY, roughnessT, roughnessB, H, L);
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real NdotH = saturate(dot(N, H));
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// Note: since L and V are symmetric around H, LdotH == VdotH
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VdotH = saturate(dot(V, H));
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NdotL = saturate(dot(N, L));
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// Importance sampling weight for each sample
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// pdf = D(H) * (N.H) / (4 * (L.H))
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// weight = fr * (N.L) with fr = F(H) * G(V, L) * D(H) / (4 * (N.L) * (N.V))
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// weight over pdf is:
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// weightOverPdf = F(H) * G(V, L) * (L.H) / ((N.H) * (N.V))
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// weightOverPdf = F(H) * 4 * (N.L) * V(V, L) * (L.H) / (N.H) with V(V, L) = G(V, L) / (4 * (N.L) * (N.V))
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// Remind (L.H) == (V.H)
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// F is apply outside the function
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// For anisotropy we must not saturate these values
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real TdotV = dot(tangentX, V);
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real BdotV = dot(tangentY, V);
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real TdotL = dot(tangentX, L);
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real BdotL = dot(tangentY, L);
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real Vis = V_SmithJointGGXAniso(TdotV, BdotV, NdotV, TdotL, BdotL, NdotL, roughnessT, roughnessB);
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weightOverPdf = 4.0 * Vis * NdotL * VdotH / NdotH;
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}
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// ----------------------------------------------------------------------------
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// Pre-integration
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// ----------------------------------------------------------------------------
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#if !defined SHADER_API_GLES
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// Ref: Listing 18 in "Moving Frostbite to PBR" + https://knarkowicz.wordpress.com/2014/12/27/analytical-dfg-term-for-ibl/
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real4 IntegrateGGXAndDisneyDiffuseFGD(real3 V, real3 N, real roughness, uint sampleCount = 8192)
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{
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real NdotV = ClampNdotV(dot(N, V));
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real4 acc = real4(0.0, 0.0, 0.0, 0.0);
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// Add some jittering on Hammersley2d
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real2 randNum = InitRandom(V.xy * 0.5 + 0.5);
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real3x3 localToWorld = GetLocalFrame(N);
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for (uint i = 0; i < sampleCount; ++i)
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{
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real2 u = frac(randNum + Hammersley2d(i, sampleCount));
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real VdotH;
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real NdotL;
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real weightOverPdf;
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real3 L; // Unused
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ImportanceSampleGGX(u, V, localToWorld, roughness, NdotV,
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L, VdotH, NdotL, weightOverPdf);
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if (NdotL > 0.0)
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{
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// Integral{BSDF * <N,L> dw} =
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// Integral{(F0 + (1 - F0) * (1 - <V,H>)^5) * (BSDF / F) * <N,L> dw} =
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// (1 - F0) * Integral{(1 - <V,H>)^5 * (BSDF / F) * <N,L> dw} + F0 * Integral{(BSDF / F) * <N,L> dw}=
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// (1 - F0) * x + F0 * y = lerp(x, y, F0)
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acc.x += weightOverPdf * pow(1 - VdotH, 5);
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acc.y += weightOverPdf;
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}
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// for Disney we still use a Cosine importance sampling, true Disney importance sampling imply a look up table
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ImportanceSampleLambert(u, localToWorld, L, NdotL, weightOverPdf);
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if (NdotL > 0.0)
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{
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real LdotV = dot(L, V);
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real disneyDiffuse = DisneyDiffuseNoPI(NdotV, NdotL, LdotV, RoughnessToPerceptualRoughness(roughness));
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acc.z += disneyDiffuse * weightOverPdf;
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}
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}
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acc /= sampleCount;
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// Remap from the [0.5, 1.5] to the [0, 1] range.
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acc.z -= 0.5;
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return acc;
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}
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#else
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// Not supported due to lack of random library in GLES 2
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#define IntegrateGGXAndDisneyDiffuseFGD ERROR_ON_UNSUPPORTED_FUNCTION(IntegrateGGXAndDisneyDiffuseFGD)
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#endif
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#if !defined SHADER_API_GLES
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real4 IntegrateCharlieAndClothLambertFGD(real3 V, real3 N, real roughness, uint sampleCount = 8192)
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{
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real NdotV = ClampNdotV(dot(N, V));
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real4 acc = real4(0.0, 0.0, 0.0, 0.0);
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// Add some jittering on Hammersley2d
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real2 randNum = InitRandom(V.xy * 0.5 + 0.5);
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real3x3 localToWorld = GetLocalFrame(N);
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for (uint i = 0; i < sampleCount; ++i)
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{
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real2 u = frac(randNum + Hammersley2d(i, sampleCount));
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real NdotL;
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real weightOverPdf;
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// Ref: Production Friendly Microfacet Sheen BRDF
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// Paper recommend plain uniform sampling of upper hemisphere instead of importance sampling for Charlie
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real3 localL = SampleHemisphereUniform(u.x, u.y);
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real3 L = mul(localL, localToWorld);
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NdotL = saturate(dot(N, L));
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if (NdotL > 0.0)
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{
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// Sampling weight for each sample
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// pdf = 1 / 2PI
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// weight = fr * (N.L) with fr = CharlieV * CharlieD / PI
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// weight over pdf is:
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// weightOverPdf = (CharlieV * CharlieD / PI) * (N.L) / (1 / 2PI)
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// weightOverPdf = 2 * CharlieV * CharlieD * (N.L)
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real3 H = normalize(V + L);
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real NdotH = dot(N, H);
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// Note: we use V_Charlie and not the approx when computing FGD texture as we can afford it
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weightOverPdf = 2.0 * V_Charlie(NdotL, NdotV, roughness) * D_CharlieNoPI(NdotH, roughness) * NdotL;
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// Integral{BSDF * <N,L> dw} =
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// Integral{(F0 + (1 - F0) * (1 - <V,H>)^5) * (BSDF / F) * <N,L> dw} =
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// (1 - F0) * Integral{(1 - <V,H>)^5 * (BSDF / F) * <N,L> dw} + F0 * Integral{(BSDF / F) * <N,L> dw}=
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// (1 - F0) * x + F0 * y = lerp(x, y, F0)
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real VdotH = dot(V, H);
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acc.x += weightOverPdf * pow(1 - VdotH, 5);
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acc.y += weightOverPdf;
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}
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// for cloth Lambert we still use a Cosine importance sampling
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ImportanceSampleLambert(u, localToWorld, L, NdotL, weightOverPdf);
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if (NdotL > 0.0)
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{
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real clothLambert = ClothLambertNoPI(roughness);
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acc.z += clothLambert * weightOverPdf;
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}
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}
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acc /= sampleCount;
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return acc;
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}
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#else
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// Not supported due to lack of random library in GLES 2
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#define IntegrateCharlieAndClothLambertFGD ERROR_ON_UNSUPPORTED_FUNCTION(IntegrateCharlieAndClothLambertFGD)
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#endif
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uint GetIBLRuntimeFilterSampleCount(uint mipLevel)
|
|
{
|
|
uint sampleCount = 0;
|
|
|
|
switch (mipLevel)
|
|
{
|
|
case 1: sampleCount = 21; break;
|
|
case 2: sampleCount = 34; break;
|
|
#ifdef SHADER_API_MOBILE
|
|
case 3: sampleCount = 34; break;
|
|
case 4: sampleCount = 34; break;
|
|
case 5: sampleCount = 34; break;
|
|
case 6: sampleCount = 34; break; // UNITY_SPECCUBE_LOD_STEPS
|
|
#else
|
|
case 3: sampleCount = 55; break;
|
|
case 4: sampleCount = 89; break;
|
|
case 5: sampleCount = 89; break;
|
|
case 6: sampleCount = 89; break; // UNITY_SPECCUBE_LOD_STEPS
|
|
#endif
|
|
}
|
|
|
|
return sampleCount;
|
|
}
|
|
|
|
// Ref: Listing 19 in "Moving Frostbite to PBR"
|
|
real4 IntegrateLD(TEXTURECUBE_ARGS(tex, sampl),
|
|
TEXTURE2D(ggxIblSamples),
|
|
real3 V,
|
|
real3 N,
|
|
real roughness,
|
|
real index, // Current MIP level minus one
|
|
real invOmegaP,
|
|
uint sampleCount, // Must be a Fibonacci number
|
|
bool prefilter,
|
|
bool usePrecomputedSamples)
|
|
{
|
|
real3x3 localToWorld = GetLocalFrame(N);
|
|
|
|
#ifndef USE_KARIS_APPROXIMATION
|
|
real NdotV = 1; // N == V
|
|
real partLambdaV = GetSmithJointGGXPartLambdaV(NdotV, roughness);
|
|
#endif
|
|
|
|
real3 lightInt = real3(0.0, 0.0, 0.0);
|
|
real cbsdfInt = 0.0;
|
|
|
|
for (uint i = 0; i < sampleCount; ++i)
|
|
{
|
|
real3 L;
|
|
real NdotL, NdotH, LdotH;
|
|
|
|
if (usePrecomputedSamples)
|
|
{
|
|
// Performance warning: using a texture LUT will generate a vector load,
|
|
// which increases both the VGPR pressure and the workload of the
|
|
// texture unit. A better solution here is to load from a Constant, Raw
|
|
// or Structured buffer, or perhaps even declare all the constants in an
|
|
// HLSL header to allow the compiler to inline everything.
|
|
real3 localL = LOAD_TEXTURE2D(ggxIblSamples, uint2(i, index)).xyz;
|
|
|
|
L = mul(localL, localToWorld);
|
|
NdotL = localL.z;
|
|
LdotH = sqrt(0.5 + 0.5 * NdotL);
|
|
}
|
|
else
|
|
{
|
|
real2 u = Fibonacci2d(i, sampleCount);
|
|
|
|
// Note: if (N == V), all of the microsurface normals are visible.
|
|
SampleGGXDir(u, V, localToWorld, roughness, L, NdotL, NdotH, LdotH, true);
|
|
|
|
if (NdotL <= 0) continue; // Note that some samples will have 0 contribution
|
|
}
|
|
|
|
real mipLevel;
|
|
|
|
if (!prefilter) // BRDF importance sampling
|
|
{
|
|
mipLevel = 0;
|
|
}
|
|
else // Prefiltered BRDF importance sampling
|
|
{
|
|
// Use lower MIP-map levels for fetching samples with low probabilities
|
|
// in order to reduce the variance.
|
|
// Ref: http://http.developer.nvidia.com/GPUGems3/gpugems3_ch20.html
|
|
//
|
|
// - OmegaS: Solid angle associated with the sample
|
|
// - OmegaP: Solid angle associated with the texel of the cubemap
|
|
|
|
real omegaS;
|
|
|
|
if (usePrecomputedSamples)
|
|
{
|
|
omegaS = LOAD_TEXTURE2D(ggxIblSamples, uint2(i, index)).w;
|
|
}
|
|
else
|
|
{
|
|
// real PDF = D * NdotH * Jacobian, where Jacobian = 1 / (4 * LdotH).
|
|
// Since (N == V), NdotH == LdotH.
|
|
real pdf = 0.25 * D_GGX(NdotH, roughness);
|
|
// TODO: improve the accuracy of the sample's solid angle fit for GGX.
|
|
omegaS = rcp(sampleCount) * rcp(pdf);
|
|
}
|
|
|
|
// 'invOmegaP' is precomputed on CPU and provided as a parameter to the function.
|
|
// real omegaP = FOUR_PI / (6.0 * cubemapWidth * cubemapWidth);
|
|
const real mipBias = roughness;
|
|
mipLevel = 0.5 * log2(omegaS * invOmegaP) + mipBias;
|
|
}
|
|
|
|
// TODO: use a Gaussian-like filter to generate the MIP pyramid.
|
|
real3 val = SAMPLE_TEXTURECUBE_LOD(tex, sampl, L, mipLevel).rgb;
|
|
|
|
// The goal of this function is to use Monte-Carlo integration to find
|
|
// X = Integral{Radiance(L) * CBSDF(L, N, V) dL} / Integral{CBSDF(L, N, V) dL}.
|
|
// Note: Integral{CBSDF(L, N, V) dL} is given by the FDG texture.
|
|
// CBSDF = F * D * G * NdotL / (4 * NdotL * NdotV) = F * D * G / (4 * NdotV).
|
|
// PDF = D * NdotH / (4 * LdotH).
|
|
// Weight = CBSDF / PDF = F * G * LdotH / (NdotV * NdotH).
|
|
// Since we perform filtering with the assumption that (V == N),
|
|
// (LdotH == NdotH) && (NdotV == 1) && (Weight == F * G).
|
|
// Therefore, after the Monte Carlo expansion of the integrals,
|
|
// X = Sum(Radiance(L) * Weight) / Sum(Weight) = Sum(Radiance(L) * F * G) / Sum(F * G).
|
|
|
|
#ifndef USE_KARIS_APPROXIMATION
|
|
// The choice of the Fresnel factor does not appear to affect the result.
|
|
real F = 1; // F_Schlick(F0, LdotH);
|
|
real V = V_SmithJointGGX(NdotL, NdotV, roughness, partLambdaV);
|
|
real G = V * NdotL * NdotV; // 4 cancels out
|
|
|
|
lightInt += F * G * val;
|
|
cbsdfInt += F * G;
|
|
#else
|
|
// Use the approximation from "Real Shading in Unreal Engine 4": Weight ≈ NdotL.
|
|
lightInt += NdotL * val;
|
|
cbsdfInt += NdotL;
|
|
#endif
|
|
}
|
|
|
|
return real4(lightInt / cbsdfInt, 1.0);
|
|
}
|
|
|
|
// Searches the row 'j' containing 'n' elements of 'haystack' and
|
|
// returns the index of the first element greater or equal to 'needle'.
|
|
uint BinarySearchRow(uint j, real needle, TEXTURE2D(haystack), uint n)
|
|
{
|
|
uint i = n - 1;
|
|
real v = LOAD_TEXTURE2D(haystack, uint2(i, j)).r;
|
|
|
|
if (needle < v)
|
|
{
|
|
i = 0;
|
|
|
|
for (uint b = 1 << firstbithigh(n - 1); b != 0; b >>= 1)
|
|
{
|
|
uint p = i | b;
|
|
v = LOAD_TEXTURE2D(haystack, uint2(p, j)).r;
|
|
if (v <= needle) { i = p; } // Move to the right.
|
|
}
|
|
}
|
|
|
|
return i;
|
|
}
|
|
|
|
#if !defined SHADER_API_GLES
|
|
real4 IntegrateLD_MIS(TEXTURECUBE_ARGS(envMap, sampler_envMap),
|
|
TEXTURE2D(marginalRowDensities),
|
|
TEXTURE2D(conditionalDensities),
|
|
real3 V,
|
|
real3 N,
|
|
real roughness,
|
|
real invOmegaP,
|
|
uint width,
|
|
uint height,
|
|
uint sampleCount,
|
|
bool prefilter)
|
|
{
|
|
real3x3 localToWorld = GetLocalFrame(N);
|
|
|
|
real2 randNum = InitRandom(V.xy * 0.5 + 0.5);
|
|
|
|
real3 lightInt = real3(0.0, 0.0, 0.0);
|
|
real cbsdfInt = 0.0;
|
|
|
|
/*
|
|
// Dedicate 50% of samples to light sampling at 1.0 roughness.
|
|
// Only perform BSDF sampling when roughness is below 0.5.
|
|
const int lightSampleCount = lerp(0, sampleCount / 2, saturate(2.0 * roughness - 1.0));
|
|
const int bsdfSampleCount = sampleCount - lightSampleCount;
|
|
*/
|
|
|
|
// The value of the integral of intensity values of the environment map (as a 2D step function).
|
|
real envMapInt2dStep = LOAD_TEXTURE2D(marginalRowDensities, uint2(height, 0)).r;
|
|
// Since we are using equiareal mapping, we need to divide by the area of the sphere.
|
|
real envMapIntSphere = envMapInt2dStep * INV_FOUR_PI;
|
|
|
|
// Perform light importance sampling.
|
|
for (uint i = 0; i < sampleCount; i++)
|
|
{
|
|
real2 s = frac(randNum + Hammersley2d(i, sampleCount));
|
|
|
|
// Sample a row from the marginal distribution.
|
|
uint y = BinarySearchRow(0, s.x, marginalRowDensities, height - 1);
|
|
|
|
// Sample a column from the conditional distribution.
|
|
uint x = BinarySearchRow(y, s.y, conditionalDensities, width - 1);
|
|
|
|
// Compute the coordinates of the sample.
|
|
// Note: we take the sample in between two texels, and also apply the half-texel offset.
|
|
// We could compute fractional coordinates at the cost of 4 extra texel samples.
|
|
real u = saturate((real)x / width + 1.0 / width);
|
|
real v = saturate((real)y / height + 1.0 / height);
|
|
real3 L = ConvertEquiarealToCubemap(u, v);
|
|
|
|
real NdotL = saturate(dot(N, L));
|
|
|
|
if (NdotL > 0.0)
|
|
{
|
|
real3 val = SAMPLE_TEXTURECUBE_LOD(envMap, sampler_envMap, L, 0).rgb;
|
|
real pdf = (val.r + val.g + val.b) / envMapIntSphere;
|
|
|
|
if (pdf > 0.0)
|
|
{
|
|
// (N == V) && (acos(VdotL) == 2 * acos(NdotH)).
|
|
real NdotH = sqrt(NdotL * 0.5 + 0.5);
|
|
|
|
// *********************************************************************************
|
|
// Our goal is to use Monte-Carlo integration with importance sampling to evaluate
|
|
// X(V) = Integral{Radiance(L) * CBSDF(L, N, V) dL} / Integral{CBSDF(L, N, V) dL}.
|
|
// CBSDF = F * D * G * NdotL / (4 * NdotL * NdotV) = F * D * G / (4 * NdotV).
|
|
// Weight = CBSDF / PDF.
|
|
// We use two approximations of Brian Karis from "Real Shading in Unreal Engine 4":
|
|
// (F * G ≈ NdotL) && (NdotV == 1).
|
|
// Weight = D * NdotL / (4 * PDF).
|
|
// *********************************************************************************
|
|
|
|
real weight = D_GGX(NdotH, roughness) * NdotL / (4.0 * pdf);
|
|
|
|
lightInt += weight * val;
|
|
cbsdfInt += weight;
|
|
}
|
|
}
|
|
}
|
|
|
|
// Prevent NaNs arising from the division of 0 by 0.
|
|
cbsdfInt = max(cbsdfInt, FLT_EPS);
|
|
|
|
return real4(lightInt / cbsdfInt, 1.0);
|
|
}
|
|
#else
|
|
// Not supported due to lack of random library in GLES 2
|
|
#define IntegrateLD_MIS ERROR_ON_UNSUPPORTED_FUNCTION(IntegrateLD_MIS)
|
|
#endif
|
|
|
|
// Little helper to share code between sphere and box reflection probe.
|
|
// This function will fade the mask of a reflection volume based on normal orientation compare to direction define by the center of the reflection volume.
|
|
float InfluenceFadeNormalWeight(float3 normal, float3 centerToPos)
|
|
{
|
|
// Start weight from 0.6f (1 fully transparent) to 0.2f (fully opaque).
|
|
return saturate((-1.0f / 0.4f) * dot(normal, centerToPos) + (0.6f / 0.4f));
|
|
}
|
|
|
|
#endif // UNITY_IMAGE_BASED_LIGHTING_INCLUDED
|