Boat Attack使用了Universal RP的许多新图形功能,可以用于探索 Universal RP 的使用方式和技巧。
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#ifndef UNITY_IMAGE_BASED_LIGHTING_INCLUDED
#define UNITY_IMAGE_BASED_LIGHTING_INCLUDED
#include "Packages/com.unity.render-pipelines.core/ShaderLibrary/CommonLighting.hlsl"
#include "Packages/com.unity.render-pipelines.core/ShaderLibrary/CommonMaterial.hlsl"
#include "Packages/com.unity.render-pipelines.core/ShaderLibrary/BSDF.hlsl"
#include "Packages/com.unity.render-pipelines.core/ShaderLibrary/Random.hlsl"
#include "Packages/com.unity.render-pipelines.core/ShaderLibrary/Sampling/Sampling.hlsl"
#ifndef UNITY_SPECCUBE_LOD_STEPS
#define UNITY_SPECCUBE_LOD_STEPS 6
#endif
//-----------------------------------------------------------------------------
// Util image based lighting
//-----------------------------------------------------------------------------
// The *approximated* version of the non-linear remapping. It works by
// approximating the cone of the specular lobe, and then computing the MIP map level
// which (approximately) covers the footprint of the lobe with a single texel.
// Improves the perceptual roughness distribution.
real PerceptualRoughnessToMipmapLevel(real perceptualRoughness, uint mipMapCount)
{
perceptualRoughness = perceptualRoughness * (1.7 - 0.7 * perceptualRoughness);
return perceptualRoughness * mipMapCount;
}
real PerceptualRoughnessToMipmapLevel(real perceptualRoughness)
{
return PerceptualRoughnessToMipmapLevel(perceptualRoughness, UNITY_SPECCUBE_LOD_STEPS);
}
// Mapping for convolved Texture2D, this is an empirical remapping to match GGX version of cubemap convolution
real PlanarPerceptualRoughnessToMipmapLevel(real perceptualRoughness, uint mipMapcount)
{
return PositivePow(perceptualRoughness, 0.8) * uint(max(mipMapcount - 1, 0));
}
// The *accurate* version of the non-linear remapping. It works by
// approximating the cone of the specular lobe, and then computing the MIP map level
// which (approximately) covers the footprint of the lobe with a single texel.
// Improves the perceptual roughness distribution and adds reflection (contact) hardening.
// TODO: optimize!
real PerceptualRoughnessToMipmapLevel(real perceptualRoughness, real NdotR)
{
real m = PerceptualRoughnessToRoughness(perceptualRoughness);
// Remap to spec power. See eq. 21 in --> https://dl.dropboxusercontent.com/u/55891920/papers/mm_brdf.pdf
real n = (2.0 / max(REAL_EPS, m * m)) - 2.0;
// 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
n /= (4.0 * max(NdotR, REAL_EPS));
// 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)
perceptualRoughness = pow(2.0 / (n + 2.0), 0.25);
return perceptualRoughness * UNITY_SPECCUBE_LOD_STEPS;
}
// The inverse of the *approximated* version of perceptualRoughnessToMipmapLevel().
real MipmapLevelToPerceptualRoughness(real mipmapLevel)
{
real perceptualRoughness = saturate(mipmapLevel / UNITY_SPECCUBE_LOD_STEPS);
return saturate(1.7 / 1.4 - sqrt(2.89 / 1.96 - (2.8 / 1.96) * perceptualRoughness));
}
//-----------------------------------------------------------------------------
// Anisotropic image based lighting
//-----------------------------------------------------------------------------
// T is the fiber axis (hair strand direction, root to tip).
float3 ComputeViewFacingNormal(float3 V, float3 T)
{
return Orthonormalize(V, T);
}
// Fake anisotropy by distorting the normal (non-negative anisotropy values only).
// The grain direction (e.g. hair or brush direction) is assumed to be orthogonal to N.
// Anisotropic ratio (0->no isotropic; 1->full anisotropy in tangent direction)
real3 GetAnisotropicModifiedNormal(real3 grainDir, real3 N, real3 V, real anisotropy)
{
real3 grainNormal = ComputeViewFacingNormal(V, grainDir);
return normalize(lerp(N, grainNormal, anisotropy));
}
// For GGX aniso and IBL we have done an empirical (eye balled) approximation compare to the reference.
// We use a single fetch, and we stretch the normal to use based on various criteria.
// result are far away from the reference but better than nothing
// Anisotropic ratio (0->no isotropic; 1->full anisotropy in tangent direction) - positive use bitangentWS - negative use tangentWS
// Note: returned iblPerceptualRoughness shouldn't be use for sampling FGD texture in a pre-integration
void GetGGXAnisotropicModifiedNormalAndRoughness(real3 bitangentWS, real3 tangentWS, real3 N, real3 V, real anisotropy, real perceptualRoughness, out real3 iblN, out real iblPerceptualRoughness)
{
// For positive anisotropy values: tangent = highlight stretch (anisotropy) direction, bitangent = grain (brush) direction.
float3 grainDirWS = (anisotropy >= 0.0) ? bitangentWS : tangentWS;
// Reduce stretching depends on the perceptual roughness
float stretch = abs(anisotropy) * saturate(1.5 * sqrt(perceptualRoughness));
// NOTE: If we follow the theory we should use the modified normal for the different calculation implying a normal (like NdotV)
// However modified normal is just a hack. The goal is just to stretch a cubemap, no accuracy here. Let's save performance instead.
iblN = GetAnisotropicModifiedNormal(grainDirWS, N, V, stretch);
iblPerceptualRoughness = perceptualRoughness * saturate(1.2 - abs(anisotropy));
}
// Ref: "Moving Frostbite to PBR", p. 69.
real3 GetSpecularDominantDir(real3 N, real3 R, real perceptualRoughness, real NdotV)
{
real p = perceptualRoughness;
real a = 1.0 - p * p;
real s = sqrt(a);
#ifdef USE_FB_DSD
// This is the original formulation.
real lerpFactor = (s + p * p) * a;
#else
// TODO: tweak this further to achieve a closer match to the reference.
real lerpFactor = (s + p * p) * saturate(a * a + lerp(0.0, a, NdotV * NdotV));
#endif
// The result is not normalized as we fetch in a cubemap
return lerp(N, R, lerpFactor);
}
// ----------------------------------------------------------------------------
// Importance sampling BSDF functions
// ----------------------------------------------------------------------------
void SampleGGXDir(real2 u,
real3 V,
real3x3 localToWorld,
real roughness,
out real3 L,
out real NdotL,
out real NdotH,
out real VdotH,
bool VeqN = false)
{
// GGX NDF sampling
real cosTheta = sqrt(SafeDiv(1.0 - u.x, 1.0 + (roughness * roughness - 1.0) * u.x));
real phi = TWO_PI * u.y;
real3 localH = SphericalToCartesian(phi, cosTheta);
NdotH = cosTheta;
real3 localV;
if (VeqN)
{
// localV == localN
localV = real3(0.0, 0.0, 1.0);
VdotH = NdotH;
}
else
{
localV = mul(V, transpose(localToWorld));
VdotH = saturate(dot(localV, localH));
}
// Compute { localL = reflect(-localV, localH) }
real3 localL = -localV + 2.0 * VdotH * localH;
NdotL = localL.z;
L = mul(localL, localToWorld);
}
// Ref: "A Simpler and Exact Sampling Routine for the GGX Distribution of Visible Normals".
void SampleVisibleAnisoGGXDir(real2 u,
real3 V,
real3x3 localToWorld,
real roughnessT,
real roughnessB,
out real3 L,
out real NdotL,
out real NdotH,
out real VdotH,
bool VeqN = false)
{
real3 localV = mul(V, transpose(localToWorld));
// Construct an orthonormal basis around the stretched view direction
real3x3 viewToLocal;
if (VeqN)
{
viewToLocal = k_identity3x3;
}
else
{
// TODO: this code is tacky. We should make it cleaner
viewToLocal[2] = normalize(real3(roughnessT * localV.x, roughnessB * localV.y, localV.z));
viewToLocal[0] = (viewToLocal[2].z < 0.9999) ? normalize(cross(real3(0, 0, 1), viewToLocal[2])) : real3(1, 0, 0);
viewToLocal[1] = cross(viewToLocal[2], viewToLocal[0]);
}
// Compute a sample point with polar coordinates (r, phi)
real r = sqrt(u.x);
real phi = 2.0 * PI * u.y;
real t1 = r * cos(phi);
real t2 = r * sin(phi);
float s = 0.5 * (1.0 + viewToLocal[2].z);
t2 = (1.0 - s) * sqrt(1.0 - t1 * t1) + s * t2;
// Reproject onto hemisphere
real3 localH = t1 * viewToLocal[0] + t2 * viewToLocal[1] + sqrt(max(0.0, 1.0 - t1 * t1 - t2 * t2)) * viewToLocal[2];
// Transform the normal back to the ellipsoid configuration
localH = normalize(real3(roughnessT * localH.x, roughnessB * localH.y, max(0.0, localH.z)));
NdotH = localH.z;
VdotH = saturate(dot(localV, localH));
// Compute the reflection direction
real3 localL = 2.0 * VdotH * localH - localV;
NdotL = localL.z;
L = mul(localL, localToWorld);
}
void SampleVisibleGGXDir(real2 u,
real3 V,
real3x3 localToWorld,
real roughness,
out real3 L,
out real NdotL,
out real NdotH,
out real VdotH,
bool VeqN = false)
{
SampleVisibleAnisoGGXDir(u, V, localToWorld, roughness, roughness, L, NdotL, NdotH, VdotH, VeqN);
}
// ref: http://blog.selfshadow.com/publications/s2012-shading-course/burley/s2012_pbs_disney_brdf_notes_v3.pdf p26
void SampleAnisoGGXDir(real2 u,
real3 V,
real3 N,
real3 tangentX,
real3 tangentY,
real roughnessT,
real roughnessB,
out real3 H,
out real3 L)
{
// AnisoGGX NDF sampling
H = sqrt(u.x / (1.0 - u.x)) * (roughnessT * cos(TWO_PI * u.y) * tangentX + roughnessB * sin(TWO_PI * u.y) * tangentY) + N;
H = normalize(H);
// Convert sample from half angle to incident angle
L = 2.0 * saturate(dot(V, H)) * H - V;
}
// weightOverPdf return the weight (without the diffuseAlbedo term) over pdf. diffuseAlbedo term must be apply by the caller.
void ImportanceSampleLambert(real2 u,
real3x3 localToWorld,
out real3 L,
out real NdotL,
out real weightOverPdf)
{
#if 0
real3 localL = SampleHemisphereCosine(u.x, u.y);
NdotL = localL.z;
L = mul(localL, localToWorld);
#else
real3 N = localToWorld[2];
L = SampleHemisphereCosine(u.x, u.y, N);
NdotL = saturate(dot(N, L));
#endif
// Importance sampling weight for each sample
// pdf = N.L / PI
// weight = fr * (N.L) with fr = diffuseAlbedo / PI
// weight over pdf is:
// weightOverPdf = (diffuseAlbedo / PI) * (N.L) / (N.L / PI)
// weightOverPdf = diffuseAlbedo
// diffuseAlbedo is apply outside the function
weightOverPdf = 1.0;
}
// weightOverPdf return the weight (without the Fresnel term) over pdf. Fresnel term must be apply by the caller.
void ImportanceSampleGGX(real2 u,
real3 V,
real3x3 localToWorld,
real roughness,
real NdotV,
out real3 L,
out real VdotH,
out real NdotL,
out real weightOverPdf)
{
real NdotH;
SampleGGXDir(u, V, localToWorld, roughness, L, NdotL, NdotH, VdotH);
// Importance sampling weight for each sample
// pdf = D(H) * (N.H) / (4 * (L.H))
// weight = fr * (N.L) with fr = F(H) * G(V, L) * D(H) / (4 * (N.L) * (N.V))
// weight over pdf is:
// weightOverPdf = F(H) * G(V, L) * (L.H) / ((N.H) * (N.V))
// 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))
// Remind (L.H) == (V.H)
// F is apply outside the function
real Vis = V_SmithJointGGX(NdotL, NdotV, roughness);
weightOverPdf = 4.0 * Vis * NdotL * VdotH / NdotH;
}
// weightOverPdf return the weight (without the Fresnel term) over pdf. Fresnel term must be apply by the caller.
void ImportanceSampleAnisoGGX(real2 u,
real3 V,
real3x3 localToWorld,
real roughnessT,
real roughnessB,
real NdotV,
out real3 L,
out real VdotH,
out real NdotL,
out real weightOverPdf)
{
real3 tangentX = localToWorld[0];
real3 tangentY = localToWorld[1];
real3 N = localToWorld[2];
real3 H;
SampleAnisoGGXDir(u, V, N, tangentX, tangentY, roughnessT, roughnessB, H, L);
real NdotH = saturate(dot(N, H));
// Note: since L and V are symmetric around H, LdotH == VdotH
VdotH = saturate(dot(V, H));
NdotL = saturate(dot(N, L));
// Importance sampling weight for each sample
// pdf = D(H) * (N.H) / (4 * (L.H))
// weight = fr * (N.L) with fr = F(H) * G(V, L) * D(H) / (4 * (N.L) * (N.V))
// weight over pdf is:
// weightOverPdf = F(H) * G(V, L) * (L.H) / ((N.H) * (N.V))
// 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))
// Remind (L.H) == (V.H)
// F is apply outside the function
// For anisotropy we must not saturate these values
real TdotV = dot(tangentX, V);
real BdotV = dot(tangentY, V);
real TdotL = dot(tangentX, L);
real BdotL = dot(tangentY, L);
real Vis = V_SmithJointGGXAniso(TdotV, BdotV, NdotV, TdotL, BdotL, NdotL, roughnessT, roughnessB);
weightOverPdf = 4.0 * Vis * NdotL * VdotH / NdotH;
}
// ----------------------------------------------------------------------------
// Pre-integration
// ----------------------------------------------------------------------------
#if !defined SHADER_API_GLES
// Ref: Listing 18 in "Moving Frostbite to PBR" + https://knarkowicz.wordpress.com/2014/12/27/analytical-dfg-term-for-ibl/
real4 IntegrateGGXAndDisneyDiffuseFGD(real NdotV, real roughness, uint sampleCount = 4096)
{
// Note that our LUT covers the full [0, 1] range.
// Therefore, we don't really want to clamp NdotV here (else the lerp slope is wrong).
// However, if NdotV is 0, the integral is 0, so that's not what we want, either.
// Our runtime NdotV bias is quite large, so we use a smaller one here instead.
NdotV = max(NdotV, REAL_EPS);
real3 V = real3(sqrt(1 - NdotV * NdotV), 0, NdotV);
real4 acc = real4(0.0, 0.0, 0.0, 0.0);
real3x3 localToWorld = k_identity3x3;
for (uint i = 0; i < sampleCount; ++i)
{
real2 u = Hammersley2d(i, sampleCount);
real VdotH;
real NdotL;
real weightOverPdf;
real3 L; // Unused
ImportanceSampleGGX(u, V, localToWorld, roughness, NdotV,
L, VdotH, NdotL, weightOverPdf);
if (NdotL > 0.0)
{
// Integral{BSDF * <N,L> dw} =
// Integral{(F0 + (1 - F0) * (1 - <V,H>)^5) * (BSDF / F) * <N,L> dw} =
// (1 - F0) * Integral{(1 - <V,H>)^5 * (BSDF / F) * <N,L> dw} + F0 * Integral{(BSDF / F) * <N,L> dw}=
// (1 - F0) * x + F0 * y = lerp(x, y, F0)
acc.x += weightOverPdf * pow(1 - VdotH, 5);
acc.y += weightOverPdf;
}
// for Disney we still use a Cosine importance sampling, true Disney importance sampling imply a look up table
ImportanceSampleLambert(u, localToWorld, L, NdotL, weightOverPdf);
if (NdotL > 0.0)
{
real LdotV = dot(L, V);
real disneyDiffuse = DisneyDiffuseNoPI(NdotV, NdotL, LdotV, RoughnessToPerceptualRoughness(roughness));
acc.z += disneyDiffuse * weightOverPdf;
}
}
acc /= sampleCount;
// Remap from the [0.5, 1.5] to the [0, 1] range.
acc.z -= 0.5;
return acc;
}
#else
// Not supported due to lack of random library in GLES 2
#define IntegrateGGXAndDisneyDiffuseFGD ERROR_ON_UNSUPPORTED_FUNCTION(IntegrateGGXAndDisneyDiffuseFGD)
#endif
uint GetIBLRuntimeFilterSampleCount(uint mipLevel)
{
uint sampleCount = 0;
switch (mipLevel)
{
case 1: sampleCount = 21; break;
case 2: sampleCount = 34; break;
#if defined(SHADER_API_MOBILE) || defined(SHADER_API_SWITCH)
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_PARAM(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 G = V_SmithJointGGX(NdotL, NdotV, roughness, partLambdaV) * 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);
}
real4 IntegrateLDCharlie(TEXTURECUBE_PARAM(tex, sampl),
real3 V,
real3 N,
real roughness,
uint sampleCount,
real invOmegaP,
bool prefilter)
{
// Local frame for the local to world sample transformation
real3x3 localToWorld = GetLocalFrame(N);
float NdotV = 1;
// Cumulative values
real3 lightInt = real3(0.0, 0.0, 0.0);
real cbsdfInt = 0.0;
for (uint i = 0; i < sampleCount; ++i)
{
// Generate a new random number
real2 u = Hammersley2d(i, sampleCount);
// Generate the matching direction with a cosine importance sampling
float3 localL = SampleHemisphereCosine(u.x, u.y);
// Convert it to world space
real3 L = mul(localL, localToWorld);
float NdotL = saturate(dot(N, L));
// Are we in the hemisphere?
if (NdotL <= 0) continue; // Note that some samples will have 0 contribution
// 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 * V * NdotL.
// PDF = 1.0 / NdotL
// Weight = CBSDF / PDF = F * D * V
// Since we perform filtering with the assumption that (V == N),
// (LdotH == NdotH) && (NdotV == 1) && (Weight == F * D * V)
// Therefore, after the Monte Carlo expansion of the integrals,
// X = Sum(Radiance(L) * Weight) / Sum(Weight) = Sum(Radiance(L) * F * D * V) / Sum(F * D * V).
// We are in the supposition that N == V
float LdotV, NdotH, LdotH, invLenLV;
GetBSDFAngle(V, L, NdotL, NdotV, LdotV, NdotH, LdotH, invLenLV);
// BRDF data
real F = 1;
real D = D_Charlie(NdotH, roughness);
real Vis = V_Charlie(NdotL, NdotV, roughness);
real mipLevel = 0;
if (prefilter) // 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;
// real PDF = 1.0f / NdotL
// Since (N == V), NdotH == LdotH.
real pdf = 1.0 / NdotL;
// 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;
// Use the approximation from "Real Shading in Unreal Engine 4": Weight ~ NdotL.
lightInt += val * F * D * Vis;
cbsdfInt += F * D * Vis;
}
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_PARAM(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);
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 = 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, REAL_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