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397 行
13 KiB
397 行
13 KiB
#ifndef UNITY_AREA_LIGHTING_INCLUDED
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#define UNITY_AREA_LIGHTING_INCLUDED
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#define APPROXIMATE_POLY_LIGHT_AS_SPHERE_LIGHT
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#define APPROXIMATE_SPHERE_LIGHT_NUMERICALLY
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// Not normalized by the factor of 1/TWO_PI.
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real3 ComputeEdgeFactor(real3 V1, real3 V2)
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{
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real V1oV2 = dot(V1, V2);
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real3 V1xV2 = cross(V1, V2);
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#if 0
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return V1xV2 * (rsqrt(1.0 - V1oV2 * V1oV2) * acos(V1oV2));
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#else
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// Approximate: { y = rsqrt(1.0 - V1oV2 * V1oV2) * acos(V1oV2) } on [0, 1].
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// Fit: HornerForm[MiniMaxApproximation[ArcCos[x]/Sqrt[1 - x^2], {x, {0, 1 - $MachineEpsilon}, 6, 0}][[2, 1]]].
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// Maximum relative error: 2.6855360216340534 * 10^-6. Intensities up to 1000 are artifact-free.
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real x = abs(V1oV2);
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real y = 1.5707921083647782 + x * (-0.9995697178013095 + x * (0.778026455830408 + x * (-0.6173111361273548 + x * (0.4202724111150622 + x * (-0.19452783598217288 + x * 0.04232040013661036)))));
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if (V1oV2 < 0)
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{
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// Undo range reduction.
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y = PI * rsqrt(saturate(1 - V1oV2 * V1oV2)) - y;
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}
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return V1xV2 * y;
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#endif
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}
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// Not normalized by the factor of 1/TWO_PI.
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// Ref: Improving radiosity solutions through the use of analytically determined form-factors.
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real IntegrateEdge(real3 V1, real3 V2)
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{
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// 'V1' and 'V2' are represented in a coordinate system with N = (0, 0, 1).
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return ComputeEdgeFactor(V1, V2).z;
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}
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// 'sinSqSigma' is the sine^2 of the real of the opening angle of the sphere as seen from the shaded point.
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// 'cosOmega' is the cosine of the angle between the normal and the direction to the center of the light.
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// N.b.: this function accounts for horizon clipping.
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real DiffuseSphereLightIrradiance(real sinSqSigma, real cosOmega)
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{
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#ifdef APPROXIMATE_SPHERE_LIGHT_NUMERICALLY
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real x = sinSqSigma;
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real y = cosOmega;
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// Use a numerical fit found in Mathematica. Mean absolute error: 0.00476944.
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// You can use the following Mathematica code to reproduce our results:
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// t = Flatten[Table[{x, y, f[x, y]}, {x, 0, 0.999999, 0.001}, {y, -0.999999, 0.999999, 0.002}], 1]
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// m = NonlinearModelFit[t, x * (y + e) * (0.5 + (y - e) * (a + b * x + c * x^2 + d * x^3)), {a, b, c, d, e}, {x, y}]
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return saturate(x * (0.9245867471551246 + y) * (0.5 + (-0.9245867471551246 + y) * (0.5359050373687144 + x * (-1.0054221851257754 + x * (1.8199061187417047 - x * 1.3172081704209504)))));
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#else
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#if 0 // Ref: Area Light Sources for Real-Time Graphics, page 4 (1996).
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real sinSqOmega = saturate(1 - cosOmega * cosOmega);
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real cosSqSigma = saturate(1 - sinSqSigma);
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real sinSqGamma = saturate(cosSqSigma / sinSqOmega);
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real cosSqGamma = saturate(1 - sinSqGamma);
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real sinSigma = sqrt(sinSqSigma);
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real sinGamma = sqrt(sinSqGamma);
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real cosGamma = sqrt(cosSqGamma);
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real sigma = asin(sinSigma);
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real omega = acos(cosOmega);
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real gamma = asin(sinGamma);
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if (omega >= HALF_PI + sigma)
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{
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// Full horizon occlusion (case #4).
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return 0;
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}
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real e = sinSqSigma * cosOmega;
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UNITY_BRANCH
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if (omega < HALF_PI - sigma)
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{
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// No horizon occlusion (case #1).
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return e;
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}
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else
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{
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real g = (-2 * sqrt(sinSqOmega * cosSqSigma) + sinGamma) * cosGamma + (HALF_PI - gamma);
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real h = cosOmega * (cosGamma * sqrt(saturate(sinSqSigma - cosSqGamma)) + sinSqSigma * asin(saturate(cosGamma / sinSigma)));
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if (omega < HALF_PI)
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{
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// Partial horizon occlusion (case #2).
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return saturate(e + INV_PI * (g - h));
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}
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else
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{
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// Partial horizon occlusion (case #3).
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return saturate(INV_PI * (g + h));
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}
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}
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#else // Ref: Moving Frostbite to Physically Based Rendering, page 47 (2015, optimized).
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real cosSqOmega = cosOmega * cosOmega; // y^2
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UNITY_BRANCH
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if (cosSqOmega > sinSqSigma) // (y^2)>x
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{
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return saturate(sinSqSigma * cosOmega); // Clip[x*y,{0,1}]
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}
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else
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{
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real cotSqSigma = rcp(sinSqSigma) - 1; // 1/x-1
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real tanSqSigma = rcp(cotSqSigma); // x/(1-x)
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real sinSqOmega = 1 - cosSqOmega; // 1-y^2
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real w = sinSqOmega * tanSqSigma; // (1-y^2)*(x/(1-x))
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real x = -cosOmega * rsqrt(w); // -y*Sqrt[(1/x-1)/(1-y^2)]
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real y = sqrt(sinSqOmega * tanSqSigma - cosSqOmega); // Sqrt[(1-y^2)*(x/(1-x))-y^2]
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real z = y * cotSqSigma; // Sqrt[(1-y^2)*(x/(1-x))-y^2]*(1/x-1)
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real a = cosOmega * acos(x) - z; // y*ArcCos[-y*Sqrt[(1/x-1)/(1-y^2)]]-Sqrt[(1-y^2)*(x/(1-x))-y^2]*(1/x-1)
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real b = atan(y); // ArcTan[Sqrt[(1-y^2)*(x/(1-x))-y^2]]
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return saturate(INV_PI * (a * sinSqSigma + b));
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}
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#endif
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#endif
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}
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// Expects non-normalized vertex positions.
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real PolygonIrradiance(real4x3 L)
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{
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#ifdef APPROXIMATE_POLY_LIGHT_AS_SPHERE_LIGHT
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UNITY_UNROLL
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for (uint i = 0; i < 4; i++)
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{
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L[i] = normalize(L[i]);
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}
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real3 F = real3(0, 0, 0);
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UNITY_UNROLL
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for (uint edge = 0; edge < 4; edge++)
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{
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real3 V1 = L[edge];
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real3 V2 = L[(edge + 1) % 4];
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F += INV_TWO_PI * ComputeEdgeFactor(V1, V2);
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}
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// Clamp invalid values to avoid visual artifacts.
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real f2 = saturate(dot(F, F));
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real sinSqSigma = min(sqrt(f2), 0.999);
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real cosOmega = clamp(F.z * rsqrt(f2), -1, 1);
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return DiffuseSphereLightIrradiance(sinSqSigma, cosOmega);
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#else
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// 1. ClipQuadToHorizon
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// detect clipping config
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uint config = 0;
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if (L[0].z > 0) config += 1;
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if (L[1].z > 0) config += 2;
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if (L[2].z > 0) config += 4;
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if (L[3].z > 0) config += 8;
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// The fifth vertex for cases when clipping cuts off one corner.
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// Due to a compiler bug, copying L into a vector array with 5 rows
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// messes something up, so we need to stick with the matrix + the L4 vertex.
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real3 L4 = L[3];
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// This switch is surprisingly fast. Tried replacing it with a lookup array of vertices.
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// Even though that replaced the switch with just some indexing and no branches, it became
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// way, way slower - mem fetch stalls?
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// clip
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uint n = 0;
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switch (config)
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{
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case 0: // clip all
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break;
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case 1: // V1 clip V2 V3 V4
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n = 3;
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L[1] = -L[1].z * L[0] + L[0].z * L[1];
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L[2] = -L[3].z * L[0] + L[0].z * L[3];
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break;
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case 2: // V2 clip V1 V3 V4
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n = 3;
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L[0] = -L[0].z * L[1] + L[1].z * L[0];
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L[2] = -L[2].z * L[1] + L[1].z * L[2];
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break;
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case 3: // V1 V2 clip V3 V4
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n = 4;
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L[2] = -L[2].z * L[1] + L[1].z * L[2];
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L[3] = -L[3].z * L[0] + L[0].z * L[3];
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break;
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case 4: // V3 clip V1 V2 V4
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n = 3;
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L[0] = -L[3].z * L[2] + L[2].z * L[3];
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L[1] = -L[1].z * L[2] + L[2].z * L[1];
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break;
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case 5: // V1 V3 clip V2 V4: impossible
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break;
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case 6: // V2 V3 clip V1 V4
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n = 4;
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L[0] = -L[0].z * L[1] + L[1].z * L[0];
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L[3] = -L[3].z * L[2] + L[2].z * L[3];
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break;
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case 7: // V1 V2 V3 clip V4
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n = 5;
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L4 = -L[3].z * L[0] + L[0].z * L[3];
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L[3] = -L[3].z * L[2] + L[2].z * L[3];
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break;
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case 8: // V4 clip V1 V2 V3
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n = 3;
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L[0] = -L[0].z * L[3] + L[3].z * L[0];
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L[1] = -L[2].z * L[3] + L[3].z * L[2];
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L[2] = L[3];
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break;
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case 9: // V1 V4 clip V2 V3
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n = 4;
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L[1] = -L[1].z * L[0] + L[0].z * L[1];
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L[2] = -L[2].z * L[3] + L[3].z * L[2];
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break;
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case 10: // V2 V4 clip V1 V3: impossible
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break;
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case 11: // V1 V2 V4 clip V3
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n = 5;
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L[3] = -L[2].z * L[3] + L[3].z * L[2];
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L[2] = -L[2].z * L[1] + L[1].z * L[2];
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break;
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case 12: // V3 V4 clip V1 V2
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n = 4;
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L[1] = -L[1].z * L[2] + L[2].z * L[1];
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L[0] = -L[0].z * L[3] + L[3].z * L[0];
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break;
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case 13: // V1 V3 V4 clip V2
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n = 5;
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L[3] = L[2];
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L[2] = -L[1].z * L[2] + L[2].z * L[1];
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L[1] = -L[1].z * L[0] + L[0].z * L[1];
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break;
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case 14: // V2 V3 V4 clip V1
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n = 5;
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L4 = -L[0].z * L[3] + L[3].z * L[0];
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L[0] = -L[0].z * L[1] + L[1].z * L[0];
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break;
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case 15: // V1 V2 V3 V4
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n = 4;
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break;
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}
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if (n == 0) return 0;
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// 2. Project onto sphere
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L[0] = normalize(L[0]);
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L[1] = normalize(L[1]);
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L[2] = normalize(L[2]);
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switch (n)
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{
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case 3:
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L[3] = L[0];
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break;
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case 4:
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L[3] = normalize(L[3]);
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L4 = L[0];
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break;
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case 5:
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L[3] = normalize(L[3]);
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L4 = normalize(L4);
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break;
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}
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// 3. Integrate
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real sum = 0;
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sum += IntegrateEdge(L[0], L[1]);
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sum += IntegrateEdge(L[1], L[2]);
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sum += IntegrateEdge(L[2], L[3]);
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if (n >= 4)
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sum += IntegrateEdge(L[3], L4);
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if (n == 5)
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sum += IntegrateEdge(L4, L[0]);
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sum *= INV_TWO_PI; // Normalization
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sum = max(sum, 0.0);
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return isfinite(sum) ? sum : 0.0;
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#endif
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}
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real LineFpo(real tLDDL, real lrcpD, real rcpD)
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{
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// Compute: ((l / d) / (d * d + l * l)) + (1.0 / (d * d)) * atan(l / d).
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return tLDDL + (rcpD * rcpD) * FastATan(lrcpD);
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}
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real LineFwt(real tLDDL, real l)
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{
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// Compute: l * ((l / d) / (d * d + l * l)).
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return l * tLDDL;
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}
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// Computes the integral of the clamped cosine over the line segment.
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// 'l1' and 'l2' define the integration interval.
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// 'tangent' is the line's tangent direction.
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// 'normal' is the direction orthogonal to the tangent. It is the shortest vector between
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// the shaded point and the line, pointing away from the shaded point.
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real LineIrradiance(real l1, real l2, real3 normal, real3 tangent)
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{
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real d = length(normal);
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real l1rcpD = l1 * rcp(d);
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real l2rcpD = l2 * rcp(d);
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real tLDDL1 = l1rcpD / (d * d + l1 * l1);
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real tLDDL2 = l2rcpD / (d * d + l2 * l2);
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real intWt = LineFwt(tLDDL2, l2) - LineFwt(tLDDL1, l1);
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real intP0 = LineFpo(tLDDL2, l2rcpD, rcp(d)) - LineFpo(tLDDL1, l1rcpD, rcp(d));
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return intP0 * normal.z + intWt * tangent.z;
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}
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// Computes 1.0 / length(mul(ortho, transpose(inverse(invM)))).
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real ComputeLineWidthFactor(real3x3 invM, real3 ortho)
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{
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// transpose(inverse(M)) = (1.0 / determinant(M)) * cofactor(M).
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// Take into account that m12 = m21 = m23 = m32 = 0 and m33 = 1.
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real det = invM._11 * invM._22 - invM._22 * invM._31 * invM._13;
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real3x3 cof = {invM._22, 0.0, -invM._22 * invM._31,
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0.0, invM._11 - invM._13 * invM._31, 0.0,
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-invM._13 * invM._22, 0.0, invM._11 * invM._22};
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// 1.0 / length(mul(V, (1.0 / s * M))) = abs(s) / length(mul(V, M)).
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return abs(det) / length(mul(ortho, cof));
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}
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// For line lights.
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real LTCEvaluate(real3 P1, real3 P2, real3 B, real3x3 invM)
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{
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// Inverse-transform the endpoints.
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P1 = mul(P1, invM);
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P2 = mul(P2, invM);
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// Terminate the algorithm if both points are below the horizon.
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if (P1.z <= 0.0 && P2.z <= 0.0) return 0.0;
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real width = ComputeLineWidthFactor(invM, B);
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if (P1.z > P2.z)
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{
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// Convention: 'P2' is above 'P1', with the tangent pointing upwards.
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Swap(P1, P2);
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}
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// Recompute the length and the tangent in the new coordinate system.
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real len = length(P2 - P1);
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real3 T = normalize(P2 - P1);
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// Clip the part of the light below the horizon.
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if (P1.z <= 0.0)
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{
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// P = P1 + t * T; P.z == 0.
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real t = -P1.z / T.z;
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P1 = real3(P1.xy + t * T.xy, 0.0);
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// Set the length of the visible part of the light.
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len -= t;
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}
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// Compute the normal direction to the line, s.t. it is the shortest vector
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// between the shaded point and the line, pointing away from the shaded point.
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// Can be interpreted as a point on the line, since the shaded point is at the origin.
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real proj = dot(P1, T);
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real3 P0 = P1 - proj * T;
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// Compute the parameterization: distances from 'P1' and 'P2' to 'P0'.
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real l1 = proj;
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real l2 = l1 + len;
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// Integrate the clamped cosine over the line segment.
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real irradiance = LineIrradiance(l1, l2, P0, T);
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// Guard against numerical precision issues.
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return max(INV_PI * width * irradiance, 0.0);
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}
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#endif // UNITY_AREA_LIGHTING_INCLUDED
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