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Revision as of 13:30, 13 March 2017 by Kqpham (talk | contribs) (Assignment 1 Ray Tracing)

TBD...

Team Member

  1. Kevin Pham
  2. Jay Zha
  3. Peiying Yang
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Progress

Assignment 1

FileCompressor

Environment:
System: Windows 10
CPU: i5-6400 2.70GHz
RAM: 8GB 2444Hz
Video card: NVIDIA GTX 1060 3GB


The size of file before compressing is 128MB After:65.2MB (Depend on the file)
 


Here is the major code to compress a file :

 
The following image shows that the CompressCore function takes 99.55% of the time to compress a 128MB file.
 


As the size of file increase, the time that this program spend on compressing a file will increase.
 



Assignment 1 Suduko

Environment:
System: Windows 10
CPU: i7-6800K 3.40GHz
RAM: 16GB 2133Hz
Video card: NVIDIA GTX 650


Assignment 1 Ray Tracing

Environment:
System: Windows 10
CPU: i7-6700HQ 2.60GHz
RAM: 16GB 21337Hz
Video card: NVIDIA GTX 1060 6GB


Program: raytracing.cpp from scratchpixel.com tutorial on basic raytracing. website along with source code location: [1]


Compilation

Unix -

      g++ -O2 -o raytrace raytracer.cpp
      raytrace

OSX -

      clang++ -O2 -o raytrace raytracer.cpp
      raytrace

From the compilation it creates this ppm file

 


Running the Flat Profile: gprof -p -b raytrace > raytrace.flt

gives us this :

Flat profile:

Each sample counts as 0.01 seconds.

 %   cumulative   self              self     total           
time   seconds   seconds    calls  us/call  us/call  name    
87.76      0.43     0.43   307200     1.40     1.40  trace(Vec3<float> const&, Vec3<float> const&, std::vector<Sphere, std::allocator<Sphere> > const&, int const&)
12.24      0.49     0.06                             render(std::vector<Sphere, std::allocator<Sphere> > const&)
 0.00      0.49     0.00        4     0.00     0.00  std::vector<Sphere, std::allocator<Sphere> >::_M_insert_aux(__gnu_cxx::__normal_iterator<Sphere*, std::vector<Sphere, std::allocator<Sphere> > >, Sphere const&)
 0.00      0.49     0.00        1     0.00     0.00  _GLOBAL__sub_I__Z3mixRKfS0_S0_

Observation:

From looking at the result of the flat profile we can see that the trace and the render functions take the most time to run.


Running the call graph: gprof -q -b raytrace > raytrace.clg

 

Observation: From looking at both the flat profile and the call graph we can see that both the trace and the render functions are the hot spots of the program.


Possible Parallelizations:

When looking at both the Trace Function and the render function.

Render Function :

void render(const std::vector<Sphere> &spheres) {

   unsigned width = 640, height = 480;
   Vec3f *image = new Vec3f[width * height], *pixel = image;
   float invWidth = 1 / float(width), invHeight = 1 / float(height);
   float fov = 30, aspectratio = width / float(height);
   float angle = tan(M_PI * 0.5 * fov / 180.);
   // Trace rays
   for (unsigned y = 0; y < height; ++y) {    Possible Parallelization  spot
       for (unsigned x = 0; x < width; ++x, ++pixel) {
           float xx = (2 * ((x + 0.5) * invWidth) - 1) * angle * aspectratio;
           float yy = (1 - 2 * ((y + 0.5) * invHeight)) * angle;
           Vec3f raydir(xx, yy, -1);
           raydir.normalize();
           *pixel = trace(Vec3f(0), raydir, spheres, 0);
       }
   }
   // Save result to a PPM image (keep these flags if you compile under Windows)
   std::ofstream ofs("./untitled.ppm", std::ios::out | std::ios::binary);
   ofs << "P6\n" << width << " " << height << "\n255\n";
   for (unsigned i = 0; i < width * height; ++i) {
       ofs << (unsigned char)(std::min(float(1), image[i].x) * 255) <<
              (unsigned char)(std::min(float(1), image[i].y) * 255) <<
              (unsigned char)(std::min(float(1), image[i].z) * 255);
   }
   ofs.close();
   delete [] image;

}

In the render function it has a runtime speed of T(n) = o^2.


Trace Function:

Vec3f trace(

   const Vec3f &rayorig,
   const Vec3f &raydir,
   const std::vector<Sphere> &spheres,
   const int &depth)

{

   //if (raydir.length() != 1) std::cerr << "Error " << raydir << std::endl;
   float tnear = INFINITY;
   const Sphere* sphere = NULL;
   // find intersection of this ray with the sphere in the scene
   for (unsigned i = 0; i < spheres.size(); ++i) {
       float t0 = INFINITY, t1 = INFINITY;
       if (spheres[i].intersect(rayorig, raydir, t0, t1)) {
           if (t0 < 0) t0 = t1;
           if (t0 < tnear) {
               tnear = t0;
               sphere = &spheres[i];
           }
       }
   }
   // if there's no intersection return black or background color
   if (!sphere) return Vec3f(2);
   Vec3f surfaceColor = 0; // color of the ray/surfaceof the object intersected by the ray
   Vec3f phit = rayorig + raydir * tnear; // point of intersection
   Vec3f nhit = phit - sphere->center; // normal at the intersection point
   nhit.normalize(); // normalize normal direction
   // If the normal and the view direction are not opposite to each other
   // reverse the normal direction. That also means we are inside the sphere so set
   // the inside bool to true. Finally reverse the sign of IdotN which we want
   // positive.
   float bias = 1e-4; // add some bias to the point from which we will be tracing
   bool inside = false;
   if (raydir.dot(nhit) > 0) nhit = -nhit, inside = true;
   if ((sphere->transparency > 0 || sphere->reflection > 0) && depth < MAX_RAY_DEPTH) {
       float facingratio = -raydir.dot(nhit);
       // change the mix value to tweak the effect
       float fresneleffect = mix(pow(1 - facingratio, 3), 1, 0.1);
       // compute reflection direction (not need to normalize because all vectors
       // are already normalized)
       Vec3f refldir = raydir - nhit * 2 * raydir.dot(nhit);
       refldir.normalize();
       Vec3f reflection = trace(phit + nhit * bias, refldir, spheres, depth + 1);
       Vec3f refraction = 0;
       // if the sphere is also transparent compute refraction ray (transmission)
       if (sphere->transparency) {
           float ior = 1.1, eta = (inside) ? ior : 1 / ior; // are we inside or outside the surface?
           float cosi = -nhit.dot(raydir);
           float k = 1 - eta * eta * (1 - cosi * cosi);
           Vec3f refrdir = raydir * eta + nhit * (eta *  cosi - sqrt(k));
           refrdir.normalize();
           refraction = trace(phit - nhit * bias, refrdir, spheres, depth + 1);
       }
       // the result is a mix of reflection and refraction (if the sphere is transparent)
       surfaceColor = (
           reflection * fresneleffect +
           refraction * (1 - fresneleffect) * sphere->transparency) * sphere->surfaceColor;
   }
   else {
       // it's a diffuse object, no need to raytrace any further
       for (unsigned i = 0; i < spheres.size(); ++i) {
           if (spheres[i].emissionColor.x > 0) {
               // this is a light
               Vec3f transmission = 1;
               Vec3f lightDirection = spheres[i].center - phit;
               lightDirection.normalize();
               for (unsigned j = 0; j < spheres.size(); ++j) {
                   if (i != j) {
                       float t0, t1;
                       if (spheres[j].intersect(phit + nhit * bias, lightDirection, t0, t1)) {
                           transmission = 0;
                           break;
                       }
                   }
               }
               surfaceColor += sphere->surfaceColor * transmission *
               std::max(float(0), nhit.dot(lightDirection)) * spheres[i].emissionColor;
           }
       }
   }
   
   return surfaceColor + sphere->emissionColor;

}


Within this trace function the possible parallelization points would be here :

{

   else {
       // it's a diffuse object, no need to raytrace any further
       for (unsigned i = 0; i < spheres.size(); ++i) {
           if (spheres[i].emissionColor.x > 0) {
               // this is a light
               Vec3f transmission = 1;
               Vec3f lightDirection = spheres[i].center - phit;
               lightDirection.normalize();
               for (unsigned j = 0; j < spheres.size(); ++j) {
                   if (i != j) {
                       float t0, t1;
                       if (spheres[j].intersect(phit + nhit * bias, lightDirection, t0, t1)) {
                           transmission = 0;
                           break;
                       }
                   }
               }
               surfaceColor += sphere->surfaceColor * transmission *
               std::max(float(0), nhit.dot(lightDirection)) * spheres[i].emissionColor;
           }
       }
   }
   
   return surfaceColor + sphere->emissionColor;

}

In this function it has a runtime speed of T(n) = O^2.

Assignment 2

Assignment 3