Hopefully this little write-up is helpful to you. It overviews a big chunk of what I've learned about WebGL and 3D in general. BTW, if I've gotten anything wrong, somebody please correct me -- because I'm still learning, too!
The WebGL spec was intentionally left very low-level, leaving a lot to
be re-implemented from one application to the next. It is up to the
community to write frameworks for automation, and up to the developer
to choose which framework to use (if any). It's not entirely difficult
to roll your own, but it does mean a lot of overhead spent on
reinventing the wheel. (FWIW, I've been working on my own WebGL
framework called Jax for a while
The graphics driver supplies the implementation of OpenGL ES that actually runs your code. At this point, it's running on the machine hardware, below even the C code. While this is what makes WebGL possible in the first place, it's also a double edged sword because bugs in the OpenGL ES driver (which I've noted quite a number of already) will show up in your Web application, and you won't necessarily know it unless you can count on your user base to file coherent bug reports including OS, video hardware and driver versions. Here's what the debug process for such issues ends up looking like.
On Windows, there's an extra layer which exists between the WebGL API and the hardware: ANGLE, or "Almost Native Graphics Layer Engine". Because the OpenGL ES drivers on Windows generally suck, ANGLE receives those calls and translates them into DirectX 9 calls instead.
Drawing in 3D
Now that you know how the pieces come together, let's look at a lower level explanation of how everything comes together to produce a 3D image.
The rest of the process is very modular. You need to get vertex data and any other information you intend to use (such as vertex colors, texture coordinates, and so forth) down to the graphics pipeline using uniforms and attributes which are defined in the shader, but the exact layout and naming of this information is very much up to the developer.
Once the information is available to the shader, the shader must transform the information in 2 phases to produce 3D objects. The first phase is the vertex shader, which sets up the mesh coordinates. (This stage runs entirely on the video card, below all of the APIs discussed above.) Most usually, the process performed on the vertex shader looks something like this:
gl_Position = PROJECTION_MATRIX * VIEW_MATRIX * MODEL_MATRIX * VERTEX_POSITION
VERTEX_POSITION is a 4D vector (x, y, z, and w which is usually set to 1);
VIEW_MATRIX is a 4x4 matrix representing the camera's view into the world;
MODEL_MATRIX is a 4x4 matrix which transforms object-space coordinates (that is, coords local to the object before rotation or translation have been applied) into world-space coordinates; and
PROJECTION_MATRIX which represents the camera's lens.
Most often, the
MODEL_MATRIX are precomputed and
MODELVIEW_MATRIX. Occasionally, all 3 are precomputed into
MODELVIEW_PROJECTION_MATRIX or just
MVP. These are generally meant
as optimizations, though I'd like find time to do some benchmarks. It's
this case, the hardware acceleration afforded by doing the math on the
of course hope that future JS implementations will resolve this potential
gotcha by simply being faster.
Normalized Device Coordinates (NDC)
When all of these have been applied, the
gl_Position variable will have a set of XYZ coordinates ranging within [-1, 1], and a W component. These are called normalized device coordinates (NDC).
It's worth noting that NDC is the only thing the vertex shader really
needs to produce. You can completely skip the matrix transformations
performed above, as long as you produce an NDC result. (I have even
experimented with swapping out matrices for quaternions; it worked
just fine but I scrapped the project because I didn't get the
performance improvements I'd hoped for.)
From here, projecting a pixel onto the screen is a simple matter of multiplying by 1/2 the screen dimensions and then adding 1/2 the screen dimensions. Here are some examples of NDC coordinates translated into 2D coordinates on an 800x600 display:
NDC = [0, 0]
x = (0 * 800/2) + 800/2 = 400
y = (0 * 600/2) + 600/2 = 300
NDC = [0.5, 0.5]
x = (0.5 * 800/2) + 800/2 = 200 + 400 = 600
y = (0.5 * 600/2) + 600/2 = 150 + 300 = 450
NDC = [-0.5, -0.25]
x = (-0.5 * 800/2) + 800/2 = -200 + 400 = 200
y = (-0.25 * 600/2) + 600/2 = -150 + 300 = 150
Once it's been determined where a pixel should be drawn (via NDC), the pixel is handed off to the pixel shader, which chooses the actual color the pixel will be. This can be done in a myriad of ways, ranging from simply hard-coding a specific color to texture lookups to more advanced normal and parallax mapping (which are essentially ways of "cheating" texture lookups to produce different effects).
Depth and the Depth Buffer
Now, so far we've ignored the Z component of NDC. Here's how that works out. When we multiplied by the projection matrix, the third NDC component resulted in some number. If that number is greater than 1.0 or less than 0.0, then the number is beyond the view range of the projection matrix, corresponding to the matrix zFar and zNear values, respectively.
So if it's not in the range [0, 1] then it's clipped entirely. If it is in that range, then the Z value is compared to the depth buffer. The depth buffer is equal to the screen dimensions, so that if a projection of 800x600 is used, the depth buffer is 800 pixels wide and 600 pixels high. We already have the pixel's X and Y coordinates, so they are plugged into the depth buffer to get the currently stored Z value. If the Z value is greater than the new Z value, then the new Z value is closer than whatever was previously drawn, and replaces it. At this point it's safe to light up the pixel in question (or in the case of WebGL, draw the pixel to the canvas), and store the Z value as the new depth value.
If the Z value is greater than the stored depth value, then it is deemed to be "behind" whatever has already been drawn, and the pixel is discarded.