SwissGL is a minimalistic wrapper on top of WebGL2 JS API. It's designed to reduce the amount of boilerplate code required to manage GLSL shaders, textures and framebuffers when making GPGPU-style procedural visualizations or simulations. See the demos for examples of using SwissGL. As of now the library consists of a standalone <700 loc .js file.
Disclaimer This is not an officially supported Google product. SwissGL is an early stage experiment, incomplete and unstable. It's an invitation to discuss compact and expressive graphics library design, which I hope is relevant in light of the upcoming arrival of WebGPU.
As of now, the library API consists of a single function object that does everything (like a Swiss Army knife). Here is a tiny example of using it to draw an animated gradient quad:
<script src="swissgl.js"></script>
<canvas id="c" width="400" height="300"></canvas>
<script>
const canvas = document.getElementById('c');
// create WebGL2 context end SwissGL
const glsl = SwissGL(canvas);
function render(t) {
t /= 1000; // ms to sec
glsl({t, // pass uniform 't' to GLSL
Mesh:[10, 10], // draw a 10x10 tessellated plane mesh
// Vertex shader expression returns vec4 vertex position in
// WebGL clip space. 'XY' and 'UV' are vec2 input vertex
// coordinates in [-1,1] and [0,1] ranges.
VP:`XY*0.8+sin(t+XY.yx*2.0)*0.2,0,1`,
// Fragment shader returns 'RGBA'
FP:`UV,0.5,1`});
requestAnimationFrame(render);
}
requestAnimationFrame(render);
</script>
glsl function has the following signature:
glsl(params, target);All it can do is to draw instanced, tessellated plane primitives into the specified (may be created in-place) target buffer using the provided vertex and fragment shaders. This may sound unimpressive, but we'll see that it's possible to do some pretty complex things with such a simple tool! Please refer to the API reference for the detailed explanation glsl arguments. Let's now have a look at the more elaborate example of using SwissGL to implement a particle simulation.
Inspired by the beautiful video by Tom Mohr, let's try reproduce the "snake" pattern shown there. Particle Life is made of particles of a few different types. All particles repel when they are closer than some distance
const K = 6; // number of particle types
const F = glsl({K, FP:
`float(I.x==I.y) + 0.1*float(I.x==(I.y+1)%int(K))`},
{size:[K,K], format:'r16f', tag:'F'});This creates a single channel float16 texture of size [width,height]==[6,6] and populates its values by evaluating the FP expression in a newly created fragment shader. I is a special variable of type ivec2 that contains coordinates of the pixel being evaluated. The second (target) object must contain the tag parameter that is used to store the newly created render target in the glsl object for later use.
We can easily visualize the resulting texture to make sure everything is ok:
glsl({F, FP:`F(I/20).x*3.0`});
Uniform textures can be accessed with usual GLSL functions, or with a helper macro that has the same name as the texture uniform. Passing ivec2 as parameter makes it call texelFetch() to get a texel using the integer coordinates, passing vec2 uses texture(), with filtering and wrapping.
The next step is to create a list of textures that is going to contain particle positions. Each pixel will contain a single particle position and type.
const points = glsl({}, {size:[30,10], story:3, format:'rgba32f', tag:'points'});We are going to simulate 30*10=300 particles. Textures will have 4 channels (RGBA) of type float32. The story:3 argument says that we need to create a cyclic buffer of three textures of the same format, so that we can read two consecutive states of the particle system (for momentum) to produce the third. We don't provide any shader code in the first argument here, but we can initialize these textures later by passing the returned object as a target:
for (let i=0; i<2; ++i) {
glsl({K, seed:123, FP:`
vec2 pos = (hash(ivec3(I, seed)).xy-0.5)*10.0;
float color = floor(UV.x*K);
FOut = vec4(pos, 0.0, color);`},
points);
}The shader code above uses "multiline" shader code format instead of a single expression. The output must be written to a global variable FOut. Variable UV has type vec2 and provides [0,1]-range normalized coordinates of the current pixel. It is used to assign one of K "colors" to each particle. For convenience SwissGL provides a simple hash function vec3 hash(ivec3) that can be used as a deterministic random number generator.
Note that we are writing the same particle positions two times, which means that particles have zero velocity at initialization. Now points[0] and points[1] contain the same values, and points[2] is uninitialized and is going to be overwritten at the first simulation step.
Before we start modeling the particle dynamics it's a good idea to implement visualization. So far we've already seen "expression" and "multiline" shortcut code formats. Now we are going to write a full vertex-fragment shader pair:
glsl({K, worldExtent, // uniforms
// reading the last state of 'points' texture
points: points[0],
// render a quad instance for every 'points' texel
Grid: points[0].size,
// preserve the scale of xy-axes by fitting
// [-1..1]x[-1..1] box into the view
Aspect:'fit',
// blend primitives using alpha transparency
Blend: 'd*(1-sa)+s*sa',
// the 'Inc' code is available in both
// vertex and fragment shaders
Inc:`varying vec3 color;`,
// vertex shader that defines where to draw
// the quad primitives
VP:`
// fetch the current particle data
vec4 d = points(ID.xy);
// populate color varying to use in fragment shader
color = cos((d.w/K+vec3(0,0.33,0.66))*TAU)*0.5+0.5;
// set the clip-space vertex position, 'vec2 XY' contains
// coordinates of the quad vertex in -1..1 range
VOut.xy = 2.0*(d.xy+XY/8.0)/worldExtent;`,
// Set the the fragment color and transparency
// depending on the distance from the quad center.
// Interpolated XY values are also available
// in the fragment shader.
FP:`color, smoothstep(1.0, 0.6, length(XY))`});
// 'target' argument is omitted, so rendering to canvasRunning this code in the drawing loop produces the following image:
The vertex shader computes WebGL Clip Space coordinates for each corner of each particle quad. We map particle positions from [-worldExtent/2, worldExtent/2] range to [-1,1] box. This shader also computes particle color using cosine palettes trick and passes it to the fragment shader along with the corner offset vector. The fragment shader calculates pixel opacity using the distance form the particle center. This way we can use low-level GLSL as an expressive, flexible and performant tool to render large numbers of primitives.
Now we can set particles in motion by writing the update shader that computes new particle positions each frame.
glsl({F, worldExtent, repulsion, inertia, dt, // uniforms
// The current state of the system is implicitly
// available to the shader as 'Src' uniform if
// the target has history (is an array of textures).
// Here we explicitly pass the state one step at the past
past:points[1], FP:`
// this function wraps positions and velocities to
// [-worldExtent/2, worldExtent/2] range
vec3 wrap(vec3 p) {
return (fract(p/worldExtent+0.5)-0.5)*worldExtent;
}
void fragment() {
// read the current particle state
FOut = Src(I);
vec3 force=vec3(0); // force accumulator
// iterate over particles
for (int y=0; y<ViewSize.y; ++y)
for (int x=0; x<ViewSize.x; ++x) {
// reading the state of another particle
vec4 data1 = Src(ivec2(x,y));
vec3 dpos = wrap(data1.xyz-FOut.xyz);
// calculate distance
float r = length(dpos);
if (r>3.0) continue;
dpos /= r+1e-8;
// calculate repulsion and interaction forces
float rep = max(1.0-r, 0.0)*repulsion;
float f = F(ivec2(FOut.w, data1.w)).x;
float inter = f*max(1.0-abs(r-2.0), 0.0);
force += dpos*(inter-rep);
}
// fetch the past state to compute velocity
vec3 vel = wrap(FOut.xyz-past(I).xyz)*pow(inertia, dt);
// update particle position
FOut.xyz = wrap(FOut.xyz+vel+0.5*force*(dt*dt));
}
`}, points); // using 'points' as the targetSoon randomly scattered particles self-assemble into a nice colorful snake! The simulation is happening on the GPU and is quite fast for the quadratic complexity algorithm (that iterates all particle pairs). Even mobile phones can run hundreds of steps per second. Thanks to SwissGL, orchestrating this computation, managing shaders and framebuffers takes minimal amount of boilerplate code.
Sources of wisdom:
- Inigo Quilez
- Steven Wittens
- WebGL / WebGL2 fundamentals
Playgrounds:
Libraries