Using a Viewport as a texture


This tutorial will introduce you to using the Viewport as a texture that can be applied to 3D objects. In order to do so it will walk you through the process of making a procedural planet like the one below:



This tutorial does not cover how to code a dynamic atmosphere like the one this planet has.

This tutorial assumes you are familiar with how to set up a basic scene including: a Camera, a light source, a Mesh Instance with a Primitive Mesh, and applying a Spatial Material to the mesh. The focus will be on using the Viewport to dynamically create textures that can be applied to the mesh.

During the course of this tutorial will cover the following topics:

  • How to use a Viewport as a render texture
  • Mapping a texture to a sphere with equirectangular mapping
  • Fragment shader techniques for procedural planets
  • Setting a Roughness map from a Viewport Texture

Setting up the Viewport

First, add a Viewport to the scene.

Next, set the size of the Viewport to (1024, 512). The Viewport can actually be any size so long as the width is double the height. The width needs to be double the height so that the image will accurately map onto the sphere as we will be using equirectangular projection, but more on that later.


Next, disable HDR and disable 3D. We don’t need HDR because our planets surface will not be especially bright so values between 0 and 1 will be fine. And we will be using a ColorRect to render the surface, so we don’t need 3D either.

Select the Viewport and add a ColorRect as a child.

Set the anchors “Right” and “Bottom” to 1, then make sure all the margins are set to 0. This will ensure that the ColorRect takes up the entire Viewport.


Next, we add a Shader Material to the ColorRect.


Basic familiarity with shading is recommended for this tutorial. However, even if you are new to shaders, all the code will be provided so you should have no problem following along.

shader_type canvas_item

void fragment() {
    COLOR = vec4(UV.x, UV.y, 0.5, 1.0);

The above code renders a gradient like the one below.


Now we have the basics of a Viewport that we render to and we have a unique image that we can apply to the sphere.

Applying the texture

Now we go into the Mesh Instance and add a Spatial Material to it. No need for a special Shader Material (although that would be a good idea for more advanced effects, like the atmosphere in the example above).

Open the newly created Spatial Material and scroll down to the “Albedo” section and click beside the “Texture” property to add an Albedo Texture. Here we will apply the texture we made. Choose “New ViewportTexture”


Then from the menu that pops up select the Viewport that we rendered to earlier.


Your sphere should now be colored in with the colors we rendered to the Viewport


Notice the ugly seam that forms where the texture wraps around? This is because we are picking a color based on UV coordinates and UV coordinates do not wrap around the texture. This is a classic problem in 2D map projection. Game developers often have a 2-dimensional map they want to project onto a sphere but when it wraps around it has large seams. There is an elegant work around for this problem that we will illustrate in the next section.

Making the planet texture

So now when we render to our Viewport it appears magically on the sphere. But there is an ugly seam created by our texture coordinates. So how do we get a range of coordinates that wrap around the sphere in a nice way? One solution is to use a function that repeats on the domain of our texture. sin and cos are two such functions. Lets apply them to the texture and see what happens = vec3(sin(UV.x * 3.14159 * 4.0) * cos(UV.y * 3.14159 * 4.0) * 0.5 + 0.5);

Not too bad. If you look around you can see that the seam has now disappeared, but in its place we have pinching at the poles. This pinching is due to the way Godot maps textures to spheres in its Spatial Material. It uses a projection technique called equirectangular projection. Which translates a spherical map onto a 2D plane.


If you are interested in a little extra information on the technique, we will be converting from spherical coordinates into Cartesian coordinates. Spherical coordinates map the longitude and latitude of the sphere, while Cartesian coordinates are for all intents and purposes a vector from the center of the sphere to the point.

For each pixel we will calculate its 3D position on the sphere. From that we will use 3D noise to determine a color value. By calculating the noise in 3D we solve the problem of the pinching at the poles. To understand why, picture the noise being calculated across the surface of the sphere instead of across the 2D plane. When you calculate across the surface of the sphere you never hit an edge, and hence you never create a seam or a pinch point on the pole. The following code converts the UVs into Cartesion coordinates.

float theta = UV.y * 3.14159;
float phi = UV.x * 3.14159 * 2.0;
vec3 unit = vec3(0.0, 0.0, 0.0);

unit.x = sin(phi) * sin(theta);
unit.y = cos(theta) * -1.0;
unit.z = cos(phi) * sin(theta);
unit = normalize(unit);

And if we use unit as an output COLOR value we get.


Now that we can calculate the 3D position of the surface of the sphere we can use 3D noise to make the planet. We will be using this noise function directly from a Shadertoy:

vec3 hash(vec3 p) {
    p = vec3(dot(p, vec3(127.1, 311.7, 74.7)),
             dot(p, vec3(269.5, 183.3, 246.1)),
             dot(p, vec3(113.5, 271.9, 124.6)));

    return -1.0 + 2.0 * fract(sin(p) * 43758.5453123);

float noise(vec3 p) {
  vec3 i = floor(p);
  vec3 f = fract(p);
  vec3 u = f * f * (3.0 - 2.0 * f);

  return mix(mix(mix(dot(hash(i + vec3(0.0, 0.0, 0.0)), f - vec3(0.0, 0.0, 0.0)),
                     dot(hash(i + vec3(1.0, 0.0, 0.0)), f - vec3(1.0, 0.0, 0.0)), u.x),
                 mix(dot(hash(i + vec3(0.0, 1.0, 0.0)), f - vec3(0.0, 1.0, 0.0)),
                     dot(hash(i + vec3(1.0, 1.0, 0.0)), f - vec3(1.0, 1.0, 0.0)), u.x), u.y),
             mix(mix(dot(hash(i + vec3(0.0, 0.0, 1.0)), f - vec3(0.0, 0.0, 1.0)),
                     dot(hash(i + vec3(1.0, 0.0, 1.0)), f - vec3(1.0, 0.0, 1.0)), u.x),
                 mix(dot(hash(i + vec3(0.0, 1.0, 1.0)), f - vec3(0.0, 1.0, 1.0)),
                     dot(hash(i + vec3(1.0, 1.0, 1.0)), f - vec3(1.0, 1.0, 1.0)), u.x), u.y), u.z );


All credit goes to the author, Inigo Quilez. It is published with the MIT licence.

Now to use noise, add the following to the fragment function:

float n = noise(unit * 5.0); = vec3(n * 0.5 + 0.5);


In order to highlight the texture, we set the material to unshaded.

You can see now that the noise indeed wraps seamlessly around the sphere. Although this looks nothing like the planet you were promised. So lets move onto something more colorful.

Coloring the planet

Now to make the planet colors. While, there are many ways to do this, for now we will stick with a gradient between water and land.

To make a gradient in GLSL we use the mix function. mix takes two values to interpolate between and a third parameter to choose how much to interpolate between them, in essence it mixes the two values together. In other APIs this function is often called lerp. Although, lerp is typically reserved for mixing two floats together, mix can take any values whether it be floats or vector types. = mix(vec3(0.05, 0.3, 0.5), vec3(0.9, 0.4, 0.1), n.x * 0.5 + 0.5);

The first color is blue for the ocean. The second color is a kind of reddish color (because all alien planets need red terrain). And finally they are mixed together by n.x * 0.5 + 0.5. n.x smoothly varies between -1 and 1. So we map it into the 0-1 range that mix expects. Now you can see that the colors change between blue and red.


That is a little more blurry than we want. Planets typically have a relatively clear separation between land and sea. In order to do that we will change the last term to smoothstep(-0.1, 0.0, n.x). And thus the whole line becomes: = mix(vec3(0.05, 0.3, 0.5), vec3(0.9, 0.4, 0.1), smoothstep(-0.1, 0.0, n.x));

What smoothstep does is return 0 if the third parameter is below the first and return 1 if the third parameter is larger than the second and smoothly blends between 0 and 1 if the third number is between the first and the second. So in this line smoothstep returns 0 whenever n.x is less than -0.1 and it returns 1 whenever n.x is above 0.


One more thing to make this a little more planet-y. The land shouldn’t be so blobby lets make the edges a little rougher. A trick that is often used in shaders to make rough looking terrain with noise is to layer levels of noise over one another at various frequencies. We use one layer to make the overall blobby structure of the continents. Then another layer breaks up the edges a bit, and then another, and so on. What we will do is calculate n with four lines of shader code instead of just one. n becomes:

float n = noise(unit * 5.0) * 0.5;
n += noise(unit * 10.0) * 0.25;
n += noise(unit * 20.0) * 0.125;
n += noise(unit * 40.0) * 0.0625;

And now the planet looks like:


And with shading turned back on it looks like:


Making an ocean

One final thing to make this look more like a planet. The ocean and the land reflect light differently. So we want the ocean to shine a little more than the land. We can do this by passing a fourth value into the alpha channel of our output COLOR and using it as a Roughness map.

COLOR.a = 0.3 + 0.7 * smoothstep(-0.1, 0.0, n);

This line returns 0.3 for water and 1.0 for land. This means that the land is going to be quite rough while the water will be quite smooth.

And then in the material under the “Metallic” section make sure Metallic is set to 0 and Specular is set to 1. The reason for this is the water reflects light really well, but isn’t metallic. These values are not physically accurate, but they are good enough for this demo.

Next under the “Roughness” section set Roughness to 1 and set the roughness texture to a Viewport Texture pointing to our planet texture Viewport. Finally set the Texture Channel to Alpha. This instructs the renderer to use the alpha channel of our output COLOR as the Roughness value.


You’ll notice that very little changes except that the planet is no longer reflecting the sky. This is happening because by default when something is rendered with an alpha value it gets drawn as a transparent object over the background. And since the default background of the Viewport is opaque, the alpha channel of the Viewport Texture is 1 resulting in the planet texture being drawn with slightly fainter colors and a Roughness value of 1 everywhere. To correct this we go into the Viewport and set “Transparent Bg” to on. Since we are now rendering one transparent object on top of another we want to enable blend_premul_alpha:

render_mode blend_premul_alpha;

This pre-multiplies the colors by the alpha value and then blends them correctly together. Typically when blending one transparent color on top of another, even if the background has an alpha of 0 (as it does in this case), you end up with weird color bleed issues. Setting blend_premul_alpha fixes that.

Now the planet should look like it is reflecting light on the ocean but not the land. If you haven’t done so already, add an OmniLight to the scene so you can move it around and see the effect of the reflections on the ocean.


And there you have it. A procedural planet generated using a Viewport.