I want to convert from cube map [figure1] into an equirectangular panorama [figure2].
Figure1
Figure2
It is possible to go from Spherical to Cubic (by following: Convert 2:1 equirectangular panorama to cube map ), but lost on how to reverse it.
Figure2 is to be rendered into a sphere using Unity.
Assuming the input image is in the following cubemap format:
The goal is to project the image to the equirectangular format like so:
The conversion algorithm is rather straightforward. In order to calculate the best estimate of the color at each pixel in the equirectangular image given a cubemap with 6 faces:
Keep in mind that there are multiple methods to estimate the color of a pixel in the equirectangular image given a normalized coordinate (u,v) on a specific face of a cubemap. The most basic method, which is a very raw approximation and will be used in this answer for simplicity's sake, is to round the coordinates to a specific pixel and use that pixel. Other more advanced methods could calculate an average of a few neighbouring pixels.
The implementation of the algorithm will vary depending on the context. I did a quick implementation in Unity3D C# that shows how to implement the algorithm in a real world scenario. It runs on the CPU, there is a lot room for improvement but it is easy to understand.
using UnityEngine;
public static class CubemapConverter
{
public static byte[] ConvertToEquirectangular(Texture2D sourceTexture, int outputWidth, int outputHeight)
{
Texture2D equiTexture = new Texture2D(outputWidth, outputHeight, TextureFormat.ARGB32, false);
float u, v; //Normalised texture coordinates, from 0 to 1, starting at lower left corner
float phi, theta; //Polar coordinates
int cubeFaceWidth, cubeFaceHeight;
cubeFaceWidth = sourceTexture.width / 4; //4 horizontal faces
cubeFaceHeight = sourceTexture.height / 3; //3 vertical faces
for (int j = 0; j < equiTexture.height; j++)
{
//Rows start from the bottom
v = 1 - ((float)j / equiTexture.height);
theta = v * Mathf.PI;
for (int i = 0; i < equiTexture.width; i++)
{
//Columns start from the left
u = ((float)i / equiTexture.width);
phi = u * 2 * Mathf.PI;
float x, y, z; //Unit vector
x = Mathf.Sin(phi) * Mathf.Sin(theta) * -1;
y = Mathf.Cos(theta);
z = Mathf.Cos(phi) * Mathf.Sin(theta) * -1;
float xa, ya, za;
float a;
a = Mathf.Max(new float[3] { Mathf.Abs(x), Mathf.Abs(y), Mathf.Abs(z) });
//Vector Parallel to the unit vector that lies on one of the cube faces
xa = x / a;
ya = y / a;
za = z / a;
Color color;
int xPixel, yPixel;
int xOffset, yOffset;
if (xa == 1)
{
//Right
xPixel = (int)((((za + 1f) / 2f) - 1f) * cubeFaceWidth);
xOffset = 2 * cubeFaceWidth; //Offset
yPixel = (int)((((ya + 1f) / 2f)) * cubeFaceHeight);
yOffset = cubeFaceHeight; //Offset
}
else if (xa == -1)
{
//Left
xPixel = (int)((((za + 1f) / 2f)) * cubeFaceWidth);
xOffset = 0;
yPixel = (int)((((ya + 1f) / 2f)) * cubeFaceHeight);
yOffset = cubeFaceHeight;
}
else if (ya == 1)
{
//Up
xPixel = (int)((((xa + 1f) / 2f)) * cubeFaceWidth);
xOffset = cubeFaceWidth;
yPixel = (int)((((za + 1f) / 2f) - 1f) * cubeFaceHeight);
yOffset = 2 * cubeFaceHeight;
}
else if (ya == -1)
{
//Down
xPixel = (int)((((xa + 1f) / 2f)) * cubeFaceWidth);
xOffset = cubeFaceWidth;
yPixel = (int)((((za + 1f) / 2f)) * cubeFaceHeight);
yOffset = 0;
}
else if (za == 1)
{
//Front
xPixel = (int)((((xa + 1f) / 2f)) * cubeFaceWidth);
xOffset = cubeFaceWidth;
yPixel = (int)((((ya + 1f) / 2f)) * cubeFaceHeight);
yOffset = cubeFaceHeight;
}
else if (za == -1)
{
//Back
xPixel = (int)((((xa + 1f) / 2f) - 1f) * cubeFaceWidth);
xOffset = 3 * cubeFaceWidth;
yPixel = (int)((((ya + 1f) / 2f)) * cubeFaceHeight);
yOffset = cubeFaceHeight;
}
else
{
Debug.LogWarning("Unknown face, something went wrong");
xPixel = 0;
yPixel = 0;
xOffset = 0;
yOffset = 0;
}
xPixel = Mathf.Abs(xPixel);
yPixel = Mathf.Abs(yPixel);
xPixel += xOffset;
yPixel += yOffset;
color = sourceTexture.GetPixel(xPixel, yPixel);
equiTexture.SetPixel(i, j, color);
}
}
equiTexture.Apply();
var bytes = equiTexture.EncodeToPNG();
Object.DestroyImmediate(equiTexture);
return bytes;
}
}
In order to utilize the GPU I created a shader that does the same conversion. It is much faster than running the conversion pixel by pixel on the CPU but unfortunately Unity imposes resolution limitations on cubemaps so it's usefulness is limited in scenarios when high resolution input image is to be used.
Shader "Conversion/CubemapToEquirectangular" {
Properties {
_MainTex ("Cubemap (RGB)", CUBE) = "" {}
}
Subshader {
Pass {
ZTest Always Cull Off ZWrite Off
Fog { Mode off }
CGPROGRAM
#pragma vertex vert
#pragma fragment frag
#pragma fragmentoption ARB_precision_hint_fastest
//#pragma fragmentoption ARB_precision_hint_nicest
#include "UnityCG.cginc"
#define PI 3.141592653589793
#define TWOPI 6.283185307179587
struct v2f {
float4 pos : POSITION;
float2 uv : TEXCOORD0;
};
samplerCUBE _MainTex;
v2f vert( appdata_img v )
{
v2f o;
o.pos = mul(UNITY_MATRIX_MVP, v.vertex);
o.uv = v.texcoord.xy * float2(TWOPI, PI);
return o;
}
fixed4 frag(v2f i) : COLOR
{
float theta = i.uv.y;
float phi = i.uv.x;
float3 unit = float3(0,0,0);
unit.x = sin(phi) * sin(theta) * -1;
unit.y = cos(theta) * -1;
unit.z = cos(phi) * sin(theta) * -1;
return texCUBE(_MainTex, unit);
}
ENDCG
}
}
Fallback Off
}
The quality of the resulting images can be greatly improved by either employing a more sophisticated method to estimate the color of a pixel during the conversion or by post processing the resulting image (or both, actually). For example an image of bigger size could be generated to apply a blur filter and then downsample it to the desired size.
I created a simple Unity project with two editor wizards that show how to properly utilize either the C# code or the shader shown above. Get it here: https://github.com/Mapiarz/CubemapToEquirectangular
Remember to set proper import settings in Unity for your input images:
a = Mathf.Max(new float[3] { Mathf.Abs(x), Mathf.Abs(y), Mathf.Abs(z) }); - because a is returned as 0 when x,y,z values are below 1, which makes xa, xy and xz as undefined, due to divided by zero problem, am I missing something ? my c++ line looks like this: a = maximum(abs(x), abs(y), abs(z)); (I've added a maximum function of my own).
Sep 27, 2016 at 13:39
cube2sphere automates the entire process. Example:
$ cube2sphere front.jpg back.jpg right.jpg left.jpg top.jpg bottom.jpg -r 2048 1024 -fTGA -ostitched
Bartosz's answer works, but there is numerical instability in his code that is trigged when compiler optimization converts the unit vector division into multiplication by the inverse. The result of this operation may not be exactly 1.0, causing the IFs fail (it well known that floats don't like == after a math operation).
The fix for this issue is to change the IFs to compare with +/- a, instead.
else if (xa == -1) // don't do this
else if (vx == -a) // do this
Also, as for optimization, sin(theta) and cos(theta) can be pre-calculated outside the inner loop.
Another issue is that this code does not do interpolation. I'd recommend to implement it in order to have better image quality. I used bicubic interpolation, except for the edges of the tiles. Worked well.
