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Do you know of any, actively developed, C/C++ library that can take a bunch (preferably a large amount) of 4D vertices, project them back into 3D space with respect to some arbitrary "4D camera" projection matrix and output regular 3D vertices that I could feed into OpenGL for hardware accelerated visualisation? I'd also need the ability to perform standard transformations in 4D space (translation, rotation along all 4 axes and uniform scaling).

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closed as off-topic by Rad Lexus, genpfault, Magisch, Vin, EdChum Mar 29 at 8:33

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Sounds like you would need quintonions to implement rotations ;-) (Nice question!) – Kerrek SB Aug 8 '11 at 21:18
I just have to ask: what are you using this for? – Beta Aug 8 '11 at 22:02
Isn't the basic problem here, that they way you project 4D shapes into 3D space rather arbitrary? Like, there is no standard way of doing so, ergo there is no standard library implementation to do so? – J T Aug 8 '11 at 22:06
@JT: What do you mean? 3D perspective projection onto a 2D plane is well established, isn't projecting from 4D into a 3D space just an extension to that? Please forgive my ignorance if I'm wrong. :) – MasterM Aug 8 '11 at 22:11
The idea is definitely cool, and I hope you succeed! Please note that the "quintonions" were a joke, there's no such thing. It's a happy accident that the Euclidean group of R^3 (which can be realized as the the group of rotations in R^4) is equivalent to the multiplicative group of unit quaternions. This doesn't happen in most other dimensions, and you just have to use standard linear algebra. – Kerrek SB Aug 8 '11 at 22:23

The following is a poor answer (since I am by no means an expert on the topic), but I decided to take a quick peek around and came up with this thesis:

Projection of a 4D object into 3-space is, as you would expect, a simple extension on the projection of 3D into 2-space, and the above thesis demonstrates different kinds of projection from 4D to 2-space. The code samples are in C, so it should be easy to follow.

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Thank you. I stumbled upon one or two similar papers and one very outdated library for projecting 4D vertices into 3D space but I was hoping for an actively developed project. So for now I'm going to leave this question opened. If I don't find one I'll roll my own. – MasterM Aug 8 '11 at 22:40
@MasterM: If you do come up with something, please do post what you learn (or perhaps what you do!) as an answer. I'd love to see what you come up with. – greyfade Aug 8 '11 at 22:42
@MasterM, enthusiastic second to greyfade's request. This question is definitely a new favorite. Consider stereograms as a way of enhancing the 3d sense. – luser droog Aug 10 '11 at 3:56
The link in this answer is dead, but the chapter can still be accessed via this link: – user234461 Mar 28 at 9:14
Thanks. I've fixed the link. – greyfade Mar 28 at 17:56

Professor Andrew Hanson (Indiana University) developed a graphics library for visualizing 4D geometry. It's called GL4D. It's designed to mimic the feel of OpenGL (though I'm not sure whether it is actually built on top of OpenGL). It is GPU-accelerated. It supports projection, slicing, hidden-surface removal, per-voxel lighting, and semi-transparent shading.

Here's the publication which explains GL4D: GL4D paper

Here's a link to the source code: GL4D Source Code

And here's a video demonstration of GL4D: GL4D Video Demonstration

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