This was my first ever foray into quaternions! And I must admit, learning about quaternions suuuuuuucks. Surprisingly, this is one area where I would actually recommend developers keep quaternions as a mysterious black box, though an essential part of their repertoire. Every academic writing you will find about quaternions is deep in imaginary number territory (which we all know is impossible to represent on a computer). The important point is that the imaginary numbers can be optimized out, so having them in the first place is completely stupid, but I digress. Ok, ok, imaginary numbers help make sense of the derivatives... So what? It still sucks. And it's still pointless in the context of 3D graphics.
Sunday, September 24, 2017
Tiny MCU 3D Renderer Part 6: Camera animation and display scaling
Yesterday I finally got around to adding some simple animations. The app was always rendering at 60 fps, but the image was static because there was no animation. That's why I've only been posting PNG images of progress so far. But now I can do this:
This was my first ever foray into quaternions! And I must admit, learning about quaternions suuuuuuucks. Surprisingly, this is one area where I would actually recommend developers keep quaternions as a mysterious black box, though an essential part of their repertoire. Every academic writing you will find about quaternions is deep in imaginary number territory (which we all know is impossible to represent on a computer). The important point is that the imaginary numbers can be optimized out, so having them in the first place is completely stupid, but I digress. Ok, ok, imaginary numbers help make sense of the derivatives... So what? It still sucks. And it's still pointless in the context of 3D graphics.
This was my first ever foray into quaternions! And I must admit, learning about quaternions suuuuuuucks. Surprisingly, this is one area where I would actually recommend developers keep quaternions as a mysterious black box, though an essential part of their repertoire. Every academic writing you will find about quaternions is deep in imaginary number territory (which we all know is impossible to represent on a computer). The important point is that the imaginary numbers can be optimized out, so having them in the first place is completely stupid, but I digress. Ok, ok, imaginary numbers help make sense of the derivatives... So what? It still sucks. And it's still pointless in the context of 3D graphics.
Sunday, September 17, 2017
Tiny MCU 3D Renderer Part 5: Aspect Ratio and Field of View
I had a long week on vacation, and was able to do a little bit of coding almost every night. There was a lot of time spent doing touristy things, so my coding opportunities were limited. I had a good solid 4 hours of nothing but coding time on the plane, though! Both ways.
On my departure flight, I managed to finally fix the aspect ratio (as far as I can tell). This was just a matter of adjusting the projection matrix to use the correct aspect ratio for non-square pixels. On my return flight, I finished almost all of the refactoring for the new Shader API, and finally completed it from the comfort of my own couch.
It shouldn't look too much different from the previous screenshot. There are a few obvious differences if you look closer, though.
On my departure flight, I managed to finally fix the aspect ratio (as far as I can tell). This was just a matter of adjusting the projection matrix to use the correct aspect ratio for non-square pixels. On my return flight, I finished almost all of the refactoring for the new Shader API, and finally completed it from the comfort of my own couch.
Monday, September 4, 2017
Quick update, progress report, current plans
This weekend I was distracted by a well-intentioned good friend of mine who suggested solving a chess puzzle described as "deceptively simple". Unfortunately, the article is criminally misleading. Therein it is claimed that computers cannot "solve the conundrum quickly and efficiently". The article is misleading because it is in fact trivial to solve the puzzle in linear time with constant space complexity.
Solving the puzzle is not the challenge alluded to. The challenge is that given any starting position with queens already placed, find a valid solution by adding more queens. A notable related problem is enumerating and counting all valid solutions. To date, it has been shown by brute force that a 27x27 chessboard has over 243 quadrillion solutions; removing all symmetrical solutions results in about 29 quadrillion. The brute force work took about 7 years with a massively parallel array of custom hardware (written to FPGAs).
To provide some context to the size of the numbers involved, it would take a modern CPU (single-core at 4.5 GHz) about 4 years just to increment a counter as fast as possible from 0 to 29 quadrillion. That is the time estimate just for the work involving the counter; nothing more. It's also hopelessly optimistic, since that assumes you already have a list of all 29 quadrillion solutions, or that there are zero false positives or any instances of wasted effort.
Solving the puzzle is not the challenge alluded to. The challenge is that given any starting position with queens already placed, find a valid solution by adding more queens. A notable related problem is enumerating and counting all valid solutions. To date, it has been shown by brute force that a 27x27 chessboard has over 243 quadrillion solutions; removing all symmetrical solutions results in about 29 quadrillion. The brute force work took about 7 years with a massively parallel array of custom hardware (written to FPGAs).
To provide some context to the size of the numbers involved, it would take a modern CPU (single-core at 4.5 GHz) about 4 years just to increment a counter as fast as possible from 0 to 29 quadrillion. That is the time estimate just for the work involving the counter; nothing more. It's also hopelessly optimistic, since that assumes you already have a list of all 29 quadrillion solutions, or that there are zero false positives or any instances of wasted effort.