RAM requirements for matrix processing

So I'm designing a matrix for a computer vision project and believe I have one of my calculations wrong. Unfortunately, I'm not sure where it's wrong.

I was considering creating a matrix that was 100,000,000 x 100,000,000 with each 'cell' containing a single integer (1 or 0). If my calculations are correct, it would take 9.53674316 × 10^9 MB. Is that correct?!?

My next question is, if it IS correct, are there ways to reduce memory requirements to a more realistic level while still keeping the matrix the same size? Of course, there is a real possibility I won't actually need a matrix that size but this is absolute worse case scenario (as put forth by a friend). The size seems ridiculous to me since we'd be covering such a small distance at a time.

Thanks1 Anthony

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It's impossible to answer without knowing more about your goals. Is the matrix sparse? Can it be generated programmatically? What processing do you intend to do on this matrix? – Oliver Charlesworth Feb 26 '12 at 18:08
Your calculations seem correct, but beware that they assume you actually use a single bit per cell, have no alignment, no padding, no metadata, no per-row/-colum data. – delnan Feb 26 '12 at 18:10
'single integer (1 or 0)."? Do you mean a single "bit"? A single integer is 32 bits (on many computers). When you entered 100000000* 100000000 at the >>> prompt, what did you get? – S.Lott Feb 26 '12 at 18:11
Thanks, Oli. Yes, the matrix is sparse. I'm trying to place the immediate environment of a small robot into a grid and try to determine (using other sensors) if the robot is near the edge of the sidewalk or not. Does that help? – CajunTechie Feb 26 '12 at 18:12
S. Lot: Yes, I'm sorry, I do mean a single bit not integer. When I entered 100000000*100000000 into the interpreter, I got 10000000000000000L. – CajunTechie Feb 26 '12 at 18:15

In theory, an element of {0, 1} should consume at most 1 bit per cell. That means 8 cells per byte or 1192092895 megabytes or about one petabyte, which is too much, unless you are google :) Not to mention, even processing (or saving) such matrix would take too much time (about a year I'd say).

You said that in many cases you won't even need matrix so large. So, you can create smaller matrix at start (10,000 x 10,000) and then double the size every time enlargment is needed, copying old contents.

If your matrix is sparse (has much much more 1's than 0's or vice-versa), then it is much more efficient to store just coordinates where ones are in some efficient data structure, depending what operations (search, data access) you need.

Side note: In many languages, you have to take proper care for that to be true, for example in C, even if you specify variable as boolean, it still takes one byte, 8 times as much as needed.

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Yeah, I don't have an exabyte of memory laying around. Wow. I definitely shouldn't need that and I doubt the projects eventual goals would need a matrix that large just based on memory requirements and projects I know that do a lot more. Thank you for the tips. Rethinking our approach now! – CajunTechie Feb 26 '12 at 18:20
I think you should. As I said, If your matrix is really sparse (has much much more 1's than 0's or vice-versa), then store just the "coordinates" of those elements. Of course, then the access complicates a little, probably yielding something worse than O(1). – Rok Kralj Feb 26 '12 at 18:22
That's a Petabyte, not an exabyte (which would be 3 orders of magnitude more) – orokusaki Feb 26 '12 at 18:28
Thanks, @orokusaki. – Rok Kralj Feb 26 '12 at 19:06

Your calculation is correct, assuming a single byte is used to store each boolean, which is what a Numpy array with dtype=bool will do.

If you expect that relatively few of the matrix's entries will be one, then consider using a scipy.sparse matrix instead; that will only store the ones.

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Thank you! I've had very little experience with scipy so I'll check it out. – CajunTechie Feb 26 '12 at 18:19