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Given $m=385$, I have a linear equation system over a field $\mathbb{F}_p$ with $p$ a small prime (could be 5,7,11, something like this) with the following properties:

  1. There are $m^2$ variables.
  2. Every variable appears in exactly 7 equation.
  3. Every equation contains at most 3 variables.
  4. The coefficient of the variables is always 1.
  5. The free term in the equations are always 0, with one specific equation (an equation of the form $3x=1$ for a specific variable $x$).

I am currently using SAGE. It solved nicely smaller equation systems, but this one killed it, even when constructing the matrix as sparse ("Error allocating matrix"). The question is - should I simply try a better (and less convenient) sparse matrix handling package, or is there a better way to deal with such sparse systems of equations? (I can do a little programming myself if needed).

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    You will get more comprehensive replies for such questions @ scicomp.stackexchange.com.2012-02-08

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