Given a Newton polygon it generates dimer models whose Jacobi algebra

is a noncommutative crepant resolution of the corresponding gorenstein singularity.

E.g. The unit square gives rise to the conifold dimer.

Each dimer is drawn as a quiver and a fish tiling on a torus.

If you enter a stability condition as a square bracketed list of numbers, one for each vertex and summing to 0.

Then program will calculate the moduli space of stable representations with dimension vector [1,..,1]

[[0,0,1],[1,0,1],[1,1,1],[0,1,1]]

There is 1 dimer:

Points: [ [ 0, 0 ], [ 1/2, 1/2 ] ] Arrows: [ [ 1, 2, [ -1/2, 1/2 ] ], [ 1, 2, [ 1/2, -1/2 ] ], [ 2, 1, [ -1/2, -1/2 ] ], [ 2, 1, [ 1/2, 1/2 ] ] ] | ||

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