Fibonacci Number matrix is closely related to Fibonacci numbers (no wonder)! They have a curious power to create curves on a torus. Welcome to the adventure!
The vector which keeps itself constant is (1,-(√5+1)/2) and also (1,(√5-1)/2). I suppose it all comes as phi has a continued fraction which repeats. As all the lattice create a subgroup of R^2 which is normally called z^2 by considering a quotient group R^2/z^2.
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The vector which keeps itself constant is (1,-(√5+1)/2) and also (1,(√5-1)/2). I suppose it all comes as phi has a continued fraction which repeats. As all the lattice create a subgroup of R^2 which is normally called z^2 by considering a quotient group R^2/z^2.
Want to see the next part ?....make it quick....