The j-invariant of a plane tropical cubic
arXiv:0709.3785
Abstract
Several results in tropical geometry have related the j-invariant of an algebraic plane curve of genus one to the cycle length of a tropical curve of genus one. In this paper, we prove that for a plane cubic over the field of Puiseux series the negative of the generic valuation of the $j$-invariant is equal to the cycle length of the tropicalization of the curve, if there is a cycle at all.
The proofs rely partly on computations done with polymake, topcom and Singular