Motivated by phylogenetics, our aim is to obtain a system of equations that
define a phylogenetic variety on an open set containing the biologically
meaningful points. In this paper we consider phylogenetic varieties defined via
group-based models. For any finite abelian group G, we provide an explicit
construction of codimX phylogenetic invariants (polynomial equations) of
degree at most ∣G∣ that define the variety X on a Zariski open set U. The
set U contains all biologically meaningful points when G is the group of
the Kimura 3-parameter model. In particular, our main result confirms a
conjecture by the third author and, on the set U, a couple of conjectures by
Bernd Sturmfels and Seth Sullivant.Comment: 22 pages, 7 figure
