Generic root counts and flatness in tropical geometry

Abstract

We use tropical and non-archimedean geometry to study the generic number of solutions of families of polynomial equations over a parameter space Y. In particular, we are interested in the choices of parameters for which the generic root count is attained. Our families are given as subschemes X⊂eq T where T is a relative torus over Y. We generalize Bernstein's theorem from an intersecting family of hypersurfaces X=V(f1)… V(fn) to an intersecting family of higher-codimensional schemes X=X1… Xk, replacing the mixed volume by a tropical intersection product. Central to our work is the notion of tropical flatness of X around a point P∈ Y, which allows us to transfer tropical properties of the fiber over P to generic properties. We show that tropical flatness holds over a dense open subset of the Berkovich analytification Yan, and that the tropical intersection number is attained as a root count at all P∈ Yan around which the Xi's are tropically flat and the tropical prevariety of the fibers i=1kTrop(Xi,P) is bounded. We then study the generic root count of a wide class of parametrized square polynomial systems. This in particular gives tropical formulas for the volumes of Newton-Okounkov bodies, and the number of complex steady states of chemical reaction networks.