The Fundamental Theorem of Tropical Differential Algebraic Geometry

Abstract

Let I be an ideal of the ring of Laurent polynomials K[x11,…,xn1] with coefficients in a real-valued field (K,v). The fundamental theorem of tropical algebraic geometry states the equality trop(V(I))=V(trop(I)) between the tropicalization trop(V(I)) of the closed subscheme V(I)⊂ (K*)n and the tropical variety V(trop(I)) associated to the tropicalization of the ideal trop(I). In this work we prove an analogous result for a differential ideal G of the ring of differential polynomials K[[t]]\x1,…,xn\, where K is an uncountable algebraically closed field of characteristic zero. We define the tropicalization trop(Sol(G)) of the set of solutions Sol(G)⊂ K[[t]]n of G, and the set of solutions associated to the tropicalization of the ideal trop(G). These two sets are linked by a tropicalization morphism trop:Sol(G) Sol(trop(G)). We show the equality trop(Sol(G))=Sol(trop(G)), answering a question raised by D. Grigoriev earlier this year.