1. The Nullstellensatz and Positivstellensatz for Sparse Tropical Polynomial Systems
- Author
-
Akian, Marianne, Béreau, Antoine, and Gaubert, Stéphane
- Subjects
Mathematics - Combinatorics ,Mathematics - Algebraic Geometry ,14T15 (Primary) 05E14, 14N10, 52B20 (Secondary) - Abstract
Grigoriev and Podolskii (2018) have established a tropical analogue of the effective Nullstellensatz, showing that a system of tropical polynomial equations is solvable if and only if a linearized system obtained from a truncated Macaulay matrix is solvable. They provided an upper bound of the minimal admissible truncation degree, as a function of the degrees of the tropical polynomials. We establish a tropical Nullstellensatz adapted to {\em sparse} tropical polynomial systems. Our approach is inspired by a construction of Canny-Emiris (1993), refined by Sturmfels (1994). This leads to an improved bound of the truncation degree, which coincides with the classical Macaulay degree in the case of $n+1$ equations in $n$ unknowns. We also establish a tropical Positivstellensatz, allowing one to decide the inclusion of tropical basic semialgebraic sets. This allows one to reduce decision problems for tropical semi-algebraic sets to the solution of systems of tropical linear equalities and inequalities., Comment: 32 pages + 3 pages of references, 11 figures, uses frenchineq.sty
- Published
- 2023