A generalization of Strassen’s Positivstellensatz
Tobias Fritz
Abstract
Strassen’s Positivstellensatz is a powerful but little known theorem on preordered commutative semirings satisfying a boundedness condition similar to Archimedeanicity. It characterizes the relaxed preorder induced by all monotone homomorphisms to R+ in terms of a condition involving large powers. Here, we generalize and strengthen Strassen’s result. As a generalization, we replace the boundedness condition by a polynomial growth condition; as a strengthening, we prove two further equivalent characterizations of the homomorphism-induced preorder in our generalized setting.
Topics & Concepts
PreorderMathematicsHomomorphismGeneralizationMonotone polygonCommutative propertyPolynomialPure mathematicsAlgebra over a fieldDiscrete mathematicsBoolean algebraAlgebra homomorphismCoalgebraAlgebraic geometryAdvanced Banach Space TheoryOptimization and Variational AnalysisFunctional Equations Stability Results