Subtractive spaces of semirings

Abstract

Using the closure operator that defines a subtractive ideal of a semiring S, in this note we introduce a topology on the set of all ideals of S induced by that operator. We show that the corresponding subtractive space is T0 and every nonempty irreducible closed set has a unique generic point, whereas the restricted subspace of subtractive ideals is T1. Using a semiring homomorphism, we obtain a continuous map between the corresponding subtractive spaces.