ST and TS as Product and Sum

Abstract

The set of ST-valid inferences is neither the intersection, nor the union of the sets of K3- and LP-valid inferences, but despite the proximity to both systems, an extensional characterization of ST in terms of a natural set-theoretic operation on the sets of K3- and LP-valid inferences is still wanting. In this paper, we show that it is their relational product. Similarly, we prove that the set of TS-valid inferences can be identified using a dual notion, namely as the relational sum of the sets of LP- and K3-valid inferences. We discuss links between these results and the interpolation property of classical logic. We also use those results to revisit the duality between ST and TS. We present a combined notion of duality on which ST and TS are dual in exactly the same sense in which LP and K3 are dual to each other.