Lucy Carr

Ontic structuralists claim that there are no individual objects, and that reality should instead be thought of as a “web of relations”. It is difficult to make this metaphysical picture precise, however, since languages usually characterize the world by describing the objects that exist in it. This paper proposes a solution to the problem; I argue that when discourse is reformulated in the language of the calculus of relations ‐ an algebraic logic developed by Alfred Tarski ‐ it can be interpreted without presupposing the existence of objects. What is distinctive about the language of the calculus is that it contains no operator that resembles a quantifier, and yet it can be used to paraphrase any sentence expressible in first‐order logic. Since the use of a first‐order quantifier (or some similar operator) is usually what establishes commitment to an ontology of objects, and since the calculus of relations eschews the quantifier in favor of a composition operator that can be given a natural interpretation consistent with structuralist metaphysics, the calculus is an ideal language for the structuralist to use to describe the world.