Groups and Inverse Semigroups in Lambda Calculus

Abstract

We study invertibility of λ-terms modulo λ-theories. Here a fundamental role is played by a class of λ-terms called finite hereditary permutations (FHP) and by their infinite generalisations (HP). More precisely, FHPs are the invertible elements in the least extensional λ-theory λ η and HPs are those in the greatest sensible λ-theory H*. Our approach is based on inverse semigroups, algebraic structures that generalise groups and semilattices. We show that FHP modulo a λ-theory T is always an inverse semigroup and that HP modulo T is an inverse semigroup whenever T contains the theory of B\"ohm trees. An inverse semigroup comes equipped with a natural order. We prove that the natural order corresponds to η-expansion in FHP /T, and to infinite η-expansion in HP/T. Building on these correspondences we obtain the two main contributions of this work: firstly, we recast in a broader framework the results cited at the beginning; secondly, we prove that the FHPs are the invertible λ-terms in all the λ-theories lying between λ η and H+. The latter is Morris' observational λ-theory, defined by using the β-normal forms as observables.