There are only countably many locally tabular bi-intermediate logics of co-trees

Abstract

A bi-Heyting algebra validates the G\"odel-Dummett axiom (p q) (q p) iff the poset of its prime filters is a disjoint union of co-trees. Bi-Heyting algebras of this kind are called bi-G\"odel algebras and form a variety bi-GA that algebraizes the extension bi-GD of bi-intuitionistic logic axiomatized by the G\"odel-Dummett axiom. In this paper we show that there are only countably many locally tabular bi-intermediate logics of co-trees, all of which are finitely axiomatizable. The theory of canonical formulas of bi-G\"odel algebras has shown that bi-GA has continuum many subvarieties, among which the locally finite ones coincide with the subvarieties of the Vn \A ∈ bi-GA A β(Cn)\ (where β(Cn) is the subframe formula of the n-comb). We identify the multiset projectivity relation (a binary relation that, when defined on the set of finite multisets of a better partial order, is necessarily a better partial order) and use it to prove that every Vn is a Specht variety, hence has only countably many subvarieties, all of which are finitely axiomatizable. By the algebraizability of bi-GD, the main result follows. We also provide an informative depiction of the lattice of varieties of bi-G\"odel algebras.