Unification types and union splittings in intermediate logics

Abstract

Following a characterization [10] of locally tabular logics with finitary (or unitary) unification by their Kripke models we determine the unification types of some intermediate logics (extensions of INT). There are exactly four maximal logics with nullary unification L( R2+), L( R2) L( F2), L( G3) and L( G3+) and they are tabular. There are only two minimal logics with hereditary finitary unification: L( Fun), the least logic with hereditary unitary unification, and L( Fpr) the least logic with hereditary projective approximation; they are locally tabular. Unitary and non-projective logics need additional variables for mgu's of some unifiable formulas, and unitary logics with projective approximation are exactly projective. None of locally tabular intermediate logics has infinitary unification. Logics with finitary, but not hereditary finitary, unification are rare and scattered among the majority of those with nullary unification, see the example of H3 B2 and its extensions.

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