Induced morphisms between Heyting-valued models

Abstract

To the best of our knowledge, there are very few results on how Heyting-valued models are affected by the morphisms on the complete Heyting algebras that determine them: the only cases found in the literature are concerning automorphisms of complete Boolean algebras and complete embedding between them (i.e., injective Boolean algebra homomorphisms that preserves arbitrary suprema and arbitrary infima). In the present work, we consider and explore how more general kinds of morphisms between complete Heyting algebras H and H' induce arrows between V(H) and V(H'), and between their corresponding localic toposes Set(H) ( Sh(H)) and Set(H') ( Sh(H')). In more details: any geometric morphism f* : Set(H) Set(H'), (that automatically came from a unique locale morphism f : H H'), can be "lifted" to an arrow f : V(H) V(H'). We also provide also some semantic preservation results concerning this arrow f : V(H) V(H').