De Morgan clones and four-valued logics

Abstract

We study clones on a four-element set related to the clone DMA of all term functions of the sub\-directly irreducible four-element De~Morgan algebra DM4. We find generating sets for the clones of all functions preserving the subalgebras of DM4, the auto\-morphisms of~DM4, the truth order and the information order on DM4, as well as clones defined by conjunctions of these conditions. We identify the covers of DMA in the lattice of four-valued clones and describe the lattice of clones above DMA which contain the discriminator function. Finally, observing that each clone above DMA defines an expansion of the four-valued Belnap--Dunn logic, we classify these clones by their metalogical properties, specifically by their position within the Leibniz and Frege hierarchies of abstract algebraic logic.