Epic substructures and primitive positive functions

Abstract

For A≤B first order structures in a class K, say that A is an epic substructure of B in K if for every C∈K and all homomorphisms g,g:B→C, if g and g' agree on A, then g=g'. We prove that A is an epic substructure of B in a class K closed under ultraproducts if and only if A generates B via operations definable in K with primitive positive formulas. Applying this result we show that a quasivariety of algebras Q with an n-ary near-unanimity term has surjective epimorphisms if and only if SPnPu(QRSI) has surjective epimorphisms. It follows that if F is a finite set of finite algebras with a common near-unanimity term, then it is decidable whether the (quasi)variety generated by F has surjective epimorphisms.