Quasi-projective monounary algebras

Abstract

Wu and Jans introduced quasi-projective modules where they say a R module M is quasi-projective if for every submodule N, for every homomorphism f : M → M/ N and every epimorphism j: M→ M/ N there is an endomorphism φ of M such that φ j=f. We say that a structure S is quasi-projective if for every structure T, for every homomorphism f : S → T and every epimorphism j: S→ T there is an endomorphism φ of S such that φ j=f. In 2004 D. Jakub\'ikov\'a-Studenovsk\'a defined the concept of the factor algebra denoted by A/ B, where A is a monounary algebra and B is a subalgebra of A. In this paper, we characterise the quasi-projective monounary algebras of arbitrary cardinalities for the definition of D. Jakub\'ikov\'a-Studenovsk\'a and for the second definition.