Resumen de Monadic Wajsberg hoops
Cecilia R. Cimadamore, José Patricio Díaz Varela
Wajsberg hoops are the {⊙,→,1}-subreducts (hoop-subreducts) of Wajsberg algebras, which are term equivalent to MV-algebras and are the algebraic models of Łukasiewicz infinite-valued logic. Monadic MV-algebras were introduced by Rutledge [Ph.D. thesis, Cornell University, 1959] as an algebraic model for the monadic predicate calculus of Łukasiewicz infinite-valued logic, in which only a single individual variable occurs. In this paper we study the class of {⊙,→,∀,1}-subreducts (monadic hoop-subreducts) of monadic MV-algebras. We prove that this class, denoted by MWH, is an equational class and we give the identities that define it. An algebra in MWH is called a monadic Wajsberg hoop. We characterize the subdirectly irreducible members in MWH and the congruences by monadic filters. We prove that MWH is generated by its finite members. Then, we introduce the notion of width of a monadic Wajsberg hoop and study some of the subvarieties of monadic Wajsberg hoops of finite width k. Finally, we describe a monadic Wajsberg hoop as a monadic maximal filter within a certain monadic MV-algebra such that the quotient is the two element chain.
