On ordering of surjective cardinals

Abstract

Let Card denote the class of cardinals. For all cardinals a and b, a≤slantb means that there is an injection from a set of cardinality a into a set of cardinality b, and a≤slantb means that there is a partial surjection from a set of cardinality b onto a set of cardinality a. A doubly ordered set is a triple P,, such that is a partial ordering on P, is a preordering on P, and ⊂eq. In 1966, Jech proved that for every partially ordered set P,, there exists a model of ZF in which P, can be embedded into ,≤slant. We generalize this result by showing that for every doubly ordered set P,,, there exists a model of ZF in which P,, can be embedded into ,≤slant,≤slant.