Random equivalence relations

SIMPLE PAIRS OF EQUIVALENCE RELATIONS by CARLO TOFFALORI in Camerino (Italy) 8 1. Introduction In f6l and (71 we considered theories of two equivalence relations Eo, E l such that if E dethere is an h E w such that for all u the E-class of u contains at most h classes 01 either Eo or E,. notes the e

We extend Regenwetter's (1996) results on the relationship between (1) random relations, i.e., a probability measure on m-ary relations, and (2) random utilities, i.e., families of random variables, to (3) random functions, i.e., a probability measure over a function space. In this third approach, w

The dimension of a fuzzy equivalence relation is the minimum number of fuzzy sets needed to generate it. A general theorem is proved that characterizes unidimensional fuzzy equivalence relations. The multidimensional case is also studied under some Ž . restrictive conditions regular fuzzy equivalenc

For ordinals α beginning a Σ1 gap in L(R), where Σ J α (R) 1 is closed under number quantification, we give an inner model-theoretic proof that every thin in a real parameter from the (optimal) hypothesis AD J α (R) .