A trichotomy for a class of equivalence relations

Abstract

Let Xn, n∈ N be a sequence of non-empty sets, n:Xn2 R+. We consider the relation E((Xn,n)n∈ N) on Πn∈ NXn by (x,y)∈ E((Xn,n)n∈ N)Σn∈ Nn(x(n),y(n))<+∞. If E((Xn,n)n∈ N) is a Borel equivalence relation, we show a trichotomy that either R N/1B E, E1B E, or EB E0. We also prove that, for a rather general case, E((Xn,n)n∈ N) is an equivalence relation iff it is an p-like equivalence relation.