On large cardinals and generalized Baire spaces

Abstract

Working under large cardinal assumptions, we study the Borel-reducibility between equivalence relations modulo restrictions of the non-stationary ideal on some fixed cardinal . We show the consistency of Eλ++,λ++λ-club, the relation of equivalence modulo the non-stationary ideal restricted to Sλ++λ in the space (λ++)λ++, being continuously reducible to E2,λ++λ+-club, the relation of equivalence modulo the non-stationary ideal restricted to Sλ++λ+ in the space 2λ++. Then we show the consistency of E2,reg, the relation of equivalence modulo the non-stationary ideal restricted to regular cardinals in the space 2, being 11-complete. We finish by showing, for 21-indescribable , that the isomorphism relation between dense linear orders of cardinality is 11-complete.