On equivalences of polarized partition relations

Abstract

The paper deals with two notions: polarized partition relations and product of generalized strong sequences. Strong sequences were introduced by Efimov in 1965 as a usefull tool for proving famous theorems in dyadic spaces, i.e. continuous images of Cantor cube. In this paper we introduce the notion of product of generalized strong sequences and give pure combinatorial proof that existence of product of generalized strong sequences is equivalent to polarized partition relations.