Large free sets in universal algebras

Abstract

We prove that for each universal algebra (A, A) of cardinality |A| 2 and an infinite set X of cardinality |X|| A|, the X-th power (AX, AX) of the algebra (A, A) contains a free subset F⊂ AX of cardinality | F|=2|X|. This generalizes the classical Fichtenholtz-Kantorovitch-Hausdorff result on the existence of an independent family I⊂ P(X) of cardinality | I|=| P(X)| in the Boolean algebra P(X) of subsets of an infinite set X.