Congruences on Direct Products of Transformation and Matrix Monoids

Abstract: Malcev described the congruences of the monoid $T_n$ of all full transformations on a finite set $X_n={1, \dots,n}$. Since then, congruences have been characterized in various other monoids of (partial) transformations on $X_n$, such as the symmetric inverse monoid $In_n$ of all injective partial transformations, or the monoid $PT_n$ of all partial transformations. The first aim of this paper is to describe the congruences of the direct products $Q_m\times P_n$, where $Q$ and $P$ belong to ${T, PT,In}$. Malcev also provided a similar description of the congruences on the multiplicative monoid $F_n$ of all $n\times n$ matrices with entries in a field $F$, our second aim is provide a description of the principal congruences of $F_m \times F_n$. The paper finishes with some comments on the congruences of products of more than two transformation semigroups, and a fairly large number of open problems.