Automatic continuity, unique Polish topologies, and Zariski topologies on monoids and clones

Abstract

In this paper we explore the extent to which the algebraic structure of a monoid M determines the topologies on M that are compatible with its multiplication. Specifically we study the notions of automatic continuity; minimal Hausdorff or Polish semigroup topologies; and we formulate a notion of the Zariski topology for monoids. If M is a topological monoid such that every homomorphism from M to a second countable topological monoid N is continuous, then we say that M has automatic continuity. We show that many well-known monoids have automatic continuity with respect to a natural semigroup topology, namely: the full transformation monoid NN; the full binary relation monoid BN; the partial transformation monoid PN; the symmetric inverse monoid IN; the monoid Inj(N) consisting of the injective functions on N; and the monoid C(2N) of continuous functions on the Cantor set. We show that the pointwise topology on NN, and its analogue on PN, are the unique Polish semigroup topologies on these monoids. The compact-open topology is the unique Polish semigroup topology on C(2N) and C([0, 1]N). There are at least 3 Polish semigroup topologies on IN, but a unique Polish inverse semigroup topology. There are no Polish semigroup topologies BN nor on the partitions monoids. At the other extreme, Inj(N) and the monoid Surj(N) of all surjective functions on N each have infinitely many distinct Polish semigroup topologies. We prove that the Zariski topologies on NN, PN, and Inj(N) coincide with the pointwise topology; and we characterise the Zariski topology on BN. In Section 7: clones.