Add to ORKGLet $\mathcal C$ be a class of $T_1$ topological semigroups, containing all Hausdorff zero-dimensional topological semigroups. A semigroup $X$ is $\mathcal C$-$closed$ if $X$ is closed in any topological semigroup $Y\in\mathcal C$ that contains $X$ as a discrete subsemigroup; $X$ is $injectively$ $\mathcal C$-$closed$ if for any (injective) homomorphism $h:X\to Y$ to a topological semigroup $Y\in\mathcal C$, the image $h[X]$ is closed in $Y$. A semigroup $X$ is $unipotent$ if it contains a unique idempotent. We prove that a unipotent commutative semigroup $X$ is (injectively) $\mathcal C$-closed if and only if $X$ is bounded, nonsingular (and group-finite). This characterization implies that for every injectively $\mathcal C$-closed unipote...
The space of unitary $C_{0}$-semigroups on separable infinite dimensional Hilbert space, when viewed...
For a commutative semiring S, by an S-algebra we mean a commutative semiring A equipped with a homom...
A topologized semilattice X is called complete if each non-empty chain C⊂ X has inf C and sup C that...
Let C be a class of T1 topological semigroups, containing all Hausdorff zero-dimensional topological...
In this paper we establish a connection between categorical closedness and topologizability of semig...
Let $\mathcal C$ be a class of topological semigroups. A semigroup $X$ is called (1) $\mathcal C$-$c...
We study topologizations of the semigroup $\boldsymbol{B}_{\omega}^{\mathscr{F}}$ for the family $\m...
All topological spaces will be assumed to be Hausdorff. We shall follow the terminology of [1, 2, 3]...
[EN] We investigate closed subsets (subsemigroups, resp.) of compact-like topological spaces (semigr...
Let ({overset{rightarrow}{mathcal{C}} }) be a category whose objects are semigroups with topology an...
AbstractLet S be an infinite discrete semigroup which can be embedded algebraically into a compact t...
In the paper we study the semigroup $\mathcal{C}_{\mathbb{Z}}$ which is a generalization of the bicy...
AbstractLet S be an infinite discrete semigroup which can be embedded algebraically into a group and...
AbstractThe main result of this paper is that two T2 topological spaces are homeomorphic if and only...
For a commutative semiring S, by an S-algebra we mean a commutative semiring A equipped with a homom...
The space of unitary $C_{0}$-semigroups on separable infinite dimensional Hilbert space, when viewed...
For a commutative semiring S, by an S-algebra we mean a commutative semiring A equipped with a homom...
A topologized semilattice X is called complete if each non-empty chain C⊂ X has inf C and sup C that...
Let C be a class of T1 topological semigroups, containing all Hausdorff zero-dimensional topological...
In this paper we establish a connection between categorical closedness and topologizability of semig...
Let $\mathcal C$ be a class of topological semigroups. A semigroup $X$ is called (1) $\mathcal C$-$c...
We study topologizations of the semigroup $\boldsymbol{B}_{\omega}^{\mathscr{F}}$ for the family $\m...
All topological spaces will be assumed to be Hausdorff. We shall follow the terminology of [1, 2, 3]...
[EN] We investigate closed subsets (subsemigroups, resp.) of compact-like topological spaces (semigr...
Let ({overset{rightarrow}{mathcal{C}} }) be a category whose objects are semigroups with topology an...
AbstractLet S be an infinite discrete semigroup which can be embedded algebraically into a compact t...
In the paper we study the semigroup $\mathcal{C}_{\mathbb{Z}}$ which is a generalization of the bicy...
AbstractLet S be an infinite discrete semigroup which can be embedded algebraically into a group and...
AbstractThe main result of this paper is that two T2 topological spaces are homeomorphic if and only...
For a commutative semiring S, by an S-algebra we mean a commutative semiring A equipped with a homom...
The space of unitary $C_{0}$-semigroups on separable infinite dimensional Hilbert space, when viewed...
For a commutative semiring S, by an S-algebra we mean a commutative semiring A equipped with a homom...
A topologized semilattice X is called complete if each non-empty chain C⊂ X has inf C and sup C that...