Olena Hryniv
Pontryagin duality between compact and discrete abelian inverse monoids.
Mon, 08/09/2010 - 15:01 — SomNambulAuthors: Taras Banakh, Olena Hryniv
Subjects: General Topology
AbstractFor a topological monoid S the dual inverse monoid is the topological monoid
of all identity preserving homomorphisms from S to the circle with attached
zero. A topological monoid S is defined to be reflexive if the canonical
homomorphism from S to its second dual inverse monoid is a topological
isomorphism. We prove that a (compact or discrete) topological inverse monoid S
is reflexive (if and) only if S is abelian and the idempotent semilattice of S
is zero-dimensional. For a discrete (resp. compact) topological monoid its dual
inverse monoid is compact (resp. discrete).Free topological universal algebras and absolute neighborhood retracts.
Thu, 02/18/2010 - 16:01 — SomNambulAuthors: Taras Banakh, Olena Hryniv
Subjects: General Topology
AbstractWe prove that for a complete quasivariety $K$ of topological $E$-algebras of
countable discrete signature $E$ and each submetrizable $ANR(k_\omega)$-space
$X$ its free topological $E$-algebra $F_K(X)$ in the class $K$ is a
submetrizable $ANR(k_\omega)$-space.
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