AbstractIt is proved that every countable topological group not containing an open Boolean subgroup can be partitioned into countably many dense subsets. It is also proved that every countable group with finitely many elements of order 2, that can be embedded in a compact topological group, can be partitioned into countably many subsets dense in any nondiscrete group topology
AbstractContinuing earlier investigations into the question of the existence of a proper dense subgr...
summary:It is established that a remainder of a non-locally compact topological group $G$ has the Ba...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
AbstractIt is proved that every countable topological group not containing an open Boolean subgroup ...
A research project submitted in partial fulfilment of the requirements for the degree of Master of...
summary:It is proved that every uncountable $\omega$-bounded group and every homogeneous space conta...
summary:It is proved that every uncountable $\omega$-bounded group and every homogeneous space conta...
[EN] A topological group G is: (i) compactly generated if it contains a compact subset algebraically...
[EN] We give different proofs of extraresolvability for countably in finite topological spaces and i...
AbstractA subset S of a topological group G is said to be a suitable set if (a) it has the discrete ...
A topological group G is: (i) compactly generated if it contains a compact subset algebraically gene...
A topological space is called {\it dense-separable} if each dense subset of its is separable. Theref...
AbstractA subset S of a topological group G is said to be a suitable set if (a) it has the discrete ...
AbstractContinuing earlier investigations into the question of the existence of a proper dense subgr...
AbstractIf a discrete subset S of a topological group G with identity 1 generates a dense subgroup o...
AbstractContinuing earlier investigations into the question of the existence of a proper dense subgr...
summary:It is established that a remainder of a non-locally compact topological group $G$ has the Ba...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
AbstractIt is proved that every countable topological group not containing an open Boolean subgroup ...
A research project submitted in partial fulfilment of the requirements for the degree of Master of...
summary:It is proved that every uncountable $\omega$-bounded group and every homogeneous space conta...
summary:It is proved that every uncountable $\omega$-bounded group and every homogeneous space conta...
[EN] A topological group G is: (i) compactly generated if it contains a compact subset algebraically...
[EN] We give different proofs of extraresolvability for countably in finite topological spaces and i...
AbstractA subset S of a topological group G is said to be a suitable set if (a) it has the discrete ...
A topological group G is: (i) compactly generated if it contains a compact subset algebraically gene...
A topological space is called {\it dense-separable} if each dense subset of its is separable. Theref...
AbstractA subset S of a topological group G is said to be a suitable set if (a) it has the discrete ...
AbstractContinuing earlier investigations into the question of the existence of a proper dense subgr...
AbstractIf a discrete subset S of a topological group G with identity 1 generates a dense subgroup o...
AbstractContinuing earlier investigations into the question of the existence of a proper dense subgr...
summary:It is established that a remainder of a non-locally compact topological group $G$ has the Ba...
AbstractIn this paper, we consider the following question: when does a topological group G have a Ha...
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