AbstractIn this paper we introduce the concept of small-weak-infinite-dimensionality. We show that a separable metric space has a weakly-infinite-dimensional compact metric extension if and only if the space is small-weakly-infinite-dimensional
AbstractDimension theory for separable metric spaces is approached using the concept of essential fa...
In [1], Aarts and Nishiura investigated several types of dimensions modulo a class $P $ of spaces. T...
Let X be a Banach space and X* its dual space. The classical Alaoglu theorem states that closed ball...
AbstractIn this paper we introduce the concept of small-weak-infinite-dimensionality. We show that a...
Abstract. In this paper, we shall classify small weakly infinite-dimensional spaces and consider the...
summary:In this paper we give a characterization of a separable metrizable space having a metrizable...
summary:In this paper we give a characterization of a separable metrizable space having a metrizable...
AbstractIt is shown that the product of two A-weakly infinite-dimensional spaces may fail to have th...
We will construct weakly infinite-dimensional (in the sense of Y. Smirnov) spaces X and Y such that ...
In this paper, the spaces we consider will be metriza ble, and by a compactum we shall mean a compac...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
Hereditarily locally compact spaces are characterized as those locally compact spaces which are simp...
AbstractIn this paper we construct a weakly infinite-dimensional compactum which cannot be separated...
AbstractWe characterize two classes of metric spaces as images under a closed, finite-to-one mapping...
Relative weakly compact sets and weak convergence in variable exponent Lebesgue spaces L p(·) () for...
AbstractDimension theory for separable metric spaces is approached using the concept of essential fa...
In [1], Aarts and Nishiura investigated several types of dimensions modulo a class $P $ of spaces. T...
Let X be a Banach space and X* its dual space. The classical Alaoglu theorem states that closed ball...
AbstractIn this paper we introduce the concept of small-weak-infinite-dimensionality. We show that a...
Abstract. In this paper, we shall classify small weakly infinite-dimensional spaces and consider the...
summary:In this paper we give a characterization of a separable metrizable space having a metrizable...
summary:In this paper we give a characterization of a separable metrizable space having a metrizable...
AbstractIt is shown that the product of two A-weakly infinite-dimensional spaces may fail to have th...
We will construct weakly infinite-dimensional (in the sense of Y. Smirnov) spaces X and Y such that ...
In this paper, the spaces we consider will be metriza ble, and by a compactum we shall mean a compac...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
Hereditarily locally compact spaces are characterized as those locally compact spaces which are simp...
AbstractIn this paper we construct a weakly infinite-dimensional compactum which cannot be separated...
AbstractWe characterize two classes of metric spaces as images under a closed, finite-to-one mapping...
Relative weakly compact sets and weak convergence in variable exponent Lebesgue spaces L p(·) () for...
AbstractDimension theory for separable metric spaces is approached using the concept of essential fa...
In [1], Aarts and Nishiura investigated several types of dimensions modulo a class $P $ of spaces. T...
Let X be a Banach space and X* its dual space. The classical Alaoglu theorem states that closed ball...
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