Add to ORKGAs is well-known, every product of a locally compact space with a k-space is a k-space. But, the product of a separable metric space with a k-space need not be a k-space. In this paper, we consider conditions for products to be k-spaces, and pose some related questions
In this note a new class of topological spaces generalizing k-spaces, the pseudo-k-spaces, is introd...
S~epin [13,14] introduced the notions of K-metrizability and capacity as a generalization of metric ...
Abstract. In this note a new class of topological spaces generalizing k-spaces, the pseudo-k-spaces,...
summary:As is well-known, every product of a locally compact space with a $k$-space is a $k$-space. ...
AbstractAs is well known, k-spaces are characterized as quotient spaces of locally compact spaces. F...
summary:As is well-known, every product of a locally compact space with a $k$-space is a $k$-space. ...
summary:As is well-known, every product of a locally compact space with a $k$-space is a $k$-space. ...
AbstractThe product of images, under closed maps of metric spaces need not be a k-space. In view of ...
Abstract. In this note a class of topological spaces generalizing the k-spaces is introduced and in...
Abstract. In this note a class of topological spaces generalizing the k-spaces is introduced and in...
A topological space X is called k-space if X is a Hausdorff space and X is an image of a locally co...
A topological space X is called k-space if X is a Hausdorff space and X is an image of a locally co...
Abstract. A a-space is a completely regular Hausdorff space possessing a compactificat.ion with zero...
A topological space X is called k-space if X is a Hausdorff space and X is an image of a locally co...
Abstract. A a-space is a completely regular Hausdorff space possessing a compactificat.ion with zero...
In this note a new class of topological spaces generalizing k-spaces, the pseudo-k-spaces, is introd...
S~epin [13,14] introduced the notions of K-metrizability and capacity as a generalization of metric ...
Abstract. In this note a new class of topological spaces generalizing k-spaces, the pseudo-k-spaces,...
summary:As is well-known, every product of a locally compact space with a $k$-space is a $k$-space. ...
AbstractAs is well known, k-spaces are characterized as quotient spaces of locally compact spaces. F...
summary:As is well-known, every product of a locally compact space with a $k$-space is a $k$-space. ...
summary:As is well-known, every product of a locally compact space with a $k$-space is a $k$-space. ...
AbstractThe product of images, under closed maps of metric spaces need not be a k-space. In view of ...
Abstract. In this note a class of topological spaces generalizing the k-spaces is introduced and in...
Abstract. In this note a class of topological spaces generalizing the k-spaces is introduced and in...
A topological space X is called k-space if X is a Hausdorff space and X is an image of a locally co...
A topological space X is called k-space if X is a Hausdorff space and X is an image of a locally co...
Abstract. A a-space is a completely regular Hausdorff space possessing a compactificat.ion with zero...
A topological space X is called k-space if X is a Hausdorff space and X is an image of a locally co...
Abstract. A a-space is a completely regular Hausdorff space possessing a compactificat.ion with zero...
In this note a new class of topological spaces generalizing k-spaces, the pseudo-k-spaces, is introd...
S~epin [13,14] introduced the notions of K-metrizability and capacity as a generalization of metric ...
Abstract. In this note a new class of topological spaces generalizing k-spaces, the pseudo-k-spaces,...