Add to ORKGThe diametral dimension is an important topological invariant, especially in the context of Köthe sequence spaces. This poster presents some results concerning the equality of the diametral dimension with one of its variants. It is based on a joint work with Françoise Bastin, Leonhard Frerick, and Jochen Wengenroth. Firstly, it gives sufficient conditions to have the equality between the two diametral dimensions for a Fréchet space. Secondly, it provides some examples of spaces verifying these conditions. Finally, it gives a family of Schwartz - or even nuclear - (non metrizable) locally convex spaces for which the two diametral dimensions are different
Abstract. Alexandroff T0-spaces have been studied as topological models of the sup-ports of digital ...
Alexandroff spaces have all the properties of finite spaces and therefore play an important role in ...
AbstractAlexandroff spaces have all the properties of finite spaces and therefore play an important ...
The "classic" diametral dimension is a topological invariant which characterizes Schwartz and nuclea...
The classical diametral dimension (Bessaga, Mityagin, Pelczynski, Rolewicz), denoted by "Delta", is ...
This article provides new results concerning the equality between two diametral dimensions. It shows...
We generalize some well-known results about the diametral dimension of classical Kothe spaces
We present the definition and the main properties of the diametral dimension. We give an application...
Spaces Snu are metrizable sequence spaces defined by Jaffard in the context of multifractal analysis...
International audienceStemming from the study of signals via wavelet coefficients, the spaces S(nu) ...
Stemming from the study of signals via wavelet coefficients, the spaces S\nu are complete metrizable...
This paper investigates two topological invariants in the context of the sequence spaces Snu, which ...
The diametral dimension is a topological invariant on the class of topological vector spaces. Beside...
The diametral dimension of a nuclear Fréchet spaceE, which satisfies (DN) and (Ω), is related to pow...
This book covers the fundamental results of the dimension theory of metrizable spaces, especially in...
Abstract. Alexandroff T0-spaces have been studied as topological models of the sup-ports of digital ...
Alexandroff spaces have all the properties of finite spaces and therefore play an important role in ...
AbstractAlexandroff spaces have all the properties of finite spaces and therefore play an important ...
The "classic" diametral dimension is a topological invariant which characterizes Schwartz and nuclea...
The classical diametral dimension (Bessaga, Mityagin, Pelczynski, Rolewicz), denoted by "Delta", is ...
This article provides new results concerning the equality between two diametral dimensions. It shows...
We generalize some well-known results about the diametral dimension of classical Kothe spaces
We present the definition and the main properties of the diametral dimension. We give an application...
Spaces Snu are metrizable sequence spaces defined by Jaffard in the context of multifractal analysis...
International audienceStemming from the study of signals via wavelet coefficients, the spaces S(nu) ...
Stemming from the study of signals via wavelet coefficients, the spaces S\nu are complete metrizable...
This paper investigates two topological invariants in the context of the sequence spaces Snu, which ...
The diametral dimension is a topological invariant on the class of topological vector spaces. Beside...
The diametral dimension of a nuclear Fréchet spaceE, which satisfies (DN) and (Ω), is related to pow...
This book covers the fundamental results of the dimension theory of metrizable spaces, especially in...
Abstract. Alexandroff T0-spaces have been studied as topological models of the sup-ports of digital ...
Alexandroff spaces have all the properties of finite spaces and therefore play an important role in ...
AbstractAlexandroff spaces have all the properties of finite spaces and therefore play an important ...