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Productively sequential spaces
Mathematica Slovaca, 2018 Abstract We characterize productively sequential spaces, that is, spaces whose product with every strongly sequential space is sequential, equivalently strongly sequential. It turns out that a regular topology is productively sequential if and only if it is sequential and bi-quasi-k.
Szymon Dolecki, Frédéric Mynard
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The Coreflective Subcategory of Sequential Spaces
Canadian Mathematical Bulletin, 1968 Certain theorems of recent interest [1, 2] concerning sequential spaces may be deduced from the fact that the category of sequential spaces, is a coreflective subcategory of the category of topological spaces, J. A space is said to be sequential if it has the finest topology that permits the convergence of its convergent sequences.
S. Baron
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Sequential order of compact sequential spaces
, 2007 The problem of finding compact Hausdorff sequential spaces of sequential order $\alpha \le \omega_1$ is important and highly nontrivial. A solution has been searched in ZFC, but unsuccessfully up to now. Classically it was solved under CH, and more recently under MA up to order four. We present here a construction of a space of order three that appears
SORANZO, Alessandro, TIRONI G.
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Subjective evaluation of sequential spaces [PDF]
Applied Acoustics, 2020 The problem of designing non-acoustic sequential spaces is drawing increasing attention from acoustic researchers and practitioners. For subjective evaluation, the effects of sound source, differences in two directions (either towards or away from a ...
Jian Kang
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Sequential order of product of Fréchet spaces
Topology and Its Applications, 1996 We construct, assuming the continuum hypothesis (CH), two (strongly) Fréchet spaces whose product is sequential and its sequential order is α for any given α ...
Tsugunori Nogura, Alexander Shibakov
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On Sequential Properties of Spaces of Measures
Mathematical Notes, 2021A space is called an \(s_R\)-space if every sequentially continuous function on it, i.e., a function taking convergent sequences to convergent ones, is continuous.Then every sequentially continuous linear functional \(F\) on \(\mathcal{M}_r(X)\) (or on \(\mathcal{M}_d(X)\)) is continuous on \(\mathcal{M}_d(X)\).
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Polynomial sequential continuity on C(K,E) spaces
Journal of Mathematical Analysis and Applications, 2003 We show that, for bounded sequences in C(K,E), the polynomial sequential convergence is not equivalent to the pointwise polynomial sequential convergence.
Ignacio Villanueva
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Sequential Scheduling in Space Missions
2012 International Conference on Cyber-Enabled Distributed Computing and Knowledge Discovery, 2012By analyzing the defects of traditional scheduling in space missions, sequential mission scheduling architecture, SMSA, is proposed in this paper to cope with progressively increasing number of state modes of spacecrafts and space missions. The improvements of SMSA lie in both methodologies and ideologies, which make it closer to the core of resource ...
Jinjiang Xing +3 more
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Capturing the Design Space of Sequential Space-Filling Layouts
IEEE Transactions on Visualization and Computer Graphics, 2012We characterize the design space of the algorithms that sequentially tile a rectangular area with smaller, fixed-surface, rectangles. This space consist of five independent dimensions: Order, Size, Score, Recurse and Phrase. Each of these dimensions describe a particular aspect of such layout tasks. This class of layouts is interesting, because, beyond
Thomas Baudel, Bertjan Broeksema
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Subspaces of sequential spaces
Mathematical Notes, 1996zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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