Results 191 to 200 of about 163,347 (232)
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Mathematische Nachrichten, 1993
AbstractModular interval spaces represent a common generalization of Banach spaces of type L1(μ) or B(X), of hyperconvex metric spaces, modular lattices, modular graphs, and median algebras. It turns out that several types of structures are susceptible for a notion capturing essential features of modularity in lattices, e.g., semilattices ...
Bandelt, H.-J. +2 more
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AbstractModular interval spaces represent a common generalization of Banach spaces of type L1(μ) or B(X), of hyperconvex metric spaces, modular lattices, modular graphs, and median algebras. It turns out that several types of structures are susceptible for a notion capturing essential features of modularity in lattices, e.g., semilattices ...
Bandelt, H.-J. +2 more
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Optics Letters, 1994
Repeated folding of the optical axis can be used to design space- and volume-efficient optical systems. We suggest that space-filling curves, such as the Peano and Hilbert curves, offer a useful way of realizing compact modular optics.
M P, Schamschula +2 more
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Repeated folding of the optical axis can be used to design space- and volume-efficient optical systems. We suggest that space-filling curves, such as the Peano and Hilbert curves, offer a useful way of realizing compact modular optics.
M P, Schamschula +2 more
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Modular Interpolation Spaces I
Zeitschrift für Analysis und ihre Anwendungen, 1982An interpolation method in modular spaces is introduced and basic properties of obtained interpolation spaces are studied (completness, imbeddings etc.). The main result hero is a reiteration theorem. It is shown how the method works in Orlicz spaces and as an example of applications there is proved a multiplier theorem of the ...
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Modular inflatable space structures
2018 IEEE Aerospace Conference, 2018There is a growing need to develop a human focused exploration program and support infrastructure, including relay sites in deep space. One of the first targets will be cislunar space station, which is a strategic gateway towards permanent settlement of the Moon and Mars.
Aman Chandra +2 more
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2015
The concept of a metric space is closely related to our intuitive understanding of space is the 3-dimensional Euclidean space. In fact, the notion of metric is a generalization of the Euclidean metric arising from the basic long known properties of the Euclidean distance.
Mohamed A. Khamsi, Wojciech M. Kozlowski
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The concept of a metric space is closely related to our intuitive understanding of space is the 3-dimensional Euclidean space. In fact, the notion of metric is a generalization of the Euclidean metric arising from the basic long known properties of the Euclidean distance.
Mohamed A. Khamsi, Wojciech M. Kozlowski
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Modular assembled space telescope
Optical Engineering, 2013We present a new approach to building a modular segmented space telescope that greatly leverages the heritage of the Hubble Space Telescope and the James Webb Space Telescope. The modular design in which mirror segments are assembled into identical panels allows for economies of scale and for efficient space assembly that make a 20-m aperture approach ...
Lee D. Feinberg +4 more
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Approximative Characteristics of Modular Orlicz Spaces
Journal of Mathematical Sciences, 2019zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Chaichenko, Stanislav O. +1 more
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Modular Reconfigurable Robots in Space Applications
Autonomous Robots, 2003zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Yim, Mark +5 more
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Probabilistic Modular Spaces and Linear Operators
Acta Applicandae Mathematicae, 2008Let \(X\) be a real vector space and let \(\Delta\) be the set of all non-decreasing functions \(f:\mathbb{R}\to \mathbb{R}^+_0\) with \(\text{inf\,}f(x)= 0\), \(\sup f(x)= 1\). Probabilistic modular spaces \((X,\mu)\) are considered, where \(\mu: X\to \Delta\) satisfies suitable conditions.
Fallahi, Kamal, Nourouzi, Kourosh
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Constructing modular classifying spaces
Israel Journal of Mathematics, 1989The paper addresses a classical question of Steenrod: ``What spaces have polynomial algebras as mod p cohomology?''. For odd p, \textit{W. G. Dwyer}, \textit{H. R. Miller} and \textit{C. Wilkerson} [Homotopical uniqueness of classifying spaces (unpublished)] showed that a realizable polynomial algebra should be isomorphic to the ring of invariants of a
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