Results 271 to 280 of about 110,571 (317)
An Enhanced Event-Based Model for Integrated Flight Safety of Fixed-Wing UAVs. [PDF]
Sensors (Basel)Ma X, Lu X, Li H, Lu X, Li J, Zhao J.
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<i>Hemiboea siccinvolucris</i> (Gesneriaceae), a new species from northeastern Guangxi, China. [PDF]
PhytoKeysFang Y +5 more
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Butterworth Filtering at 500 Hz Optimizes PPG-Based Heart Rate Variability Analysis for Wearable Devices: A Comparative Study. [PDF]
Sensors (Basel)Abdrasulova N +3 more
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Quaternary tufas of the western Potiguar Basin, Brazil: rapid xeromorphic adaptation and climate change inferred from sedimentology, paleobotany, and fossil diagenesis. [PDF]
NaturwissenschaftenAureliano T +12 more
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A new species of Bamboo (Poaceae, Bambusoideae) from coastal, southern Vietnam. [PDF]
PhytoKeysTien TV.
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ELLIPTIC CURVES AND -ADIC ELLIPTIC TRANSCENDENCE
Bulletin of the Australian Mathematical Society, 2021AbstractWe prove a necessary and sufficient condition for isogenous elliptic curves based on the algebraic dependence ofp-adic elliptic functions. As a consequence, we give a short proof of thep-adic analogue of Schneider’s theorem on the linear independence ofp-adic elliptic logarithms of algebraic points on two nonisogenous elliptic curves defined ...
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Russian Mathematical Surveys, 1960
This paper, like the note on integral geometry in the last number of the "Uspekhi" , is an addendum to my paper [1]. The main idea of the paper is contained in § 2, where we pose the problem of describing linear elliptic equations and their boundary problems in topological terms.
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This paper, like the note on integral geometry in the last number of the "Uspekhi" , is an addendum to my paper [1]. The main idea of the paper is contained in § 2, where we pose the problem of describing linear elliptic equations and their boundary problems in topological terms.
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Theory of Probability & Its Applications, 1986
Let \(E_ n=(\xi_{pl})^ n_{p,l=1}\) denote random complex (n\(\times n)\)-matrices. Random vectors \((\xi^ n_{pl},\xi^ n_{lp})\), \(p\geq l\), \(p,l=\overline{s,n}\) are independent, \(M\xi^ n_{pl}=0\), \(M| \xi^ n_{pl}|^ 2=n^{-1}\), \(M\xi^ n_{pl}\xi^ n_{lp}=n^{-1}\rho\), \(l\neq p\), random variables Re \(\xi\) \({}^ n_{pl}\), Im \(\xi\) \({}^ n_{pl}\)
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Let \(E_ n=(\xi_{pl})^ n_{p,l=1}\) denote random complex (n\(\times n)\)-matrices. Random vectors \((\xi^ n_{pl},\xi^ n_{lp})\), \(p\geq l\), \(p,l=\overline{s,n}\) are independent, \(M\xi^ n_{pl}=0\), \(M| \xi^ n_{pl}|^ 2=n^{-1}\), \(M\xi^ n_{pl}\xi^ n_{lp}=n^{-1}\rho\), \(l\neq p\), random variables Re \(\xi\) \({}^ n_{pl}\), Im \(\xi\) \({}^ n_{pl}\)
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Mathematische Nachrichten, 1999
AbstractIf G is the structure group of a manifold M it is shown how a certain ideal in the character ring of G corresponds to the set of geometric elliptic operators on M. This provides a simple method to construct these operators. For classical structure groups like G = O(n) (Riemannian manifolds), G = SO(n) (oriented Riemannian manifolds), G = U(m ...
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AbstractIf G is the structure group of a manifold M it is shown how a certain ideal in the character ring of G corresponds to the set of geometric elliptic operators on M. This provides a simple method to construct these operators. For classical structure groups like G = O(n) (Riemannian manifolds), G = SO(n) (oriented Riemannian manifolds), G = U(m ...
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