Results 311 to 320 of about 51,520 (330)
Les cogito de Jaques Derrida. Hyperbole et figures de l’autre
, 2018 Olivier Dubouclez
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JMT Musings: From the Impostor Syndrome to Humility. [PDF]
J Med ToxicolDye LR.
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A corpus-based analysis on the use of MAKE in sinologist Cyril Birch's English version of Mistress and Maid (Jiaohongji). [PDF]
PLoS OneYu C, Wu Y.
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Hyperbole in surgical manuscripts : time to drop the paradigm?
, 2019 Wim Ceelen
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Hyperbole in Brazilian and german talks-in-interaction: a cross-cultural study
, 2017 Carolina Passig Martins
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Bulletin of Mathematical Biology, 2009
Several hyperbolically saturating empirical models, such as the Michaelis-Menten rate equation, Monod's relative population growth rate, competitive inhibition, and Langmuir's adsorption, are rederived from a simple queuing relation. The resulting derivations reveal and potentially explain the underlying structure and meaning of such empirical models ...
J H, Jackson, C R, MacCluer
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Several hyperbolically saturating empirical models, such as the Michaelis-Menten rate equation, Monod's relative population growth rate, competitive inhibition, and Langmuir's adsorption, are rederived from a simple queuing relation. The resulting derivations reveal and potentially explain the underlying structure and meaning of such empirical models ...
J H, Jackson, C R, MacCluer
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Advances in Applied Clifford Algebras, 1998
The goal of the paper is to present a hyperbolic calculus which bases on so-called hyperbolic numbers and is related to Lorentz transformations and dilatations in the two-dimensional Minkowski space-time. The set of hyperbolic numbers is defined by \(P=\{t+hx:t,x\in\mathbb{R}\}\), \(h^2=1\).
Motter, A. E., Rosa, M. A. F.
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The goal of the paper is to present a hyperbolic calculus which bases on so-called hyperbolic numbers and is related to Lorentz transformations and dilatations in the two-dimensional Minkowski space-time. The set of hyperbolic numbers is defined by \(P=\{t+hx:t,x\in\mathbb{R}\}\), \(h^2=1\).
Motter, A. E., Rosa, M. A. F.
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Hyperbolically Sasakian and equidistant hyperbolically Kahlerian spaces
Journal of Soviet Mathematics, 1992See the review in Zbl 0711.53042.
Mikeš, Josef, Starko, G. A.
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