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MAP Image Recovery with Guarantees using Locally Convex Multi-Scale Energy (LC-MUSE) Model. [PDF]
Proc IEEE Int Conf Acoust Speech Signal ProcessChand JR, Jacob M.
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Connectome-constrained ligand-receptor interaction analysis for understanding brain network communication. [PDF]
Nat CommunDu Z +9 more
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Model Selection for Exponential Power Mixture Regression Models. [PDF]
Entropy (Basel)Jiang Y, Liu J, Zou H, Huang X.
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FAST MULTI-CONTRAST MRI USING JOINT MULTISCALE ENERGY MODEL. [PDF]
Proc IEEE Int Symp Biomed ImagingYaghoobi N +5 more
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Performance evaluation on extended neural network localization algorithm on 5 g new radio technology. [PDF]
Sci RepR D, Markkandan S, Arjunan VK.
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On Expressing Majority as a Majority of Majorities
SIAM Journal on Discrete Mathematics, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Christian Engels +3 more
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Competition for a Majority [PDF]
SSRN Electronic Journal, 2012 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
PAULO BARELLI +2 more
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Major construction entails major demolition
Developmental Cell, 2022Embryonic cells of the early mouse embryo become hypersensitive to apoptotic stimuli before gastrulation. In this issue of Developmental Cell, Pernaute et al. show that this switch in sensitivity is a result of a change in mitochondrial dynamics and mitophagy levels controlled by DRP1, a regulator of mitochondrial fission.
Korotkevich, Ekaterina, Hiiragi, Takashi
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On frustration of the majority by fulfilment of the majority's will
Analysis, 1976Here we have eleven voters, A-K, voting on eleven questions. Seven of them, A-G, vote in the minority in a majority of the decisions: A-F in seven out of the eleven cases, G in six. The majority is always 6-5. These figures can of course be varied. If we imagine an ideal democracy with a whole population voting directly on all questions, there will ...
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Power Majorization and Majorization of Sequences
Results in Mathematics, 1988Let \(x,y\in R^ n_+\) be such that \(x_ 1\geq...\geq x_ n\), \(y_ 1\geq...\geq y_ n\) and \(\sum x_ i=\sum y_ i.\) We say that x is power majorized by y if \(\sum x^ p_ i\leq \sum y^ p_ i\) for all real \(p\not\in [0,1]\) and \(\sum x^ p_ i\geq \sum y^ p_ i\) for \(p\in [0,1]\). Let \(\phi\) : [0,\(\infty)\to R\) be a continuous function.
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