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A Bayesian Spatiotemporal Functional Model for Data With Block Structure and Repeated Measures
Environmetrics, Volume 37, Issue 2, March 2026.ABSTRACT The analysis of spatiotemporal data is fundamental across multiple scientific disciplines, particularly in assessing the behavior of climate effects over space and time. A key challenge in this area is effectively capturing recurring climate phenomena, such as El Niño/La Niña (ENSO) phases, which induce prolonged periods of similar weather ...
David H. da Matta +3 more
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High performance GPU implementation of KNN algorithm: A review. [PDF]
MethodsXBidye P, Borkar P, Rakesh N.
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Overlapping community detection based on bridging structural features and fuzzy C-means. [PDF]
PLoS OneWang A, Li M, Gao X, Li B, Su Z.
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Higher Structure of Chiral Symmetry. [PDF]
Commun Math PhysCopetti C +3 more
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Chaos in Stochastic 2d Galerkin-Navier-Stokes. [PDF]
Commun Math PhysBedrossian J, Punshon-Smith S.
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Real Commutative Division Algebras
Algebras and Representation Theory, 2007zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Darpö, Erik, Dieterich, Ernst
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International Journal of Theoretical Physics, 2004
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Canadian Journal of Mathematics, 1981
Let K be a field of characteristic zero. The Schur subgroup S(K) of Brauer group B(K) consists of those equivalence classes [A] which contain an algebra which is isomorphic to a simple summand of the group algebra KG for some finite group G. It is well known that the classes in S(K) are represented by cyclotomic algebras, (see [16]).
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Let K be a field of characteristic zero. The Schur subgroup S(K) of Brauer group B(K) consists of those equivalence classes [A] which contain an algebra which is isomorphic to a simple summand of the group algebra KG for some finite group G. It is well known that the classes in S(K) are represented by cyclotomic algebras, (see [16]).
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Division Algebras, Clifford Algebras, Periodicity
Advances in Applied Clifford Algebras, 2018Periodicities in Clifford algebra theory of orders \(2,4,\) and \(8\) are well known. Starting from a result from lattice theory, in which a \(24\)-dimensional Leech lattice can be represented in the \(3\)-dimensional space with octonion components, the main goal of this paper is to prove that, by exploiting the octonion algebra, in Clifford algebra ...
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