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The Standard Model Symmetry and Qubit Entanglement. [PDF]
Entropy (Basel)Szangolies J.
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Machine learning in biological research: key algorithms, applications, and future directions. [PDF]
BMC BiolAlam MNU +10 more
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Conformal Field Theory, Solitons, and Elliptic Calogero-Sutherland Models. [PDF]
Commun Math PhysBerntson BK, Langmann E, Lenells J.
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Scalar-on-Function Mode Estimation Using Entropy and Ergodic Properties of Functional Time Series Data. [PDF]
Entropy (Basel)Alamari MB +4 more
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Tensor Relational Algebra for Distributed Machine Learning System Design
Proceedings of the VLDB Endowment, 2020We consider the question: what is the abstraction that should be implemented by the computational engine of a machine learning system? Current machine learning systems typically push whole tensors through a series of compute kernels such as matrix ...
Binhang Yuan +5 more
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The Cone Algebra and a Kernel Characterization of Green Operators
, 2001An informal overview is given of an algebra of pseudodifferential operators on manifolds with conical singularities as it was introduced by Schulze. It is proven that the residual class of Green operators, that by definition map Sobolev spaces to functions having certain prescribed asymptotics at the singularity, can equivalently be described as ...
J. Seiler
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On some problems for operators on the reproducing kernel Hilbert space
Linear and multilinear algebra, 2019In this study, some problems of operator theory on the reproducing kernel Hilbert space by using the Berezin symbols method are investigated. Namely, invariant subspaces of weighted composition operators on are studied.
M. Garayev +3 more
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S-duality for the Large N = 4 Superconformal Algebra
Communications in Mathematical Physics, 2018We prove some conjectures about vertex algebras which emerge in gauge theory constructions associated to the geometric Langlands program. In particular, we present the conjectural kernel vertex algebra for the ST2S\documentclass[12pt]{minimal ...
T. Creutzig, D. Gaiotto, A. Linshaw
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Congruence kernels in Ockham algebras
Algebra universalis, 2017For an Ockham algebra \((\mathcal{L}; f)\), the authors consider the ideals \(I\) such that \(I=0/\upsilon\) for some congruence \(\upsilon\) on \((\mathcal{L}; f)\). These ideals are called \textit{congruence kernels} and the congruence \(\upsilon\) for which \(I=0/\upsilon\) is said to have kernel \(I\).
Blyth, T. S., Silva, H. J.
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