Results 21 to 30 of about 1,721,646 (174)
Lieb-Liniger gas in a constant force potential [PDF]
, 2010 We use Gaudin's Fermi-Bose mapping operator to calculate exact solutions for the Lieb-Liniger model in a linear (constant force) potential (the constructed exact stationary solutions are referred to as the Lieb-Liniger-Airy wave functions).
Buljan, H. +3 more
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Journal of Mathematical Analysis and Applications, 1998 The paper is a continuation of the first author's investigation [Fuzzy Sets Syst. 82, No. 3, 375-381 (1996; Zbl 0884.15003)]. After reminding of previous results, the paper examines fuzzy subsets of the vector space of fuzzy homomorphisms between fuzzy vector spaces.
Abdukhalikov, K.S, Kim, C
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Genome Biology, 2020 Background The current bovine genomic reference sequence was assembled from a Hereford cow. The resulting linear assembly lacks diversity because it does not contain allelic variation, a drawback of linear references that causes reference allele bias ...
Danang Crysnanto, Hubert Pausch
doaj +1 more source
Efficiently Mapping Linear Algebra to High-Performance Code [PDF]
, 2019 Aware of the role that linear algebra plays in scientific applications, we investigate if/how matrix expressions can be efficiently evaluated with current high-level languages.
Barthels, Henrik +2 more
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Decompositions of linear maps [PDF]
Transactions of the American Mathematical Society, 1977 In the first part we show that the decomposition of a bounded selfadjoint linear map from a C*-algebra into a given von Neumann algebra as a difference of two bounded positive linear maps is always possible if and only if that range algebra is a "strictly finite" von Neumann algebra of type I.
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Łojasiewicz exponent of overdetermined semialgebraic mappings [PDF]
, 2017 We prove that both local and global Łojasiewicz exponent of a continuous overdetermined semialgebraic mapping F : X → Rᵐ on a closed semialgebraic set X ⊂ Rⁿ (i.e.
Spodzieja, Stanisław +1 more
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Conformal Mapping in Linear Time [PDF]
Discrete & Computational Geometry, 2010 Given any $ε>0$ and any planar region $Ω$ bounded by a simple n-gon $P$ we construct a ($1 + ε)$-quasiconformal map between $Ω$ and the unit disk in time $C(ε)n$. One can take $ C(ε) = C + C \log (1/ε) \log \log (1/ε)$.
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Consensus with linear objective maps [PDF]
2015 54th IEEE Conference on Decision and Control (CDC), 2015 A consensus system is a linear multi-agent system in which agents communicate to reach a so-called consensus state, defined as the average of the initial states of the agents. Consider a more generalized situation in which each agent is given a positive weight and the consensus state is defined as the weighted average of the initial conditions.
Xudong Chen 0002 +2 more
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H\"older Error Bounds and H\"older Calmness with Applications to Convex Semi-Infinite Optimization [PDF]
, 2019 Using techniques of variational analysis, necessary and sufficient subdifferential conditions for H\"older error bounds are investigated and some new estimates for the corresponding modulus are obtained.
Kruger, Alexander +3 more
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Admissible linear map models of linear cameras [PDF]
2010 IEEE Computer Society Conference on Computer Vision and Pattern Recognition, 2010 This paper presents a complete analytical characterization of a large class of central and non-central imaging devices dubbed linear cameras by Ponce~\cite{Pon09}. Pajdla~\cite{Pajdla02} has shown that a subset of these, the oblique cameras, can be modelled by a certain type of linear map.
Guillaume Batog +2 more
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