Entropy-Regularized Optimal Transport on Multivariate Normal and q-normal Distributions. [PDF]
Entropy (Basel), 2021 Tong Q, Kobayashi K.
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HABiC: an algorithm based on the exact computation of the Kantorovich-Rubinstein optimizer for binary classification in transcriptomics. [PDF]
BioinformaticsCordier C +4 more
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Wavelet-enhanced residual optimal transport for Mamba-based image restoration in photoacoustic tomography. [PDF]
PhotoacousticsChan SCK +4 more
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In-Plane Vibration Analysis of Rectangular Plates with Elastically Restrained Boundaries Using Differential Quadrature Method of Variational Weak Form. [PDF]
Materials (Basel)Wang X, Zhou W, Yi S, Li S.
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Geometric analysis of non-degenerate shifted-knots Bézier surfaces in Minkowski space. [PDF]
PLoS OneBashir S, Ahmad D.
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Visualizing Fluid Flows via Regularized Optimal Mass Transport with Applications to Neuroscience. [PDF]
J Sci Comput, 2023 Chen X +4 more
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Relative Entropy, Gaussian Concentration and Uniqueness of Equilibrium States. [PDF]
Entropy (Basel), 2022 Chazottes JR, Redig F.
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Voronovskaya-type inequality for the MKZ-Kantorovich operator
Constructive Mathematical AnalysisWe prove a Voronovskaya-type inequality for the Kantorovich-type modification of Meyer-König and Zeller operator \begin{equation*}\label{MKZK} \widetilde M_n(f,x)= \sum_{k=0}^{\infty} m_{n,k}(x)\frac{(n+k+1)(n+k+2)}{n+1}\int_{\frac{k}{n+k+1}}^{\frac{k+1}{n+k+2}}f(u)du \end{equation*} where \begin{equation*}\label{MKZbasic} m_{n,k}(x)= \binom{n+k}{k} x ...
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Hyperbolic P ( Φ ) 2 -model on the Plane. [PDF]
Commun Math PhysOh T, Tolomeo L, Wang Y, Zheng G.
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Curvature on Graphs with Negative Edge Weights. [PDF]
IEEE Trans Netw Sci EngGrange D +6 more
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