Titlebook: Innovative Algorithms and Analysis; Laurent Gosse,Roberto Natalini Book 2017 Springer International Publishing AG 2017 Numerial analysis o

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,Viscous Equations Treated with ,-Splines and Steklov-Poincaré Operator in Two Dimensions,ic equations, first in 1D, then in 2D on Cartesian computational grids. The construction heavily relies on a particular type of piecewise-smooth interpolation of discrete data known as .-splines. In 1D, several types of widely-used discretizations are recovered as particular cases, like the El-Misti

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Filtered Gradient Algorithms for Inverse Design Problems of One-Dimensional Burgers Equation,n issues. In particular, we prove that, as soon as the target function (usually a N-wave) isn’t continuous, there is a whole convex set of possible initial data, the backward entropy solution being possibly its centroid. Further, an iterative strategy based on a gradient algorithm involving “reversi

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Convergent Lagrangian Discretization for Drift-Diffusion with Nonlocal Aggregation,zed. In comparison to related works by the first author and Osberger (ESAIM Math Model Numer Anal 48:697–726, 2014; Found Comput Math 1–54, 2015) on Lagrangian schemes for drift-diffusion equations, convergence is proven directly on the level on the Lagrangian maps, without passage through the densi

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Cleopatra Christoforouren Wachstumsform durch die Korngrenze bestimmt ist (allotriomorphe Kristalle), von den Korngrenzen ausgehende Ferritnadeln [6], im Korninnern gebildete Ferritnadeln und Kristalle, deren geometrische Form durch die Kristallstruktur hervorgerufen ist (ideomorphe Kristalle), sowie massiven Ferrit, der

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Laurent Gosseren Wachstumsform durch die Korngrenze bestimmt ist (allotriomorphe Kristalle), von den Korngrenzen ausgehende Ferritnadeln [6], im Korninnern gebildete Ferritnadeln und Kristalle, deren geometrische Form durch die Kristallstruktur hervorgerufen ist (ideomorphe Kristalle), sowie massiven Ferrit, der