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Order-semi-primal lattices
(1994)
A nonequilibrium situation governed by kinetic equations with strongly contrasted Knudsen numbers in different subdomains is discussed. We consider a domain decomposition problem for Boltzmann- and Euler equations, establish the correct coupling conditions and prove the validity of the obtained coupled solution . Moreover numerical examples comparing different types of coupling conditions are presented.
Let (\(a_i)_{i\in \bf{N}}\) be a sequence of identically and independently distributed random vectors drawn from the \(d\)-dimensional unit ball \(B^d\)and let \(X_n\):= convhull \((a_1,\dots,a_n\)) be the random polytope generated by \((a_1,\dots\,a_n)\). Furthermore, let \(\Delta (X_n)\) : = (Vol \(B^d\) \ \(X_n\)) be the deviation of the polytope's volume from the volume of the ball. For uniformly distributed \(a_i\) and \(d\ge2\), we prove that tbe limiting distribution of \(\frac{\Delta (X_n)} {E(\Delta (X_n))}\) for \(n\to\infty\) satisfies a 0-1-law. Especially, we provide precise information about the asymptotic behaviour of the variance of \(\Delta (X_n\)). We deliver analogous results for spherically symmetric distributions in \(B^d\) with regularly varying tail.
Free Form Volumes
(1994)
Die dreidimensionale Darstellung hybrider Datensätze hat sich in den letzten Jahren als
ein wichtiger Teilbereich der wissenschaftlichen Visualisierung etabliert. Hybride Datensätze enthalten sowohl diskrete Volumendaten als auch durch geometrische Primitive
definierte Objekte. Bei der visuellen Verarbeitung einer gegebenen Szene spielen Schatteninformationen eine wichtige Rolle, indem sie die Beziehungen von Objekten untereinander verständlich machen. Wir beschreiben ein einfaches Verfahren zur Berechnung von Schatteninformation, das in ein bestehendes System zur Visualisierung hybrider Datensätze integriert wurde. An einem Beispiel aus der klinischen Anwendung werden die Ergebnisse illustriert.
This report presents a generalization of tensor-product B-spline surfaces. The new scheme permits knots whose endpoints lie in the interior of the domain rectangle of a surface. This allows local refinement of the knot structure for approximation purposes as well as modeling surfaces with local tangent or curvature discontinuities. The surfaces are represented in terms of B-spline basis functions, ensuring affine invariance, local control, the convex hull property, and evaluation by de Boor's algorithm. A dimension formula for a class of generalized tensor-product spline spaces is developed.