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Displaying 61 – 80 of 80

Tangent cones, starshape and convexity.

Borwein, J.M. (1978)

International Journal of Mathematics and Mathematical Sciences

Topology and geometry of nontrivial rank-one convex hulls for two-by-two matrices

Carl-Friedrich Kreiner, Johannes Zimmer (2006)

ESAIM: Control, Optimisation and Calculus of Variations

Continuing earlier work by Székelyhidi, we describe the topological and geometric structure of so-called T4-configurations which are the most prominent examples of nontrivial rank-one convex hulls. It turns out that the structure of T4-configurations in $ℝ^{2 \times 2}$ is very rich; in particular, their collection is open as a subset of ${(ℝ^{2 \times 2})}^{4}$ . Moreover a previously purely algebraic criterion is given a geometric interpretation. As a consequence, we sketch an improved algorithm to detect T4-configurations. ...

Currently displaying 61 – 80 of 80

Previous Page 4

Displaying 61 – 80 of 80

Tangent cones, starshape and convexity.

Topology and geometry of nontrivial rank-one convex hulls for two-by-two matrices

Tropical convexity.

Typical starshaped sets.

Über die Erzeugung konvexer Polygone in der projektiven Ebene

Über kennzeichnende Eigenschaften von euklidischen Räumen und Ellipsoiden. II.

Über kennzeichnende Eigenschaften von euklidischen Räumen und Ellipsoiden. I.

Über (m/n)-Orbiformen und ihre Durchmesser

View-Obstruction Problems

Visibility and Intersection Problems in Plane Geometry.

Visibility cells and $T$ -convexity spaces

Visible shorelines in Rd.

Weitere NP-schwere Probleme für minimale Polygonüberdeckungen

Zur Affinoberfläche konvexer Körper.

Глобально и локально выпуклые многогранники.

Локальная d-выпуклость и d-звездные множества

Об однозначной восстановимости выпуклых и обозримых компактов по их проекциям

Одна теорема о d-звездных множествах

Отображения, сохраняющие объем

Оценки объема области в римановом пространстве

Currently displaying 61 – 80 of 80