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The aim of this paper is to investigate the stability of the positive part of the unit ball in Orlicz spaces, endowed with the Luxemburg norm. The convex set $Q$ in a topological vector space is stable if the midpoint map $Φ : Q \times Q \to Q$ , $Φ (x, y) = (x + y) / 2$ is open with respect to the inherited topology in $Q$ . The main theorem is established: In the Orlicz space $L^{ϕ} (μ)$ the stability of the positive part of the unit ball is equivalent to the stability of the unit ball.

Stability of Supporting and Exposing Elements of Convex Sets in Banach Spaces

Azé, D., Lucchetti, R. (1996)

Serdica Mathematical Journal

* This work was supported by the CNR while the author was visiting the University of Milan.To a convex set in a Banach space we associate a convex function (the separating function), whose subdifferential provides useful information on the nature of the supporting and exposed points of the convex set. These points are shown to be also connected to the solutions of a minimization problem involving the separating function. We investigate some relevant properties of this function and of its conjugate...

Stability of the Steiner symmetrization of convex sets

Marco Barchiesi, Filippo Cagnetti, Nicola Fusco (2013)

Journal of the European Mathematical Society

The isoperimetric inequality for Steiner symmetrization of any codimension is investigated and the equality cases are characterized. Moreover, a quantitative version of this inequality is proven for convex sets.

Stability Properties of Cauchy's Surface Area Formula.

H. Groemer (1991)

Monatshefte für Mathematik

Staircase Kernels for Orthogonal d-Polytopes.

Marilyn Breen (1996)

Monatshefte für Mathematik

Staircases in $ℤ^{2}$ .

Breuer, Felix, von Heymann, Frederik (2010)

Integers

Star polytopes and the Schläfli function f(..., ..., ...).

H.S.M. Coxeter (1989)

Elemente der Mathematik

Star shaped coincidence sets in the obstacle problem

Shigeru Sakaguchi (1984)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

Starre, kippende, wackelige und bewegliche Gelenkvierecke im Raum.

W. Wunderlich (1971)

Elemente der Mathematik

Starshapedness in convexity spaces

Krzysztof Kołodziejczyk (1985)

Compositio Mathematica

Steiner Minimal Trees on Sets of Four Points.

D.Z. Du, F.K. Hwang, G.D. Song, G.Y Ting (1987)

Discrete & computational geometry

Steinhaus chessboard theorem

Władysław Kulpa, Lesƚaw Socha, Marian Turzański (2000)

Acta Universitatis Carolinae. Mathematica et Physica

Stellar Subdivisions of Boundary Complexes of Convex Polytopes.

G. Ewald, G.C. Shephard (1974)

Mathematische Annalen

Stereology of dihedral angles

Vratislav Horálek (2000)

Applications of Mathematics

The paper presents a short survey of stereological problems concerning dihedral angles, their solutions and applications, and introduces a graph for determining the distribution functions of planar angles under the hypothesis that dihedral angles in $ℝ^{3}$ are of the same size and create a random field.

Stereology of grain boundary precipitates

Vratislav Horálek (1989)

Aplikace matematiky

Precipitates modelled by rotary symmetrical lens-shaped discs are situated on matrix grain boundaries and the homogeneous specimen is intersected by a plate section. The stereological model presented enables one to express all basic parameters of spatial structure and moments of the corresponding probability distributions of quantitative characteristics of precipitates in terms of planar structure parameters the values of which can be estimated from measurements carried out in the plane section....

Stetigkeitsaussagen zur Diskussion des Schnittverhaltens einer Ovalenschar mit einem Oval

L. STAMMLEB, Ü. MATTE (1980)

Beiträge zur Algebra und Geometrie = Contributions to algebra and geometry

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