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In this paper we show that a linear variational inequality over an infinite dimensional real Hilbert space admits solutions for every nonempty bounded closed and convex set, if and only if the linear operator involved in the variational inequality is pseudo-monotone in the sense of Brezis.

A converse to the Lions-Stampacchia Theorem

Emil Ernst, Michel Théra (2008)

ESAIM: Control, Optimisation and Calculus of Variations

A convex polygon as a discrete plane curve.

Góźdź, Stanisław (1999)

Balkan Journal of Geometry and its Applications (BJGA)

A correction to my paper:"Some topological extensions of plane geometry"

Harold Bell (1976)

Revista colombiana de matematicas

A Criterion for the Affine Equivalence of Cell Complexes in Rd and Convex Polyhedra in Rd+1 .

F. Aurenhammer (1987)

Discrete & computational geometry

A criterion for unimodality.

Boros, George, Moll, Victor H. (1999)

The Electronic Journal of Combinatorics [electronic only]

A. D. Alexandrov's uniqueness theorem for convex polytopes and its refinements.

Panina, Gaiane (2008)

Beiträge zur Algebra und Geometrie

A Decomposition of 2-Weak Vertex-Packing Polytopes.

E. Steingrimsson (1994)

Discrete & computational geometry

A Decomposition of Measures in Euclidean Space Yielding Error Bounds for Quadrature Formulas.

Erich Novak (1987)

Mathematische Zeitschrift

A differential inclusion : the case of an isotropic set

Gisella Croce (2005)

ESAIM: Control, Optimisation and Calculus of Variations

In this article we are interested in the following problem: to find a map $u : Ω \to ℝ^{2}$ that satisfies $\{\begin{matrix} D u \in E & a.e. in Ω \\ u (x) = ϕ (x) & x \in \partial Ω \end{matrix}$ where $Ω$ is an open set of $ℝ^{2}$ and $E$ is a compact isotropic set of $ℝ^{2 \times 2}$ . We will show an existence theorem under suitable hypotheses on $ϕ$ .

A differential inclusion: the case of an isotropic set

Gisella Croce (2010)

ESAIM: Control, Optimisation and Calculus of Variations

In this article we are interested in the following problem: to find a map $u : Ω \to ℝ^{2}$ that satisfies $\{\begin{matrix} D u \in E & a.e. in Ω \\ u (x) = ϕ (x) & x \in \partial Ω \end{matrix}$ where Ω is an open set of $ℝ^{2}$ and E is a compact isotropic set of $ℝ^{2 \times 2}$ . We will show an existence theorem under suitable hypotheses on φ.

A discrete version of the Brunn-Minkowski inequality and its stability

Michel Bonnefont (2009)

Annales mathématiques Blaise Pascal

In the first part of the paper, we define an approximated Brunn-Minkowski inequality which generalizes the classical one for metric measure spaces. Our new definition, based only on properties of the distance, allows also us to deal with discrete metric measure spaces. Then we show the stability of our new inequality under convergence of metric measure spaces. This result gives as corollary the stability of the classical Brunn-Minkowski inequality for geodesic spaces. The proof of this stability...

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