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# Analogues of Horn’s theorem for finite unions of starshaped sets in ℝ d

Periodica Mathematica Hungarica
Author: Marilyn Breen

## Abstract

Fix k, d, 1 ≤ kd + 1. Let

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be a nonempty, finite family of closed sets in ℝd, and let L be a (dk + 1)-dimensional flat in ℝd. The following results hold for the set T ≡ ∪{F: F in
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}. Assume that, for every k (not necessarily distinct) members F 1, …, F k of
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,∪{F i: 1 ≤ ik} is starshaped and the corresponding kernel contains a translate of L. Then T is starshaped, and its kernel also contains a translate of L. Assume that, for every k (not necessarily distinct) members F 1, …, F k of
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,∪{F i: 1 ≤ ik} is starshaped and there is a translate of L meeting each set ker F i, 1 ≤ ik − 1. Then there is a translate L 0 of L such that every point of T sees via T some point of L 0. If k = 2 or d = 2, improved results hold.

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# Generating the kernel of a staircase starshaped set from certain staircase convex subsets

Periodica Mathematica Hungarica
Author: Marilyn Breen

## Abstract

Let S be an orthogonal polygon in the plane. Assume that S is starshaped via staircase paths, and let K be any component of Ker S, the staircase kernel of S, where KS. For every x in S\K, define W K(x) = {s: s lies on some staircase path in S from x to a point of K}. There is a minimal (finite) collection W(K) of W K(x) sets whose union is S. Further, each set W K(x) may be associated with a finite family U K(x) of staircase convex subsets, each containing x and K, with ∪{U: U in U K(x)} = W K(x). If W(K) = {W K(x 1), ..., W K(x n)}, then KV K ≡ ∩{U: U in some family U K(x i), 1 ≤ in} ⊆ Ker S. It follows that each set V K is staircase convex and ∪{V k: K a component of Ker S} = Ker S. Finally, if S is simply connected, then Ker S has exactly one component K, each set W K(x i) is staircase convex, 1 ≤ in, and ∩{W k(x i): 1 ≤ i ≤ n} = Ker S.

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Studia Scientiarum Mathematicarum Hungarica
Authors: Pal Fischer and Zbigniew Slodkowski

. , Mean Value Inequalities for Convex and Starshaped Sets, Aequationes Mathematicae , Vol. 70(3) (2005), 213–224. MR 2007c :52008 Slodkowski Z. Mean Value Inequalities for

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# Reverse triangle inequality. Antinorms and semi-antinorms

Studia Scientiarum Mathematicarum Hungarica
Authors: Maria Moszyńska and Wolf-Dieter Richter

Martini, H. and Wencel, W. , An analogue of the Krein-Milman theorem for starshaped sets, Beitr. Algebra Geom. , 44 (2003), 441–449. Wencel W. An analogue of the Krein

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