On closed sets with convex projections under somewhere dense sets of directions

Abstract. Dijkstra, Goodsell, and Wright have shown that if a nonconvex compactum in R n has the property that its projection onto all k-dimensional planes is convex, then the compactum contains a topological copy of the (k − 1)-sphere. This theorem was extended over the class of unbounded closed sets by Barov, Cobb, and Dijkstra. We show that the results in these two papers remain valid under the much weaker assumption that the collection of projection directions has a nonempty interior.

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“…In a forthcoming paper [2] we show that in Theorems 1, 18, and 19 the premise that P is open can be relaxed to the condition that P ⊂ int P.…”

Section: Theorem 19 Let B Be a Closed Convex Subset Of R N That Contmentioning

confidence: 97%

On closed sets with convex projections under narrow sets of directions

Barov

Dijkstra

2008

Trans. Amer. Math. Soc.

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“…We end this section with the proof of Theorem 4 for which we need the following results from [4,Lemma 11] Theorem 22. Let k ∈ N with k < dim V, let B be a convex and closed set in V, and let P be a subset of G k (V) such that P ⊂ int P. If C is a closed set that is a weak P-imitation of B, then E k (B, P) ⊂ C.…”

Section: Claim 1 the Lemma Is Valid Under The Additional Assumptionsmentioning

confidence: 99%

“…Subsequently, the authors have shown in [2] that if C is a closed and nonconvex set in the Hilbert space 2 such that the closures of S. Barov & J. J. Dijkstra the projections onto all k-hyperplanes (planes with codimension k) are convex and proper then C must contain a closed copy of 2 . Moreover, in [3,4] the authors show that the above result in [1] remains valid if we make much weaker assumption that the collection of projection directions that produce convex projections is somewhere dense.…”

Section: Introductionmentioning

confidence: 98%

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On Closed Sets in Hilbert Space With Convex Projections Under Somewhere Dense Sets of Directions

Barov

Dijkstra

2010

J. Topol. Anal.

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Let k be a fixed natural number. In an earlier paper the authors show that if C is a closed and nonconvex set in the Hilbert space ℓ2 such that the closures of the projections onto allk-hyperplanes (planes with codimension k) are convex and proper, then C must contain a closed copy of ℓ2. Here this theorem is strengthened significantly by making the much weaker assumption that the set of projection directions is somewhere dense. To show the sharpness of the main theorem we construct "minimal imitations" of closed convex sets in ℓ2. In addition, we show that closed convex sets with an empty geometric interior cannot be imitated by other closed sets.

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“…For example, given a topological space X and integers d > m 0, is there an embedding j : X → R d such that for each m-plane, the projection of j( X) onto it is convex? For this setting, see [8, Theorem 3; Example, p. 124], [10,3], and joint papers of S. Barov and J.J. Dijkstra (see [4] and references therein; also for the case of Hilbert space). 5) Many papers of the last decades are devoted to embeddings which have other very special properties relative to all m-dimensional affine planes and in particular, to all affine straight lines.…”

Section: Propositionmentioning

confidence: 99%