Abstract
This paper is about cages for compact convex sets. A cage is the 1 -skeleton of a convex polytope in ℝ 3 . A cage is said to hold a set if the set cannot be continuously moved to a distant location, remaining congruent to itself and disjoint from the cage. In how many “truly different” positions can (compact 2 -dimensional) discs be held by a cage? We completely answer this question for all tetrahedra. Moreover, we present pentahedral cages holding discs in a large number ( 57 ) of positions.
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