On the perimeter, diameter and circumradius of ordinary hyperbolic reduced polygons
Abstract
A convex body R in the hyperbolic plane is reduced if any convex body K⊂ R has a smaller minimal width than R. We answer a few of Lassak's questions about ordinary reduced polygons regarding its perimeter, diameter and circumradius, and we also obtain a hyperbolic extension of a result of Fabi\'nska.
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