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Fixed typo in title.

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edited Oct 4, 2017 at 19:56

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Does every convex polyhedron have a combinatorially isomorphic counterpart whose all faces all have rational areas?

mg.metric-geometry discrete-geometry convex-polytopes combinatorial-geometry polyhedra rational-points

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edited Nov 18, 2013 at 23:00

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mg.metric-geometry convex-polytopes combinatorial-geometry polyhedra convex-polytopes rational-points

fix grammar in the title

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edited May 5, 2013 at 1:24

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Does every convex polyhedron hashave a combinatorially isomorphic counterpart whose all faces have rational areas?

fix grammar

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edited May 4, 2013 at 23:22

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fixed grammar

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edited May 4, 2013 at 23:21

user5810

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Update: all polyhedra in question are in $\mathbb{R}^3$.

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edited May 4, 2013 at 23:20

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asked May 4, 2013 at 21:05

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