A volume formula for \(\mathbb Z_2\)-symmetric spherical tetrahedra
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Publication:642051
DOI10.1134/S0037446611030086zbMath1232.52012MaRDI QIDQ642051
M. G. Pashkevich, Alexander Kolpakov, Alexander Mednykh
Publication date: 25 October 2011
Published in: Siberian Mathematical Journal (Search for Journal in Brave)
Three-dimensional polytopes (52B10) Polyhedra and polytopes; regular figures, division of spaces (51M20) Length, area, volume and convex sets (aspects of convex geometry) (52A38) Length, area and volume in real or complex geometry (51M25)
Related Items (2)
On the area of a trihedral on a hyperbolic plane of positive curvature ⋮ Normality tests for very small sample sizes
Cites Work
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- On a problem of Fenchel
- The volume of the Lambert cube in spherical space
- On the volume of a hyberbolic and spherical tetrahedron
- On the volume of a spherical octahedron with symmetries
- On the volume of hyperbolic polyhedra
- The volume as a metric invariant of polyhedra
- On the volume formula for hyperbolic tetrahedra
- On hyperbolic polyhedra arising as convex cores of quasi-Fuchsian punctured torus groups
- A formula for the volume of a hyperbolic tetrahedon
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