A class of explicit solutions for the Fermat problem for tetrahedra
Abstract
We present a class of explicit solutions for the problem of minimization of the function f(x,y,z)=Σi=14(x-xi)2+(y-yi)2+(z-zi)2, which gives the location of the unique stationary (Fermat-Torricelli) point for four non-collinear and non-coplanar points Ai=(xi,yi,zi), determining tetrahedra, which are derived by a proper class of isosceles tetrahedra having four equal edges and two equal opposite edges. This class of explicit solutions contains Mehlhos and Glastier's explicit solutions (theoretical constructions) obtained in Mehlhos:00 and Glastier:93, respectively.
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