Isometric embedding of a weighted Fermat-Frechet multitree for isoperimetric deformations of the boundary of a simplex to a Frechet multisimplex in the K-Space

Abstract

In this paper, we study the weighted Fermat-Frechet problem for a N (N+1)2-tuple of positive real numbers determining N-simplexes in the N dimensional K-Space (N-dimensional Euclidean space RN if K=0, the N-dimensional open hemisphere of radius 1K (S1KN) if K >0 and the Lobachevsky space HKN of constant curvature K if K<0). The (weighted) Fermat-Frechet problem is a new generalization of the (weighted) Fermat problem for N-simplexes. We control the number of solutions (weighted Fermat trees) with respect to the weighted Fermat-Frechet problem that we call a weighted Fermat-Frechet multitree, by using some conditions for the edge lengths discovered by Dekster-Wilker. In order to construct an isometric immersion of a weighted Fermat-Frechet multitree in the K- Space, we use the isometric immersion of Godel-Schoenberg for N-simplexes in the N-sphere and the isometric immersion of Gromov (up to an additive constant) for weighted Fermat (Steiner) trees in the N-hyperbolic space HKN. Finally, we create a new variational method, which differs from Schafli's, Luo's and Milnor's techniques to differentiate the length of a geodesic arc with respect to a variable geodesic arc, in the 3K-Space. By applying this method, we eliminate one variable geodesic arc from a system of equations, which give the weighted Fermat-Frechet solution for a sextuple of edge lengths determining (Frechet) tetrahedra.