Synthetic Geometry in Hyperbolic Simplices
Abstract
Let τ be an n-simplex and let g be a metric on τ with constant curvature . The lengths that g assigns to the edges of τ, along with the value of , uniquely determine all of the geometry of (τ, g). In this paper we focus on hyperbolic simplices ( = -1) and develop geometric formulas which rely only on the edge lengths of τ. Our main results are distance and projection formulas in hyperbolic simplices, as well as a projection formula in Euclidean simplices. We also provide analogous formulas in simplices with arbitrary constant curvature .
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