Rigidity and volume preserving deformation on degenerate simplices

Abstract

Given a degenerate (n+1)-simplex in a d-dimensional space Md (Euclidean, spherical or hyperbolic space, and d≥ n), for each k, 1≤ k≤ n, Radon's theorem induces a partition of the set of k-faces into two subsets. We prove that if the vertices of the simplex vary smoothly in Md for d=n, and the volumes of k-faces in one subset are constrained only to decrease while in the other subset only to increase, then any sufficiently small motion must preserve the volumes of all k-faces; and this property still holds in Md for d≥ n+1 if an invariant ck-1(αk-1) of the degenerate simplex has the desired sign. This answers a question posed by the author, and the proof relies on an invariant ck(ω) we discovered for any k-stress ω on a cell complex in Md. We introduce a characteristic polynomial of the degenerate simplex by defining f(x)=Σi=0n+1(-1)ici(αi)xn+1-i, and prove that the roots of f(x) are real for the Euclidean case. Some evidence suggests the same conjecture for the hyperbolic case.

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