Simplices with fixed volumes of codimension 2 faces in a continuous deformation
Abstract
For any n-dimensional simplex in the Euclidean space Rn with n 4, it is asked that if a continuous deformation preserves the volumes of all the codimension 2 faces, then is it necessarily a rigid motion. While the question remains open and the general belief is that the answer is affirmative, for all n 4, we provide counterexamples to a variant of the question where Rn is replaced by a pseudo-Euclidean space Rp,n-p for some unspecified p 2.
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