Linear Symmetries of the Unsquared Measurement Variety

Abstract

We introduce a new family of algebraic varieties, Ld,n, which we call the unsquared measurement varieties. This family is parameterized by a number of points n and a dimension d. These varieties arise naturally from problems in rigidity theory and distance geometry. In those applications, it can be useful to understand the group of linear automorphisms of Ld,n. Notably, a result of Regge implies that L2,4 has an unexpected linear automorphism. In this paper, we give a complete characterization of the linear automorphisms of Ld,n for all n and d. We show, that apart from L2,4 the unsquared measurement varieties have no unexpected automorphisms. Moreover, for L2,4 we characterize the full automorphism group.