On the Existence of Algebraic Equiangular Lines

Abstract

We consider real and complex equiangular lines, generated by unit vectors. We show that, for an arbitrary dimension d, if there exists a set of d2 equiangular unit vectors in Cd, then there must exist a set of d2 equiangular unit vectors with all of their coefficients in a number field. This result is motivated by the question of constructing SIC-POVMs in quantum physics and conjectures around them. We discuss applications of our techniques to the case of real equiangular lines and consequences of the above results.

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