In this talk, I will present a construction of symmetric informationally complete POVMs (SIC-POVMs), a special class of quantum measurements whose existence in all dimensions was conjectured by Zauner in 1999. Equivalently, these are maximal sets of d^2 equiangular lines in ℂ^d. Our approach introduces an explicit mathematical object, the ghost SIC, built from number-theoretic properties of a special modular function, and we show that it is Galois conjugateto an actual SIC. Assuming two conjectures—Stark’s conjecture from algebraic number theory and a special value identity for a modular function—we prove that our construction produces valid SICs in every dimension. To keep the talk accessible, I will also present a simplified special case of our construction that still implies Zauner’s conjecture. Additionally, I will introduce Zauner.jl, our free open-source software package, which we have used to verify results against known solutions and identify new SICs, including previously undiscovered examples in dimension 100. Time permitting, I will discuss higher-rank generalizations, called r-SICs, which reveal deep connections between SIC existence and abelian field extensions in algebraic number theory. This is joint work with Marcus Appleby and Gene Kopp, arXiv:2501.03970.
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