Automorphic Representations and Quantum Logic Gates

Abstract: Any construction of a quantum computer requires finding a good set of universal quantum logic gates: abstractly, a finite set of matrices in U(2^n) such that short products of them can efficiently approximate arbitrary unitary transformations. The 2-qubit case n=2 is of particular practical interest. I will present the first construction of an optimal, so-called "golden" set of 2-qubit gates.

The modern theory of automorphic representations on unitary groups---in particular, the endoscopic classification and higher-rank versions of the Ramanujan bound---will play a crucial role in proving the necessary analytic estimates.

algebraic geometrynumber theory

Audience: researchers in the topic

Boston University Number Theory Seminar