Large products of double cosets for symmetric subgroups
Abstract
We consider the problem of classifying pairs x,y ∈ G such that K x K y K = G where G is a simple compact connected Lie group and K is a symmetric subgroup. We give a necessary condition on x,y for all simply connected G, and a complete classification when G = SU(n) and any symmetric K ⊂eq G except the type AIII case K S(U(p) × U(n-p)) with p ≠ n/2. We also present some applications of these results to gate decompositions in quantum computing.
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