ϕd 2π are linearly independent over Q, then ⟨g⟩=T U(d) .Thengis said to be general, and X= diag(iϕ 1

ForU(d), if1, ϕ1 2π

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A Lie-algebraic Criterion for the Universality of Exponentiated Quantum Gates

quant-ph · 2026-04-28 · unverdicted · novelty 6.0

A Lie-algebraic criterion using Borel-de Siebenthal theory with incommensurate-spectrum generators yields a polynomial-time test for universality of exponentiated qudit gates and shows two generators are always sufficient.

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A Lie-algebraic Criterion for the Universality of Exponentiated Quantum Gates quant-ph · 2026-04-28 · unverdicted · none · ref 1
A Lie-algebraic criterion using Borel-de Siebenthal theory with incommensurate-spectrum generators yields a polynomial-time test for universality of exponentiated qudit gates and shows two generators are always sufficient.

ϕd 2π are linearly independent over Q, then ⟨g⟩=T U(d) .Thengis said to be general, and X= diag(iϕ 1

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