Uniform Finite Generation of Compact Lie Groups and universal quantum gates

Abstract

Consider a compact connected Lie group G and the corresponding Lie algebra L. Let \X1,...,Xm\ be a set of generators for the Lie algebra L. We prove that G is uniformly finitely generated by \X1,...,Xm\. This means that every element K ∈ G can be expressed as K=eXt1eXt2 · · · eXtl, where the indeterminates X are in the set \X1,...,Xm \, ti ∈ , i=1,...,l, and the number l is uniformly bounded. This extends a previous result by F. Lowenthal in that we do not require the connected one dimensional Lie subgroups corresponding to the Xi, i=1,...,m, to be compact. We discuss the consequence of this result to the question of universality of quantum gates in quantum computing.

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