A Lyapunov type theorem from Kadison-Singer
Abstract
Marcus, Spielman, and Srivastava recently solved the Kadison-Singer problem by showing that if u1, ..., um are column vectors in Cd such that Σ uiui* = I, then a set of indices S ⊂eq 1, ..., m can be chosen so that Σi ∈ S uiui* is approximately (1/2)I, with the approximation good in operator norm to order ε1/2 where ε = \|ui\|2. We extend their result to show that every linear combination of the matrices uiui* with coefficients in [0,1] can be approximated in operator norm to order ε1/8 by a matrix of the form Σi ∈ S uiui*.
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