On the Lazarev-Lieb Extension of the Hobby-Rice Theorem
Abstract
O. Lazarev and E. H. Lieb proved that given f1,...,fn∈ L1([0,1];C), there exists a smooth function that takes values on the unit circle and annihilates span\f1,...,fn. We give an alternative proof of that fact that also shows the W1,1 norm of can be bounded by 5π n+1. Answering a question raised by Lazarev and Lieb, we show that if p>1 then there is no bound for the W1,p norm of any such multiplier in terms of the norms of f1,...,fn.
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