# MathSciDoc: An Archive for Mathematician ∫

#### TBDmathscidoc:1701.332901

Arkiv for Matematik, 36, (2), 355-361, 1997.5
We construct a singular probability measure μ on the complex sphere such that the Poisson integral of μ is a pluriharmonic function in the ball and the Fourier transform of μ is $$\mathcal{O}(1/\sqrt p )$$ as$p$→∞.
@inproceedings{evgueni1997singular,
title={Singular measures with smal$H(p, q)$-projections},
author={Evgueni Doubtsov},
url={http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20170108203554214349710},
booktitle={Arkiv for Matematik},
volume={36},
number={2},
pages={355-361},
year={1997},
}

Evgueni Doubtsov. Singular measures with smal$H(p, q)$-projections. 1997. Vol. 36. In Arkiv for Matematik. pp.355-361. http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20170108203554214349710.