Johan Andersson's homepage
Research
 Some of my recent research is related to new estimates for the Riemann zetafunction on the line Re(s)=1 and some explicit results on a problem of Ramachandra. New preprints should come shortly.
 Other recent results involve new variants of Lavrentiev's and Mergelyan's theorem with applications on Voronin Universality.

I have worked the on Hurwitz and Lerch zetafunction, and the spectral theory of automorphic forms.
 I some results on the Turan Power sum method, that by a new paper of Bourgain, Dilworth, Ford, Konyagin and Kutzarova has found applications on the explicit construction of RIPmatrices (useful for compressed sensing),
 My most exciting recent results are related to Universality of the multiple Hurwitz zetafunction in n complex variables. Stay tuned ...
Some of my papers can be found on the at arXiv . My PhD Thesis is available from divaportal .
Teaching
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