Universality for L-functions in the Selberg class

@article{Nagoshi2010UniversalityFL,
  title={Universality for L-functions in the Selberg class},
  author={Hirofumi Nagoshi and J{\"o}rn Steuding},
  journal={Lithuanian Mathematical Journal},
  year={2010},
  volume={50},
  pages={293-311}
}
We prove universality for L-functions $ \mathcal{L} $ from the Selberg class satisfying some mild condition on the Dirichlet coefficients (which might be considered as a prime number theorem for $ \mathcal{L} $). This generalizes a previous universality theorem by the second author, where the L-function was assumed to have a polynomial Euler product satisfying the Ramanujan hypothesis.