Does anyone know who formulated this conjecture related to Riemann's Zeta function?

Conjecture. The set $$\{ x : \exists y \space \space \zeta (x+iy) = 0\}$$ is dense in [0, 1].

In other words the conjecture states that the real parts of the nontrivial Zeta zeros are dense in [0, 1]. Some time ago I read about this conjecture in a review paper about Riemann's Zeta function but I cannot remember the name of the author. Other details/references appreciated.

Does anyone know who formulated this conjecture related to Riemann's zeta function?

Conjecture. The set $$\{ x : \exists y \space \space \zeta (x+iy) = 0\}$$ is dense in $[0, 1]$.

In other words the conjecture states that the real parts of the nontrivial Zeta zeros are dense in [0, 1]. Some time ago I read about this conjecture in a review paper about Riemann's Zeta function but I cannot remember the name of the author. Other details/references appreciated.