Self-approximation of Dirichlet L-functions

Let $d$ be a real number, let $s$ be in a fixed compact set of the strip $1/2<\sigma<1$, and let $L(s, \chi)$ be the Dirichlet $L$-function. The hypothesis is that for any real number $d$ there exist 'many' real numbers $\tau$ such that the shifts $L(s+i\tau, \chi)$ and $L(s+id\tau, \chi)$ are 'near' each other. If $d$ is an algebraic irrational number then this was obtained by T. Nakamura. Ł. Pańkowski solved the case then $d$ is a transcendental number. We prove the case then $d\ne0$ is a rational number. If $d=0$ then by B. Bagchi we know that the above hypothesis is equivalent to the Riemann hypothesis for the given Dirichlet $L$-function. We also consider a more general version of the above problem.