On the distribution of $\log |L(σ, χ)|$ and $\log L(σ, χ_D)$ in the modulus aspect

Abstract: Let $\chi$ be a primitive Dirichlet character whose conductor $q$ is a prime number. For the certain averages of values of $\log |L(s, \chi)|$ in $q$-aspect at a fixed $s=\sigma>1/2$, under Generalized Riemann Hypothesis (GRH), we explain it can be written as integrals involving the same density function ($M$-function) for the average of values of the difference between the logarithms of two symmetric power $L$-functions in the level aspect. For the distribution of values of $\log L(s, \chi_D)$ and $L'/L(s, \chi_D)$ in the $D$-aspect at a fixed $s=\sigma>1/2$ which $L(\sigma', \chi)\neq 0$ in $\sigma\leq \sigma' \leq 1$, where $\chi_D$ is a real character attached to a fundamental discriminant $D$, we construct a $M$-function unconditionally.