1. Let $G$ be a finite group of order $n$. I need an estimate for the number $c$ of conjugacy classes of subgroups $D\subseteq G$.
Note that any subgroup of $G$ contains $1_G$, and so the set of all subgroups of $G$ is contained in the set of all subsets of $G$ containing $1_G$; this set of subsets has cardinality $2^{n-1}$. We obtain that $$ c\le 2^{n-1}.$$
Question 1. What are better estimates of $c$ in terms of $n$?
In Question 1, when counting the conjugacy classes of subgroups, I don't want to count the conjugacy class of a cyclic subgroup that is contained in a strictly larger cyclic subgroup. This is related to the Chebotarev density theorem; see Question 2.
2. In my application, $G={\rm Gal}(L/K)$, the Galois group of a finite Galois extension of global fields $L/K$. Then $G$ acts on $L$ and on the set of places of $L$. For any place $w$ of $L$, consider the decomposition group $D_w$, that is, the stabilizer of $w$ in $G$. We say that $D_w$ is a maximal decomposition group if it is not contained in a strictly larger decomposition group. Let $m$ denote the cardinality of the set of conjugacy classes of maximal decomposition groups. Clearly, we have $$m\le c\le 2^{n-1}.$$
Question 2. What are better estimates of $m$ in terms of $n$?
