Suppose I have $n>2$ firms selling differentiated products. These firms form a cartel for the price. The cartel has size $n_c$. Let $\pi_{i,m}$ be the payoff of a firm $i$ outside the cartel and $\pi_{j,c}$ be the payoff of a firm $j$ inside the cartel.
I would like to know whether there exists a set of assumptions (a reference to a paper in the literature describing that set of assumptions and relative proofs is sufficient) under which
For any firm $j$ outside the cartel:
(i) entering the cartel is weakly convenient in terms of profits for any $n_c$, i.e. $\pi_{j,m}(n_c-1)\leq \pi_{j,c}(n_c)$ $\forall n_c$
(ii) the higher is $n_c$ the higher is the profit increase from entering the cartel for any $n_c$, i.e. $\pi_{j,c}(n_c)-\pi_{j,m}(n_c-1)\leq \pi_{j,c}(n_c+1)-\pi_{j,m}(n_c)$ $\forall n_c$
For any firm $i$ inside the cartel:
(i) the profit is increasing in $n_c$, i.e. $\pi_{i,c}(n_c-1)\leq \pi_{i,c}(n_c)$ $\forall n_c$
(ii) the higher is $n_c$ the higher is the profit increase from letting someone else entering the cartel, i.e. $\pi_{i,c}(n_c)-\pi_{i,c}(n_c-1)\leq \pi_{i,c}(n_c+1)-\pi_{i,c}(n_c)$ $\forall n_c$
All inequalities could hold also strictly.
