Given $\mathsf{c\geq1}$, what is the probability that if you choose $\mathsf{A,B,\alpha\in\Bbb N}$ such that $\mathsf{A,B<\alpha<AB}$ holds we will have both $$\mathsf{gcd(A,B)=1}$$$$\mathsf{(AB)^{-1}\bmod\alpha<\log^c\alpha}\mbox{ or }\mathsf{(A^{-1}B)\bmod\alpha<\log^c\alpha}$$ satisfied?
Condition $\mathsf{gcd(A,B)=1}$ has probability $\frac{6}{\pi^2}$ asymptotically.
What is the probability if $\mathsf{A,B<\alpha<AB}$ is not enforced?
I assume that you choose $(A,\alpha)=(B, \alpha)=1$, for otherwise the inverses don't exist.
As $A, B$ run over all integers $\leq\alpha$ which are coprime to $\alpha$, $(AB)^{-1}$ attains each residues coprime to $\alpha$ with equal frequency. Hence the probability for the event $(AB)^{-1}\bmod\alpha< N$ equals $$ \frac{1}{\varphi(\alpha)}|\{n\leq N:(n, \alpha)=1\} \leq \frac{N\alpha}{\varphi(\alpha)}\ll \frac{N\log\log\alpha}{\alpha}, $$ and similarly for $A^{-1}B\bmod{\alpha}$.
The difference between "two residues chosen at random" and "two residues satisfying $\alpha<AB$" is $\ll\frac{\log\alpha}{\alpha}$. Whether this matters or not depends on the precision you are aiming at.
