**Does there exist a free and discrete subgroup $\Gamma < SL_2(\mathbb{R}) \times SL_2(\mathbb{R})$ such that neither $\pi_1(\Gamma)$ nor $\pi_2(\Gamma)$ is free and discrete (where, as you may guess, $\pi_{1,2}: SL_2(\mathbb{R}) \times SL_2(\mathbb{R}) \to SL_2(\mathbb{R})$ denote the canonical projections onto each of the factors)?**

First, let me say a word about where this is coming from. There is the following long-standing problem, which has been haunting me for years: *for which values of $\lambda$ is the group $\Gamma_\lambda$ generated by $(\begin{smallmatrix} 1 & \lambda \\ 0 & 1 \end{smallmatrix})$ and $(\begin{smallmatrix} 1 & 0 \\ 1 & 1 \end{smallmatrix})$ free?* It has been originally asked for rational values of $\lambda$.

A natural approach to try to answer it is to then use the fact that such a group $\Gamma_\lambda$ has a discrete embedding into the product of $SL_2(\mathbb{R})$ with all of the $SL_2(\mathbb{Q}_p)$'s for which $p$ divides the denominator of $\lambda$.

This product seems however quite hard to study. It might be easier to first study the case where $\lambda$ is an algebraic integer (say quadratic), in which case $\Gamma_\lambda$ "merely" embeds into $SL_2(\mathbb{R}) \times SL_2(\mathbb{R})$. (If nothing else, real numbers are, at least, more familiar than $p$-adics...) Of course if one of its projections is Schottky (which happens iff either $\lambda$ or its conjugate has absolute value $\geq 4$), then $\Gamma_\lambda$ is automatically Schottky. But now suppose that neither of the projections is Schottky. Then can we conclude anything at all?

Also, a remark: if you drop the "free" assumption, then an example is very easy to produce. Just take $SL_2(\mathbb{Z}[\sqrt{2}])$, with its embedding into $SL_2(\mathbb{R}) \times SL_2(\mathbb{R})$ given by the two embeddings of $\mathbb{Z}[\sqrt{2}]$ into $\mathbb{R}$. It is discrete (but not free), but both of its projections are dense.