This isn't a full answer, but too long for a comment. I suppose it comes closest to trying to answer Question 3 or the general question of whether the hypercube design can be improved.
**Definition** Given a hypergraph $G=(\{v_1, \dots, v_n\}, E)$, the *dual* of $G$ is the hypergraph $H$ with $V(H)=E(G)$ and $E(H)=\{\{e\in E(G): v_i\in e\}: i\in [k]\}$ (in other words, each edge of $H$ is a maximal collection of edges from $G$ which are incident with a single vertex).
Let $H_{n,k}$ be the dual of $K_n^{k}$, the complete $k$-regular hypergraph on $n$ vertices. Note that the dual of $H_{n,k}$ is isomorphic to $K_n^k$.
(It seems to me that this hypergraph must have been studied before, but I couldn't find any reference to it. One possible lead is that $H_{4,2}$ is what you call the *complete quadrilateral*.)
**Claim 1.**
$H_{n,k}$ is a $\binom{n-1}{k-1}$-uniform $k$-regular hypergraph with $\binom{n}{k}$ vertices and $n$ edges.
*Proof.* In $K_n^k$, every vertex is incident with $\binom{n-1}{k-1}$ edges, every edge has order $k$, there are $\binom{n}{k}$ edges, and $n$ vertices.$\square$
**Claim 2.** $H_{n,k}$ is a pooling design.
*Proof.*
Every vertex in $H_{n,k}$ is incident with $k$ edges, so $|x^*|=k$. If $X$ is a set of vertices with $|X|>1$ (which corresponds to a set of more than one edge in $K_n^k$, which spans more than $k$ vertices in $K_n^k$) then $|X^*|>k$. So $x^*\neq X^*$ if $|X|>1$.$\square$
The compression rate of $H_{n,k}$ is $\frac{n}{\binom{n}{k}}$ which is minimized when $k=\lfloor{n/2}\rfloor$. Also note that ratio of the uniformity to the number of vertices is $\binom{n-1}{k-1}/\binom{n}{k}=k/n$. So there is a tradeoff
when minimizing the compression rate, since the uniformity and degree increase when we increase $k$.
Some more examples: $H_{5,2}$ is 4-uniform with 10 vertices and 5 edges giving a compression ratio of $1/2$. $H_{6,3}$ is 10-uniform with 20 vertices and 6 edges, giving a compression ratio of $3/10$. $H_{7,3}$ is 15-uniform with 35 vertices and 7 edges, giving a compression ratio of $1/5$. Note that the hypercube design with $D=3$ is 9-regular with 27 vertices and 9 edges and thus a compression ratio of 1/3, so $H_{6,3}$ and $H_{7,3}$ compare favorably in this case.