Throughout all posets will be finite.
Let $P$ be a poset, and let $\mathcal{A}(P)$ denote the set of antichains of $P$. We give $\mathcal{A}(P)$ a partial order whereby $A \leq A'$ iff for all $x \in A$ there exists $y\in A'$ such that $x\leq y$. It's easy to see that $\mathcal{A}(P)$ is isomorphic to the distributive lattice of order ideals of $P$ via the map that associates an antichain to the order ideal it generates. Hence by Birkhoff's Fundamental Theorem of (Finite) Distributive Lattices, all (finite) distributive lattices arise as $\mathcal{A}(P)$ in this way.
Now for $k\in\mathbb{N}$, let $\mathcal{A}_k(P) := \{A \in\mathcal{A}(P)\colon \#A=k\}\subseteq \mathcal{A}(P)$, with its induced poset structure.
Note that $\mathcal{A}_1(P)\simeq P$; hence $\{\mathcal{A}_1(P)\colon \textrm{$P$ a poset}\}=\{\textrm{all posets $P$}\}$. Even more trivially we have $\{\mathcal{A}_0(P)\colon \textrm{$P$ a poset}\}=\{\textrm{the $1$ element poset}\}$.
On the other hand, let $m_P:=\mathrm{max}\{m\colon m=\#A \textrm{ for some $A\in\mathcal{A}(P)$}\}$. Then $\mathcal{A}_{m_P}(P)$ is always a distributive lattice, and in fact $\{\mathcal{A}_{m_P}(P)\colon \textrm{$P$ a poset}\}=\{\textrm{all (finite) distributive lattices $L$}\}$ (see the references in my previous MO question Map on class of all finite posets coming from maximal sized antichains).
Question: What is known about which classes of posets arise as $\mathcal{A}_k(P)$ for other values of $k$? For instance, $\mathcal{A}_2(P)$ or $\mathcal{A}_{m_P-1}(P)$?
One could consider even a more general setup.
Namely, for $S\subseteq \mathbb{N}$, we could let $\mathcal{A}_S(P) := \{A \in\mathcal{A}(P)\colon \#A\in S\} \subseteq \mathcal{A}(P)$, and then ask about which posets arise as $\mathcal{A}_S(P)$ for various subsets $S$. For example, posets of the form $\mathcal{A}_{\{0,1,\ldots,m_P\}}(P)=\mathcal{A}(P)$ are exactly the (finite) distributive lattices by Birkhoff's theorem.
