Absolute retracts for finite distributive lattices and slim semimodular lattices

We describe the absolute retracts for the following classes of finite lattices: (1) slim semimodular lattices, (2) finite distributive lattices, and for each positive integer $n$, (3) at most $n$-dimensional finite distributive lattices. Although the singleton lattice is the only absolute retract for the first class, this result has paved the way to some other classes. For the second class, we prove that the absolute retracts are exactly the finite boolean lattices; this generalizes a 1979 result of J. Schmid. For the third class, the absolute retracts are the finite boolean lattices of dimension at most $n$ and the direct products of $n$ nontrivial finite chains. Also, we point out that in each of these classes, the algebraically closed lattices and the strongly algebraically closed lattices are the same as the absolute retracts. Slim (and necessarily planar) semimodular lattices were introduced by G. Gr\"atzer and E. Knapp in 2007, and they have been intensively studied since then. Algebraically closed and strongly algebraically closed lattices have been investigated by J. Schmid and, in several papers, by A. Molkhasi.