Congruence lattices of function lattices

Let L be a bounded distributive lattice. For k 1, let S k (L) be the lattice of k-ary functions on L with the congruence substitution property (Boolean functions); let S(L) be the lattice of all Boolean functions. The lattices that can arise as S k (L) or S(L) for some bounded distributive lattice L

Let L be a bounded lattice, let [a, b] and [c, d] be intervals of L, and let ϕ : [a, b] → [c, d] be an isomorphism between these two intervals. Let us consider the algebra L ← → ϕ = L; ∧, ∨, ϕ, ϕ -1 , which is a lattice with two partial unary operations. We construct a bounded lattice K (in fact, a

In 1983. Wille raised the question: Is elery complete lattice \(L\) isomorphic to the lattice of complete congruence relations of a suitable complete lattice K? In 1988 . this was answered in the affirmative by the first author. A number of papers have been published on this problem by Freese, Johns