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Isoform lattices

Let $L$ be a lattice. We call a congruence relation $\gQ$ of $L$ isoform, if any two congruence classes of $\gQ$ are isomorphic (as lattices). Let us call the lattice $L$ isoform, if all congruences of $L$ are isoform. G. Grätzer and E.\,T. Schmidt proved that every finite distributive lattice $D$ can be represented as the congruence lattice of a finite isoform lattice $L$. We now prove that every finite lattice $K$ has a congruence-preserving extension to a finite isoform lattice $L$.