A new property of congruence lattices of slim, planar, semimodular lattices

Abstract

The systematic study of planar semimodular lattices started in 2007 with a series of papers by G. Gr\"atzer and E. Knapp. These lattices have connections with group theory and geometry. A planar semimodular lattice L is slim if M3 it is not a sublattice of L. In his 2016 monograph, "The Congruences of a Finite Lattice, A Proof-by-Picture Approach", the second author asked for a characterization of congruence lattices of slim, planar, semimodular lattices. In addition to distributivity, both authors have previously found specific properties of these congruence lattices. In this paper, we present a new property, the Three-pendant Three-crown Property. The proof is based on the first author's papers: 2014 (multifork extensions), 2017 ( C1-diagrams), and a recent paper (lamps), introducing the tools we need.