Using the Swing Lemma and C1-diagrams for congruences of planar semimodular lattices

Abstract

A planar semimodular lattice K is slim if M3 is not a sublattice of~K. In a recent paper, G. Cz\'edli found four new properties of congruence lattices of slim, planar, semimodular lattices, including the No Child Property: Let~P be the ordered set of join-irreducible congruences of K. Let x,y,z ∈ P and let z be a~maximal element of P. If x ≠ y and x, y z in P, then there is no element u of P such that u x, y in P. We are applying my Swing Lemma, 2015, and a type of standardized diagrams of Cz\'edli's, to verify his four properties.

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