(1+1+2)-generated lattices of quasiorders

Abstract

A lattice is (1+1+2)-generated if it has a four-element generating set such that exactly two of the four generators are comparable. We prove that the lattice Quo(n) of all quasiorders (also known as preorders) of an n-element set is (1+1+2)-generated for n=3 (trivially), n=6 (when Quo(6) consists of 209\,527 elements), n=11, and for every natural number n≥ 13. In 2017, the second author and J. Kulin proved that Quo(n) is (1+1+2)-generated if either n is odd and at least 13 or n is even and at least 56. Compared to the 2017 result, this paper presents twenty-four new numbers n such that Quo(n) is (1+1+2)-generated. Except for Quo(6), an extension of Z\'adori's method is used.