Properties of standard \(n\)-ideals of a lattice (Q5929897)

In this paper the authors show that for a neutral element \(n\) of a lattice \(L\) the principal \(n\)-ideal \(\langle a\rangle _{n}\) of the lattice \(L\) is a standard \(n\)-ideal if \(a\vee n\) is standard and \(a\wedge n\) is dual standard. Further they prove that if \(n\) is a neutral element and \(( n] \) and \([ n) \) are relatively complemented, then every homomorphism \(n\)-kernel of \(L\) is a standard \(n\)-ideal and every standard \(n\)-ideal is the \(n\)-kernel of precisely one congruence relation Finally they show that for a relatively\ complemented lattice \(L\) with \(0\) and \(1\), \(C(L) \) is a Boolean algebra if every standard \(n\)-ideal of \(L\) is a principal \(n\)-ideal.