Abstract
Abstract It is elementary and well known that if an element x of a bounded modular lattice L $ \mathbf L $ has a complement in L $ \mathbf L $ then x has a relative complement in every interval [a, b] containing x. We show that the relatively strong assumption of modularity of L $ \mathbf L $ can be replaced by a weaker one formulated in the language of so-called modular triples. We further show that, in general, we need not suppose that x has a complement in L $ \mathbf L $ . By introducing the concept of modular triples in posets, we extend our results obtained for lattices to posets. It should be remarked that the notion of a complement can be introduced also in posets that are not bounded.
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