Operators on complemented lattices
Abstract
The present paper deals with complemented lattices where, however, a unary operation of complementation is not explicitly assumed. This means that an element can have several complements. The mapping assigning to each element the set of all its complements is investigated as an operator on the given lattice. We can extend the definition of in a natural way from elements to arbitrary subsets. In particular we study the set for complemented modular lattices, and we characterize when the set is a singleton. By means of the operator we introduce two other operators and which can be considered as implication and conjunction in a certain propositional calculus, respectively. These two logical connectives are ``unsharp'' which means that they assign to each pair of elements a non-empty subset. However, also these two derived operators share a lot of properties with the corresponding logical connectives in intuitionistic logic or in the logic of quantum mechanics. In particular, they form an adjoint pair. Finally, we define so-called deductive systems and we show their relationship to the mentioned operators as well as to lattice filters.
Keywords
Cite
@article{arxiv.2406.07665,
title = {Operators on complemented lattices},
author = {Ivan Chajda and Helmut Länger},
journal= {arXiv preprint arXiv:2406.07665},
year = {2024}
}