Residuated operators in complemented posets
Logic
2018-09-27 v1
Abstract
Using the operators of taking upper and lower cones in a poset with a unary operation, we define operators M(x,y) and R(x,y) in the sense of multiplication and residuation, respectively, and we show that by using these operators, a general modification of residuation can be introduced. A relatively pseudocomplemented poset can be considered as a prototype of such an operator residuated poset. As main results we prove that every Boolean poset as well as every pseudo-orthomodular poset can be organized into a (left) operator residuated structure. Some results on pseudo-orthomodular posets are presented which show the analogy to orthomodular lattices and orthomodular posets.
Keywords
Cite
@article{arxiv.1809.10101,
title = {Residuated operators in complemented posets},
author = {Ivan Chajda and Helmut Länger},
journal= {arXiv preprint arXiv:1809.10101},
year = {2018}
}