Supremum properties of Galois-type connections

Száz, Árpád. "Supremum properties of Galois-type connections." Commentationes Mathematicae Universitatis Carolinae 47.4 (2006): 569-583. <http://eudml.org/doc/249849>.

@article{Száz2006,
abstract = {In a former paper, motivated by a recent theory of relators (families of relations), we have investigated increasingly regular and normal functions of one preordered set into another instead of Galois connections and residuated mappings of partially ordered sets. A function $f$ of one preordered set $X$ into another $Y$ has been called (1) increasingly  $g$-normal, for some function $g$ of $Y$ into $X$, if for any $x\in X$ and $y\in Y$ we have $f(x)\le y$ if and only if $x\le g(y)$; (2) increasingly $\varphi $-regular, for some function $\varphi $ of $X$ into itself, if for any $x_\{1\}, x_\{2\}\in X$ we have $x_\{1\}\le \varphi (x_\{2\})$ if and only if $f(x_\{1\})\le f(x_\{2\})$. In the present paper, we shall prove that if $f$ is an increasingly regular function of $X$ onto $Y$, or $f$ is an increasingly normal function of $X$ into $Y$, then $f[\sup (A)]\subset \sup (f[A])$ for all $A\subset X$. Moreover, we shall also prove some more delicate, but less important supremum properties of such functions.},
author = {Száz, Árpád},
journal = {Commentationes Mathematicae Universitatis Carolinae},
keywords = {preordered sets; Galois connections (residuated mappings); supremum properties; preordered sets; Galois connections; residuated mappings; supremum properties},
language = {eng},
number = {4},
pages = {569-583},
publisher = {Charles University in Prague, Faculty of Mathematics and Physics},
title = {Supremum properties of Galois-type connections},
url = {http://eudml.org/doc/249849},
volume = {47},
year = {2006},
}

TY - JOUR
AU - Száz, Árpád
TI - Supremum properties of Galois-type connections
JO - Commentationes Mathematicae Universitatis Carolinae
PY - 2006
PB - Charles University in Prague, Faculty of Mathematics and Physics
VL - 47
IS - 4
SP - 569
EP - 583
AB - In a former paper, motivated by a recent theory of relators (families of relations), we have investigated increasingly regular and normal functions of one preordered set into another instead of Galois connections and residuated mappings of partially ordered sets. A function $f$ of one preordered set $X$ into another $Y$ has been called (1) increasingly  $g$-normal, for some function $g$ of $Y$ into $X$, if for any $x\in X$ and $y\in Y$ we have $f(x)\le y$ if and only if $x\le g(y)$; (2) increasingly $\varphi $-regular, for some function $\varphi $ of $X$ into itself, if for any $x_{1}, x_{2}\in X$ we have $x_{1}\le \varphi (x_{2})$ if and only if $f(x_{1})\le f(x_{2})$. In the present paper, we shall prove that if $f$ is an increasingly regular function of $X$ onto $Y$, or $f$ is an increasingly normal function of $X$ into $Y$, then $f[\sup (A)]\subset \sup (f[A])$ for all $A\subset X$. Moreover, we shall also prove some more delicate, but less important supremum properties of such functions.
LA - eng
KW - preordered sets; Galois connections (residuated mappings); supremum properties; preordered sets; Galois connections; residuated mappings; supremum properties
UR - http://eudml.org/doc/249849
ER -