About posets for which no lower cover or no upper cover has the fixed point property
For a finite non-empty set $X$, let $\mathfrak{P}(X)$ denote the set of all posets with carrier $X$, ordered by inclusion of their partial order relations. We investigate properties of posets $P \in \mathfrak{P}(X)$ for which no lower cover or no upper cover in $\mathfrak{P}(X)$ has the fixed point...
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| creator | Campo, Frank a |
| description | For a finite non-empty set $X$, let $\mathfrak{P}(X)$ denote the set of all
posets with carrier $X$, ordered by inclusion of their partial order relations.
We investigate properties of posets $P \in \mathfrak{P}(X)$ for which no lower
cover or no upper cover in $\mathfrak{P}(X)$ has the fixed point property. We
derive two conditions, one of them sufficient for that no lower cover of $P$
has the fixed point property, the other one sufficient for that no upper cover
of $P$ has the fixed point property, and we apply these results on several
types of posets. |
| doi_str_mv | 10.48550/arxiv.2109.09431 |
| format | Article |
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posets with carrier $X$, ordered by inclusion of their partial order relations.
We investigate properties of posets $P \in \mathfrak{P}(X)$ for which no lower
cover or no upper cover in $\mathfrak{P}(X)$ has the fixed point property. We
derive two conditions, one of them sufficient for that no lower cover of $P$
has the fixed point property, the other one sufficient for that no upper cover
of $P$ has the fixed point property, and we apply these results on several
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posets with carrier $X$, ordered by inclusion of their partial order relations.
We investigate properties of posets $P \in \mathfrak{P}(X)$ for which no lower
cover or no upper cover in $\mathfrak{P}(X)$ has the fixed point property. We
derive two conditions, one of them sufficient for that no lower cover of $P$
has the fixed point property, the other one sufficient for that no upper cover
of $P$ has the fixed point property, and we apply these results on several
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posets with carrier $X$, ordered by inclusion of their partial order relations.
We investigate properties of posets $P \in \mathfrak{P}(X)$ for which no lower
cover or no upper cover in $\mathfrak{P}(X)$ has the fixed point property. We
derive two conditions, one of them sufficient for that no lower cover of $P$
has the fixed point property, the other one sufficient for that no upper cover
of $P$ has the fixed point property, and we apply these results on several
types of posets.</abstract><doi>10.48550/arxiv.2109.09431</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Combinatorics |
| title | About posets for which no lower cover or no upper cover has the fixed point property |
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