<span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">sets</span> plural of <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span>...
article on: <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span> Wikipedia <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span> (plural <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">sets</span>) (<span class="searchmatch">set</span> theory, order theory, loosely) A <span class="searchmatch">set</span> that has a...
<span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> (not comparable) (<span class="searchmatch">set</span> theory, order theory, of a <span class="searchmatch">set</span>) Equipped with a partial order; when the partial order is specified, often construed...
<span class="searchmatch">ordered</span> <span class="searchmatch">set</span> (plural <span class="searchmatch">ordered</span> <span class="searchmatch">sets</span>) (mathematics) A <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span>. (mathematics) A totally <span class="searchmatch">ordered</span> <span class="searchmatch">set</span>. (mathematics) A well-<span class="searchmatch">ordered</span> <span class="searchmatch">set</span>. This term...
ordered pair <span class="searchmatch">ordered</span> ring <span class="searchmatch">ordered</span> <span class="searchmatch">set</span> <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span> time-<span class="searchmatch">ordered</span> totally <span class="searchmatch">ordered</span> totally <span class="searchmatch">ordered</span> <span class="searchmatch">set</span> well-<span class="searchmatch">ordered</span> in order, not...
(plural complete partial orders) (<span class="searchmatch">set</span> theory, order theory) Three similar yet distinct classes of <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">sets</span>, characterized by their completeness...
domain theory (uncountable) (mathematics) A branch of mathematics that studies special kinds of <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">sets</span> (posets) commonly called domains....
lattices) (algebra) A <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span> in which all subsets have both a supremum (join) and an infimum (meet). frame lattice <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span>...
<span class="searchmatch">ordered</span> <span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span> partly Collocations <span class="searchmatch">partially</span> open <span class="searchmatch">partially</span> closed <span class="searchmatch">partially</span> successful <span class="searchmatch">partially</span> responsible <span class="searchmatch">partially</span> true <span class="searchmatch">partially</span>...
reticulado completo m (plural reticulados completos) (algebra) complete lattice (<span class="searchmatch">partially</span> <span class="searchmatch">ordered</span> <span class="searchmatch">set</span>)...