Category:Axioms/Semiring of Sets
Jump to navigation
Jump to search
This category contains axioms related to Semiring of Sets.
Let $\SS$ be a system of sets.
$\SS$ is a semiring of sets or semi-ring of sets if and only if $\SS$ satisfies the semiring of sets axioms:
\((1)\) | $:$ | \(\ds \O \in \SS \) | |||||||
\((2)\) | $:$ | $\cap$-stable | \(\ds \forall A, B \in \SS:\) | \(\ds A \cap B \in \SS \) | |||||
\((3)\) | $:$ | \(\ds \forall A, A_1 \in \SS : A_1 \subseteq A:\) | $\exists n \in \N$ and pairwise disjoint sets $A_2, A_3, \ldots, A_n \in \SS : \ds A = \bigcup_{k \mathop = 1}^n A_k$ |
Pages in category "Axioms/Semiring of Sets"
The following 3 pages are in this category, out of 3 total.