Is there a collective noun for equalities and inequalities?
For example, say I'm writing a proof:
According to Theorem 17.7 the vector $\beta$ satisfies the following equalities and inequalities: \begin{align} \beta(S) &\ge v(S), \quad \forall S \subseteq N\\ \beta &= \gamma \\ \beta &\in A \end{align}
Is there one specific word I can use instead of the phrase "equalities and inequalities" that will succinctly convey my intention?
Note also that the logic statement $\beta \in A$ is neither an equality nor an inequality, so my description in the example above isn't even accurate despite being exhaustive
As the commenters above have noted, the word "relations" seems suitable for this purpose.
I'll mark this as the accepted answer unless additional suggestions are submitted