Test for Right Ideal

Theorem
Let $J$ be a subset of a ring $\struct{R, +, \circ}$.

Then $J$ is an right ideal of $\struct{R, +, \circ}$ these all hold:


 * $(1): \quad J \ne \varnothing$


 * $(2): \quad \forall x, y \in J: x + \paren {-y} \in J$


 * $(3): \quad \forall j \in J, r \in R: j \circ r \in J$

Necessary Condition
Let $J$ be a right ideal of $\struct{R, +, \circ}$.

Then conditions $(1)$ to $(3)$ hold by virtue of the ring axioms and $J$ being a right ideal.

Sufficient Condition
Suppose conditions $(1)$ to $(3)$ hold.

Conditions $(1)$ and $(2)$ satisfy the criteria for the Subgroup Test, thus $J$ is a subgroup of $\struct {R,+}$.

As $(3)$ defines the condition for $J$ to be a right ideal, the result follows.