Definition:External Direct Product/Structures with Two Operations

Definition
Let $\struct {S_1, +_1, \circ_1}, \struct {S_2, +_2, \circ_2}, \ldots, \struct {S_n, +_n, \circ_n}$ be algebraic structures with two operations.

Let $\ds \SS = \prod_{k \mathop = 1}^n S_k$ be as defined in cartesian product.

The operation $+$ induced on $\SS$ by $+_1, \ldots, +_n$ is defined as:
 * $\tuple {s_1, s_2, \ldots, s_n} + \tuple {t_1, t_2, \ldots, t_n} = \tuple {s_1 +_1 t_1, s_2 +_2 t_2, \ldots, s_n +_n t_n}$

The operation $\circ $ induced on $\SS$ by $\circ_1, \ldots, \circ_n$ is defined as:
 * $\tuple {s_1, s_2, \ldots, s_n} \circ \tuple {t_1, t_2, \ldots, t_n} = \tuple {s_1 \circ_1 t_1, s_2 \circ_2 t_2, \ldots, s_n \circ_n t_n}$

for all ordered $n$-tuples in $\SS$.

The algebraic structure $\struct {\SS, +, \circ}$ is called the (external) direct product of $\struct {S_1, +_1, \circ_1}, \struct {S_2, +_2, \circ_2}, \ldots, \struct {S_n, +_n, \circ_n}$.

Also known as
Some authors refer to this as the cartesian product of $\struct {S_1, +_1, \circ_1}, \struct {S_2, +_2, \circ_2}, \ldots, \struct {S_n, +_n, \circ_n}$.

Others (whose expositions are not concerned with the Internal Direct Product) call it just the direct product.

Also see

 * Definition:Internal Direct Product
 * Definition:Ring Direct Sum
 * Definition:Ring Direct Product