Definition:Group Product/Product Element
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Definition
Let $\struct {G, \circ}$ be a group.
Let $a, b \in G$ such that $ = a \circ b$.
Then $g$ is known as the product of $a$ and $b$.
Also known as
The term product can be referred to as product element if it is important to distinguish between this and the group law, also called the group product.
Examples of Operations on Group Product
Example: $b x a^{-1} = a^{-1} b$
- $b x a^{-1} = a^{-1} b$
Example: $a x a^{-1} = e$
- $a x a^{-1} = e$
Example: $a x a^{-1} = a$
- $a x a^{-1} = a$
Example: $a x b = c$
- $a x b = c$
Example: $b a^{-1} x a b^{-1} = b a$
- $b a^{-1} x a b^{-1} = b a$
Sources
- 1964: Walter Ledermann: Introduction to the Theory of Finite Groups (5th ed.) ... (previous) ... (next): Chapter $\text {I}$: The Group Concept: $\S 2$: The Axioms of Group Theory
- 1967: George McCarty: Topology: An Introduction with Application to Topological Groups ... (previous) ... (next): Chapter $\text{II}$: Groups: The Group Property