In group theory, a "word" is a finite sequence of symbols that represents an element in a group. More specifically, if \( G \) is a group with a specified set of generators, a word in that group is formed by taking elements from the generating set and forming products according to group operations. ### Definitions and Components: 1. **Generators**: A group \( G \) can often be described in terms of a set of generators \( S \).
New to topics? Read the docs here!