Group
Backlinks
Definition 1 A group is a non-empty set \(\Group\) together with a binary operation on \(\Group\), denoted "\(\GroupOperation{}{}\)", that combines any two elements \(\GroupElement\) and \(\GroupElement'\) of \(\Group\) to form an element of \(\Group\), denoted \(\GroupOperation{\GroupElement}{\GroupElement'}\), such that the following three requirements, known as group axioms, are satisfied:
Outlinks
- Best Contribution to PGR Environment
- Measure Theory and Ergodic Theory
- Density
- Følner sequence
- Amenable
- Factor Maps
- Functional Analysis
- Actions
- Furstenberg’s Correspondence Principle
- Kronecker Factor
- A Short Proof of a Generalised Conjecture of Erdős for Amenable Groups
- Recurrence and Ergodic Theorems