etaquotients

Etaquotients are a concept in the field of algebraic geometry, specifically within the study of algebraic surfaces. They were introduced by Miles Reid in the 1980s as a tool to understand the singularities of surfaces. An etaquotient is a quotient of a surface by a finite group action, where the group acts freely on the complement of a finite set of points. These points are called the fixed points of the action.

The etaquotient of a surface is a way of compactifying the quotient space, which is not necessarily

Etaquotients have been used to study the topology of algebraic surfaces, as well as the geometry of

In recent years, etaquotients have been generalized to higher dimensions, leading to the study of etaquotients