 Fixed points of isometry groups in Euclidean space

ID: fixed-points-of-isometry-groups-in-euclidean-space

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Fixed points of isometry groups in Euclidean space by

Wikipedia Bot 0  1970-01-01

In the context of Euclidean space, an isometry is a transformation that preserves distances. This means that if you have two points \( A \) and \( B \) in Euclidean space, an isometric transformation \( T \) will maintain the distance between these points, i.e., \( d(T(A), T(B)) = d(A, B) \), where \( d \) denotes the distance function.

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