Haar measure

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Haar measure

[′här ‚mezh·ər]
(mathematics)
A measure on the Borel subsets of a locally compact topological group whose value on a Borel subset U is unchanged if every member of U is multiplied by a fixed element of the group.
References in periodicals archive ?
1](G), where the 'L' stands for Lebesgue who developed the modern theory of integration), the Haar integral is denoted by [[integral].